Ну-с, начнем с двумерия.
Рассмотрим в
времениподобную кривую, заданную уравнениями
, где
- длина дуги.
Реализуем ориентацию сопутствующего репера гиперболическим поворотом.
Тогда вектор касательной есть
, а вектор нормали суть
, где
имеет быть
.
Угловая переменная
зависит от точки на кривой, т.е.
.
Как известно,
(штрихом будет обозначаться дифференцирование по
). Откуда
Вычислим теперь произведения вида
.
Здесь
и её появлению мы обязаны псевдоэвклидовости.
Очевидно, для вычисления всех таких произведений достаточно вычислить внутреннюю матрицу
и обложить ее по-всякому единичковыми векторами слева и справа. То есть, означенная омега представляет из себя
.
Вычисляем и имеем
. Отсюда не трудно сообразить уравнения Френе:
В случае постоянной кривизны
,
,
и
, то есть - псевдоокружность.
Ну, как-бы логично. Едем дальше...
Случай
![$\[
M \equiv \left( {\begin{array}{*{20}c}
1 & 0 & 0 \\
0 & {\cos \varphi } & { - \sin \varphi } \\
0 & {\sin \varphi } & {\cos \varphi } \\
\end{array} } \right)\left( {\begin{array}{*{20}c}
{\operatorname{ch} \theta } & {\operatorname{sh} \theta } & 0 \\
{\operatorname{sh} \theta } & {\operatorname{ch} \theta } & 0 \\
0 & 0 & 1 \\
\end{array} } \right)\left( {\begin{array}{*{20}c}
1 & 0 & 0 \\
0 & {\cos \psi } & { - \sin \psi } \\
0 & {\sin \psi } & {\cos \psi } \\
\end{array} } \right)
\]
$](https://dxdy-03.korotkov.co.uk/f/a/f/f/aff9b6e377cfed091052da70339877b582.png "$\[
M \equiv \left( {\begin{array}{*{20}c}
1 & 0 & 0 \\
0 & {\cos \varphi } & { - \sin \varphi } \\
0 & {\sin \varphi } & {\cos \varphi } \\
\end{array} } \right)\left( {\begin{array}{*{20}c}
{\operatorname{ch} \theta } & {\operatorname{sh} \theta } & 0 \\
{\operatorname{sh} \theta } & {\operatorname{ch} \theta } & 0 \\
0 & 0 & 1 \\
\end{array} } \right)\left( {\begin{array}{*{20}c}
1 & 0 & 0 \\
0 & {\cos \psi } & { - \sin \psi } \\
0 & {\sin \psi } & {\cos \psi } \\
\end{array} } \right)
\]
$")
![$\[
\Omega \equiv M^T \cdot \sigma \cdot M'
\]
$](https://dxdy-02.korotkov.co.uk/f/1/2/5/1252a8c3541e22b33d1d6b0ccbe7129b82.png "$\[
\Omega \equiv M^T \cdot \sigma \cdot M'
\]
$")
, где теперь
![$\[
\sigma = \left( {\begin{array}{*{20}c}
1 & 0 & 0 \\
0 & { - 1} & 0 \\
0 & 0 & { - 1} \\
\end{array} } \right)
\]
$](https://dxdy-02.korotkov.co.uk/f/9/c/9/9c997d62cac764bbaa430a598ea9d31782.png "$\[
\sigma = \left( {\begin{array}{*{20}c}
1 & 0 & 0 \\
0 & { - 1} & 0 \\
0 & 0 & { - 1} \\
\end{array} } \right)
\]
$")
.
После несколько нудноватых (или отданных кумпутеру) вычислёвываний, поимеем
![$\[
\Omega = \left( {\begin{array}{*{20}c}
0 & {\kappa _1 } & \delta \\
{ - \kappa _1 } & 0 & {\kappa _2 } \\
{ - \delta } & { - \kappa _2 } & 0 \\
\end{array} } \right)
\]
$](https://dxdy-04.korotkov.co.uk/f/7/5/5/75520a8342222d0ac96a69d9ef418be682.png "$\[
\Omega = \left( {\begin{array}{*{20}c}
0 & {\kappa _1 } & \delta \\
{ - \kappa _1 } & 0 & {\kappa _2 } \\
{ - \delta } & { - \kappa _2 } & 0 \\
\end{array} } \right)
\]
$")
,
где
![$$\[
\begin{gathered}
\kappa _1 = \cos \psi \cdot \theta ' + \sin \psi \cdot \operatorname{sh} \theta \cdot \varphi ' \hfill \\
\kappa _2 = \operatorname{ch} \theta \cdot \varphi ' + \psi ' \hfill \\
\delta = - \sin \psi \cdot \theta ' + \cos \psi \cdot \operatorname{sh} \theta \cdot \varphi ' \hfill \\
\end{gathered}
\]
$$](https://dxdy-02.korotkov.co.uk/f/5/e/3/5e3aa965a171a40eeceaaa46d761ff9482.png "$$\[
\begin{gathered}
\kappa _1 = \cos \psi \cdot \theta ' + \sin \psi \cdot \operatorname{sh} \theta \cdot \varphi ' \hfill \\
\kappa _2 = \operatorname{ch} \theta \cdot \varphi ' + \psi ' \hfill \\
\delta = - \sin \psi \cdot \theta ' + \cos \psi \cdot \operatorname{sh} \theta \cdot \varphi ' \hfill \\
\end{gathered}
\]
$$")
Пару слов о
. Приблуда сия образовалась оттого, что в общем случае мы не совсем попали первой нормалью в направление производной касательной. Чтобы попасть совсем, надобно эту дельту обнулить. Что даст нам связь и оставит из трех только два параметра, определяющих направление касательной. Собственно, как и должно быть.
Таким образом, нужно решить систему
![$\[
\kappa _1 = const,\kappa _2 = const,\delta = 0
\]
$](https://dxdy-02.korotkov.co.uk/f/1/4/d/14d49fc3c18136c8120702bc05c8ea1482.png "$\[
\kappa _1 = const,\kappa _2 = const,\delta = 0
\]
$")
, получить из нее
![$\[
\varphi = \varphi \left( s \right),\theta = \theta \left( s \right),\psi = \psi \left( s \right)
\]
$](https://dxdy-02.korotkov.co.uk/f/5/9/6/596d28de6f679aa79100298135ff563d82.png "$\[
\varphi = \varphi \left( s \right),\theta = \theta \left( s \right),\psi = \psi \left( s \right)
\]
$")
, подставить сие в
![$\[
t'\left( s \right) = \operatorname{ch} \theta \left( s \right),x'\left( s \right) = \cos \varphi \left( s \right) \cdot \operatorname{sh} \theta \left( s \right),y'\left( s \right) = \sin \varphi \left( s \right) \cdot \operatorname{sh} \theta \left( s \right)
\]
$](https://dxdy-01.korotkov.co.uk/f/0/9/f/09ff1a85de2548db7a1b418992b6195e82.png "$\[
t'\left( s \right) = \operatorname{ch} \theta \left( s \right),x'\left( s \right) = \cos \varphi \left( s \right) \cdot \operatorname{sh} \theta \left( s \right),y'\left( s \right) = \sin \varphi \left( s \right) \cdot \operatorname{sh} \theta \left( s \right)
\]
$")
(пси, кстати, выпало) и, проинтегрировав еще раз, получить наконец кривулю.
Этого я пока не добил. Нашел только интеграл
![$\[
\sin \psi = \frac{{c_1 + \kappa \operatorname{ch} \theta }}
{{\operatorname{sh} \theta }}
\]
$](https://dxdy-01.korotkov.co.uk/f/8/6/f/86feadd97b4dda009515685b61350e7982.png "$\[
\sin \psi = \frac{{c_1 + \kappa \operatorname{ch} \theta }}
{{\operatorname{sh} \theta }}
\]
$")
, где
![$\[
\kappa \equiv \frac{{\kappa _2 }}
{{\kappa _1 }}
\]
$](https://dxdy-01.korotkov.co.uk/f/0/a/0/0a093484c11c4aedb64ade0c1dc5c35d82.png "$\[
\kappa \equiv \frac{{\kappa _2 }}
{{\kappa _1 }}
\]
$")
, а
![$\[
{c_1 }
\]
$](https://dxdy-02.korotkov.co.uk/f/5/6/1/561553ef6358617c7ded2cd559c0df3482.png "$\[
{c_1 }
\]
$")
- еще одна постоянная. Да свёл её к более простому виду
![$\[
\varphi ' = \kappa _1 \frac{{\sin \psi }}
{{\operatorname{sh} \theta }},\theta ' = \kappa _1 \cos \psi
\]
$](https://dxdy-04.korotkov.co.uk/f/3/4/2/342bbd95ae70e8fa0f6a165a0cf3f42682.png "$\[
\varphi ' = \kappa _1 \frac{{\sin \psi }}
{{\operatorname{sh} \theta }},\theta ' = \kappa _1 \cos \psi
\]
$")
.
Вот примерно как-то вот так вот.
P.S. Чтобы двинуть далее с песнями на
, надо как-то обобщить на четырехмерие углы Эйлера. Кто-то знает за такое стандартное или отсебятину тулить?
вот такое у меня решение :
the rotation matrix is defined by two quaternions, and is therefore 6-parametric (three degrees of freedom for every quaternion). The 
rotation matrices have therefore 6 out of 16 independent components.
is quadratic in 
which for 
yields 
.
![$$\[
M = A_\alpha B_\beta C_\theta B_\varphi A_\psi B_\chi
\]
$$](https://dxdy-02.korotkov.co.uk/f/5/9/4/594cc9a90813fb08f11bd5e274a5732482.png "$$\[
M = A_\alpha B_\beta C_\theta B_\varphi A_\psi B_\chi
\]
$$")
![$\[
A_\alpha \equiv \left( {\begin{array}{*{20}c}
1 & 0 & 0 & 0 \\
0 & 1 & 0 & 0 \\
0 & 0 & {c_\alpha } & { - s_\alpha } \\
0 & 0 & {s_\alpha } & {c_\alpha } \\
\end{array} } \right),B_\beta \equiv \left( {\begin{array}{*{20}c}
1 & 0 & 0 & 0 \\
0 & {c_\beta } & { - s_\beta } & 0 \\
0 & {s_\beta } & {c_\beta } & 0 \\
0 & 0 & 0 & 1 \\
\end{array} } \right),C_\theta \equiv \left( {\begin{array}{*{20}c}
{\operatorname{ch} \theta } & {\operatorname{sh} \theta } & 0 & 0 \\
{\operatorname{sh} \theta } & {\operatorname{ch} \theta } & 0 & 0 \\
0 & 0 & 1 & 0 \\
0 & 0 & 0 & 1 \\
\end{array} } \right)
\]
$](https://dxdy-01.korotkov.co.uk/f/8/c/7/8c72cfe94f49a588aad3de2a819edfa882.png "$\[
A_\alpha \equiv \left( {\begin{array}{*{20}c}
1 & 0 & 0 & 0 \\
0 & 1 & 0 & 0 \\
0 & 0 & {c_\alpha } & { - s_\alpha } \\
0 & 0 & {s_\alpha } & {c_\alpha } \\
\end{array} } \right),B_\beta \equiv \left( {\begin{array}{*{20}c}
1 & 0 & 0 & 0 \\
0 & {c_\beta } & { - s_\beta } & 0 \\
0 & {s_\beta } & {c_\beta } & 0 \\
0 & 0 & 0 & 1 \\
\end{array} } \right),C_\theta \equiv \left( {\begin{array}{*{20}c}
{\operatorname{ch} \theta } & {\operatorname{sh} \theta } & 0 & 0 \\
{\operatorname{sh} \theta } & {\operatorname{ch} \theta } & 0 & 0 \\
0 & 0 & 1 & 0 \\
0 & 0 & 0 & 1 \\
\end{array} } \right)
\]
$")
, и ![$\[
s_\alpha \equiv \sin \alpha ,c_\alpha \equiv \cos \alpha
\]
$](https://dxdy-02.korotkov.co.uk/f/5/0/2/502e499617dda5631ee3f96db0076bea82.png "$\[
s_\alpha \equiv \sin \alpha ,c_\alpha \equiv \cos \alpha
\]
$")
![$\[
\Omega = \left( {\begin{array}{*{20}c}
0 & { - \kappa _1 } & { - \delta _1 } & { - \delta _2 } \\
{\kappa _1 } & 0 & { - \kappa _2 } & { - \delta _3 } \\
{\delta _1 } & {\kappa _2 } & 0 & { - \kappa _3 } \\
{\delta _2 } & {\delta _3 } & {\kappa _3 } & 0 \\
\end{array} } \right)
\]
$](https://dxdy-01.korotkov.co.uk/f/c/e/2/ce2aba29cc9d110733b86e7e6fe3dd2d82.png "$\[
\Omega = \left( {\begin{array}{*{20}c}
0 & { - \kappa _1 } & { - \delta _1 } & { - \delta _2 } \\
{\kappa _1 } & 0 & { - \kappa _2 } & { - \delta _3 } \\
{\delta _1 } & {\kappa _2 } & 0 & { - \kappa _3 } \\
{\delta _2 } & {\delta _3 } & {\kappa _3 } & 0 \\
\end{array} } \right)
\]
$")
![$$\[
\begin{gathered}
\kappa _1 = - \operatorname{sh} _\theta \left( {s_\beta s_\chi s_\psi \alpha ' + \left( {c_\varphi s_\chi c_\psi + s_\varphi c_\chi } \right)\beta '} \right) + \left( { - c_\varphi c_\chi + s_\varphi s_\chi c_\psi } \right)\theta ' \hfill \\
\kappa _2 = - s_\psi \left( {s_\beta c_\psi \operatorname{ch} _\theta + s_\varphi c_\beta } \right)\alpha ' - c_\psi \left( {\operatorname{ch} _\theta \beta ' + \varphi '} \right) - \chi ' \hfill \\
\kappa _3 = \left( {s_\beta \operatorname{ch} _\theta \left( {c_\varphi s_\chi c_\psi + s_\varphi c_\chi } \right) + c_\beta \left( { - c_\varphi c_\chi + s_\varphi s_\chi c_\psi } \right)} \right)\alpha ' - s_\chi s_\psi \left( {\operatorname{ch} _\theta \beta ' + \varphi '} \right) - c_\chi \psi ' \hfill \\
\delta _1 = - \operatorname{sh} _\theta \left( {s_\beta c_\chi s_\psi \alpha ' + \left( {c_\varphi c_\chi c_\psi + s_\varphi s_\chi } \right)\beta '} \right) + \left( {c_\varphi s_\chi + s_\varphi c_\chi c_\psi } \right)\theta ' \hfill \\
\delta _2 = - s_\beta c_\psi \operatorname{sh} _\theta \alpha ' + s_\psi \left( {c_\varphi \operatorname{sh} _\theta \beta ' - s_\varphi \theta '} \right) \hfill \\
\delta _3 = - \left( {s_\beta \operatorname{ch} _\theta \left( {c_\varphi c_\chi c_\psi - s_\varphi s_\chi } \right) + c_\beta \left( {c_\varphi s_\chi + s_\varphi c_\chi c_\psi } \right)} \right)\alpha ' + c_\chi s_\psi \left( {\operatorname{ch} _\theta \beta ' + \varphi '} \right) - s_\chi \psi ' \hfill \\
\end{gathered}
\]
$$](https://dxdy-03.korotkov.co.uk/f/a/b/4/ab4ab6f21e4bf2834f783f773013a2b682.png "$$\[
\begin{gathered}
\kappa _1 = - \operatorname{sh} _\theta \left( {s_\beta s_\chi s_\psi \alpha ' + \left( {c_\varphi s_\chi c_\psi + s_\varphi c_\chi } \right)\beta '} \right) + \left( { - c_\varphi c_\chi + s_\varphi s_\chi c_\psi } \right)\theta ' \hfill \\
\kappa _2 = - s_\psi \left( {s_\beta c_\psi \operatorname{ch} _\theta + s_\varphi c_\beta } \right)\alpha ' - c_\psi \left( {\operatorname{ch} _\theta \beta ' + \varphi '} \right) - \chi ' \hfill \\
\kappa _3 = \left( {s_\beta \operatorname{ch} _\theta \left( {c_\varphi s_\chi c_\psi + s_\varphi c_\chi } \right) + c_\beta \left( { - c_\varphi c_\chi + s_\varphi s_\chi c_\psi } \right)} \right)\alpha ' - s_\chi s_\psi \left( {\operatorname{ch} _\theta \beta ' + \varphi '} \right) - c_\chi \psi ' \hfill \\
\delta _1 = - \operatorname{sh} _\theta \left( {s_\beta c_\chi s_\psi \alpha ' + \left( {c_\varphi c_\chi c_\psi + s_\varphi s_\chi } \right)\beta '} \right) + \left( {c_\varphi s_\chi + s_\varphi c_\chi c_\psi } \right)\theta ' \hfill \\
\delta _2 = - s_\beta c_\psi \operatorname{sh} _\theta \alpha ' + s_\psi \left( {c_\varphi \operatorname{sh} _\theta \beta ' - s_\varphi \theta '} \right) \hfill \\
\delta _3 = - \left( {s_\beta \operatorname{ch} _\theta \left( {c_\varphi c_\chi c_\psi - s_\varphi s_\chi } \right) + c_\beta \left( {c_\varphi s_\chi + s_\varphi c_\chi c_\psi } \right)} \right)\alpha ' + c_\chi s_\psi \left( {\operatorname{ch} _\theta \beta ' + \varphi '} \right) - s_\chi \psi ' \hfill \\
\end{gathered}
\]
$$")
![$$\[
\begin{gathered}
t' = \operatorname{ch} _\theta \hfill \\
x' = \operatorname{sh} _\theta c_\beta \hfill \\
y' = \operatorname{sh} _\theta s_\beta c_\alpha \hfill \\
z = \operatorname{sh} _\theta s_\beta s_\alpha \hfill \\
\end{gathered}
\]
$$](https://dxdy-02.korotkov.co.uk/f/d/e/7/de7b0f95446426fd2387b5e315c09b1f82.png "$$\[
\begin{gathered}
t' = \operatorname{ch} _\theta \hfill \\
x' = \operatorname{sh} _\theta c_\beta \hfill \\
y' = \operatorname{sh} _\theta s_\beta c_\alpha \hfill \\
z = \operatorname{sh} _\theta s_\beta s_\alpha \hfill \\
\end{gathered}
\]
$$")
![$
\[{\it sys}\, := \,[{\frac {d}{ds}}x \left( s \right) =k_{{1}}y \left( s \right) ,{\frac {d}{ds}}y \left( s \right) =-k_{{1}}x \left( s \right) +k_{{2}}z \left( s \right) ,{\frac {d}{ds}}z \left( s \right) =k_{{2}}\\\mbox{}y \left( s \right) ]\]
$](https://dxdy-03.korotkov.co.uk/f/e/a/d/ead42f90a48677cd93d4a5a8e58fa01c82.png "$
\[{\it sys}\, := \,[{\frac {d}{ds}}x \left( s \right) =k_{{1}}y \left( s \right) ,{\frac {d}{ds}}y \left( s \right) =-k_{{1}}x \left( s \right) +k_{{2}}z \left( s \right) ,{\frac {d}{ds}}z \left( s \right) =k_{{2}}\\\mbox{}y \left( s \right) ]\]
$")
![$ {x(s) = (-k[1]*_C2*cos(sqrt(-k[2]^2+k[1]^2)*s)+k[1]*_C3*sin(sqrt(-k[2]^2+k[1]^2)*s)+_C1*sqrt(-k[2]^2+k[1]^2))/sqrt(-k[2]^2+k[1]^2), z(s) = (-_C2*cos(sqrt(-k[2]^2+k[1]^2)*s)*k[2]^2+_C3*sin(sqrt(-k[2]^2+k[1]^2)*s)*k[2]^2+k[1]*_C1*sqrt(-k[2]^2+k[1]^2))/(sqrt(-k[2]^2+k[1]^2)*k[2]),
$](https://dxdy-02.korotkov.co.uk/f/1/c/d/1cde85b2a5e2f1a7cf72cc600b3356e882.png "$ {x(s) = (-k[1]*_C2*cos(sqrt(-k[2]^2+k[1]^2)*s)+k[1]*_C3*sin(sqrt(-k[2]^2+k[1]^2)*s)+_C1*sqrt(-k[2]^2+k[1]^2))/sqrt(-k[2]^2+k[1]^2), z(s) = (-_C2*cos(sqrt(-k[2]^2+k[1]^2)*s)*k[2]^2+_C3*sin(sqrt(-k[2]^2+k[1]^2)*s)*k[2]^2+k[1]*_C1*sqrt(-k[2]^2+k[1]^2))/(sqrt(-k[2]^2+k[1]^2)*k[2]),
$")
![$
y(s) = _C2*sin(sqrt(-k[2]^2+k[1]^2)*s)+_C3*cos(sqrt(-k[2]^2+k[1]^2)*s)}}{\[{\it ans0}\, := \, \left\{ x \left( s \right) ={\frac {-k_{{1}}{\it \_C2}\,\cos \left( {\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) s \right) \\
\mbox{}+k_{{1}}{\it \_C3}\,\sin \left( {\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) s \right) \\
\mbox{}+{\it \_C1}\,{\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) }{{\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) }},z \left( s \right) ={\frac {-{\it \_C2}\,\cos \left( {\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) s \right) {k_{{2}}}^{2}+{\it \_C3}\,\sin \left( {\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) s \right) {k_{{2}}}^{2}\\
\mbox{}+k_{{1}}{\it \_C1}\,{\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) }{{\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) k_{{2}}}},y \left( s \right) \\
\mbox{}={\it \_C2}\,\sin \left( {\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) s \right) +{\it \_C3}\,\cos \left( {\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) s \right) \\
\mbox{} \right\} \]}
$](https://dxdy-02.korotkov.co.uk/f/5/b/c/5bc4d85aab0dae950b7de8672e00e0af82.png "$
y(s) = _C2*sin(sqrt(-k[2]^2+k[1]^2)*s)+_C3*cos(sqrt(-k[2]^2+k[1]^2)*s)}}{\[{\it ans0}\, := \, \left\{ x \left( s \right) ={\frac {-k_{{1}}{\it \_C2}\,\cos \left( {\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) s \right) \\
\mbox{}+k_{{1}}{\it \_C3}\,\sin \left( {\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) s \right) \\
\mbox{}+{\it \_C1}\,{\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) }{{\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) }},z \left( s \right) ={\frac {-{\it \_C2}\,\cos \left( {\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) s \right) {k_{{2}}}^{2}+{\it \_C3}\,\sin \left( {\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) s \right) {k_{{2}}}^{2}\\
\mbox{}+k_{{1}}{\it \_C1}\,{\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) }{{\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) k_{{2}}}},y \left( s \right) \\
\mbox{}={\it \_C2}\,\sin \left( {\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) s \right) +{\it \_C3}\,\cos \left( {\it sqrt} \left( -{k_{{2}}}^{2}+{k_{{1}}}^{2} \right) s \right) \\
\mbox{} \right\} \]}
$")
, времениподобная кривая.![$$\[
\left\{ \begin{gathered}
{\mathbf{r''}} = \kappa _1 {\mathbf{n}}_1 \hfill \\
{\mathbf{n}}_1 ^\prime = \kappa _1 {\mathbf{r'}} + \kappa _2 {\mathbf{n}}_2 \hfill \\
{\mathbf{n}}_2 ^\prime = - \kappa _2 {\mathbf{n}}_1 + \kappa _3 {\mathbf{n}}_3 \hfill \\
{\mathbf{n}}_3 ^\prime = - \kappa _3 {\mathbf{n}}_2 \hfill \\
\end{gathered} \right.
\]
$$](https://dxdy-04.korotkov.co.uk/f/3/6/d/36d45382fbf954e316e23bc70dcf822582.png "$$\[
\left\{ \begin{gathered}
{\mathbf{r''}} = \kappa _1 {\mathbf{n}}_1 \hfill \\
{\mathbf{n}}_1 ^\prime = \kappa _1 {\mathbf{r'}} + \kappa _2 {\mathbf{n}}_2 \hfill \\
{\mathbf{n}}_2 ^\prime = - \kappa _2 {\mathbf{n}}_1 + \kappa _3 {\mathbf{n}}_3 \hfill \\
{\mathbf{n}}_3 ^\prime = - \kappa _3 {\mathbf{n}}_2 \hfill \\
\end{gathered} \right.
\]
$$")
![$\[
\left\{ {{\mathbf{r'}},{\mathbf{n}}_1 ,{\mathbf{n}}_2 ,{\mathbf{n}}_3 } \right\}
\]
$](https://dxdy-01.korotkov.co.uk/f/8/a/9/8a9cfb24ee416040eb629df559cfeca282.png "$\[
\left\{ {{\mathbf{r'}},{\mathbf{n}}_1 ,{\mathbf{n}}_2 ,{\mathbf{n}}_3 } \right\}
\]
$")
ортонормирован (![$\[
{{\mathbf{r'}}}
\]
$](https://dxdy-04.korotkov.co.uk/f/f/7/6/f7642e3a001eadb80fd1c7db271aec0f82.png "$\[
{{\mathbf{r'}}}
\]
$")
времениподобный вектор, остальные - пространственноподобные).
, поэтому получим для нее уравнение. Выразим все нормали через производные от ![$$\[
\left\{ \begin{gathered}
\kappa _1 {\mathbf{n}}_1 = {\mathbf{r''}} \hfill \\
\kappa _1 \kappa _2 {\mathbf{n}}_2 = {\mathbf{r'''}} - \kappa _1^2 {\mathbf{r'}} \hfill \\
\kappa _1 \kappa _2 \kappa _3 {\mathbf{n}}_3 = {\mathbf{r}}^{(4)} - \left( {\kappa _1^2 - \kappa _2^2 } \right){\mathbf{r''}} \hfill \\
\end{gathered} \right.
\]
$$](https://dxdy-04.korotkov.co.uk/f/f/d/d/fdd92a17a6a6ccf4bf44cca367a68d9a82.png "$$\[
\left\{ \begin{gathered}
\kappa _1 {\mathbf{n}}_1 = {\mathbf{r''}} \hfill \\
\kappa _1 \kappa _2 {\mathbf{n}}_2 = {\mathbf{r'''}} - \kappa _1^2 {\mathbf{r'}} \hfill \\
\kappa _1 \kappa _2 \kappa _3 {\mathbf{n}}_3 = {\mathbf{r}}^{(4)} - \left( {\kappa _1^2 - \kappa _2^2 } \right){\mathbf{r''}} \hfill \\
\end{gathered} \right.
\]
$$")
![$\[
\kappa _1 \kappa _2 \kappa _3 {\mathbf{n}}_3 ^\prime = - \kappa _3^2 \kappa _1 \kappa _2 {\mathbf{n}}_2
\]
$](https://dxdy-02.korotkov.co.uk/f/9/2/5/92554bc74ff81e92072bfbae978b407082.png "$\[
\kappa _1 \kappa _2 \kappa _3 {\mathbf{n}}_3 ^\prime = - \kappa _3^2 \kappa _1 \kappa _2 {\mathbf{n}}_2
\]
$")
, то![$$\[
{\mathbf{r}}^{(5)} - \left( {\kappa _1^2 - \kappa _2^2 - \kappa _3^2 } \right){\mathbf{r'''}} - \kappa _1^2 \kappa _3^2 {\mathbf{r'}} = 0
\]
$$](https://dxdy-03.korotkov.co.uk/f/2/9/4/294e97ba4b829a2dbe76e18b67265ffc82.png "$$\[
{\mathbf{r}}^{(5)} - \left( {\kappa _1^2 - \kappa _2^2 - \kappa _3^2 } \right){\mathbf{r'''}} - \kappa _1^2 \kappa _3^2 {\mathbf{r'}} = 0
\]
$$")
![$ sys := [diff(x(s), s) = k[1]*y(s), diff(y(s), s) = -k[1]*x(s)+k[2]*z(s), diff(z(s), s) = -k[2]*y(s)+k[3]*t(s), diff(t(s), s) = k[3]*z(s)]}{\[{\it sys}\, := \,[{\frac {d}{ds}}x \left( s \right) =k_{{1}}y \left( s \right) ,{\frac {d}{ds}}y \left( s \right) =-k_{{1}}x \left( s \right) +k_{{2}}z \left( s \right) ,{\frac {d}{ds}}z \left( s \right) =-k_{{2}}y \left( s \right) \\
\mbox{}+k_{{3}}t \left( s \right) ,{\frac {d}{ds}}t \left( s \right) =k_{{3}}z \left( s \right) ]\]}
}{ans0 := {z(s) = (k[1]^2*(_C1*exp(-(1/2)*sqrt(-2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C2*exp((1/2)*sqrt(-2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C3*exp(-(1/2)*sqrt(2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C4*exp((1/2)*sqrt(2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s))+(1/4)*_C1*(-2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(-2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+(1/4)*_C2*(-2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(-2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+(1/4)*_C3*(2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+(1/4)*_C4*(2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s))/(k[2]*k[1]), t(s) = -(1/8)*(4*k[2]^2*_C1*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-4*k[2]^2*_C2*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+4*k[2]^2*_C3*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-4*k[2]^2*_C4*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+4*k[1]^2*_C1*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-4*k[1]^2*_C2*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+4*k[1]^2*_C3*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-4*k[1]^2*_C4*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C1*(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)^(3/2)*exp(-(1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-_C2*(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)^(3/2)*exp((1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C3*(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)^(3/2)*exp(-(1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-_C4*(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)^(3/2)*exp((1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s))/(k[2]*k[3]*k[1]), x(s) = _C1*exp(-(1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C2*exp((1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C3*exp(-(1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C4*exp((1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s), y(s) = -(1/2)*(_C1*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-_C2*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C3*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-_C4*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s))/k[1]}}{\[{\it ans0}\, := \, \left\{ z \left( s \right) ={\frac {{k_{{1}}}^{2} \left( {\it \_C1}\,{e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}+{\it \_C2}\,{e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}+{\it \_C3}\,{e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}\\
\mbox{}+{\it \_C4}\,{e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}} \right) +1/4\,{\it \_C1}\, \left( -2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) \\
\mbox{}{e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}+1/4\,{\it \_C2}\, \left( -2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) {e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}\\
\mbox{}+1/4\,{\it \_C3}\, \left( 2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) \\
\mbox{}{e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}+1/4\,{\it \_C4}\, \left( 2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) \\
\mbox{}{e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}}{k_{{2}}k_{{1}}}},t \left( s \right) =-1/8\,{\frac {4\,{k_{{2}}}^{2}{\it \_C1}\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}\\
\mbox{}-4\,{k_{{2}}}^{2}{\it \_C2}\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+4\,{k_{{2}}}^{2}{\it \_C3}\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}-4\,{k_{{2}}}^{2}{\it \_C4}\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+4\,{k_{{1}}}^{2}{\it \_C1}\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}\\
\mbox{}-4\,{k_{{1}}}^{2}{\it \_C2}\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+4\,{k_{{1}}}^{2}{\it \_C3}\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}\\
\mbox{}-4\,{k_{{1}}}^{2}{\it \_C4}\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+{\it \_C1}\, \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) ^{3/2}{e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}-{\it \_C2}\, \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) ^{3/2}{e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+{\it \_C3}\, \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) ^{3/2}{e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}\\
\mbox{}-{\it \_C4}\, \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) ^{3/2}{e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}}{k_{{2}}k_{{3}}k_{{1}}}},x \left( s \right) ={\it \_C1}\,{e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}\\
\mbox{}+{\it \_C2}\,{e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+{\it \_C3}\,{e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+{\it \_C4}\,{e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}},y \left( s \right) =-1/2\,{\frac {{\it \_C1}\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}-{\it \_C2}\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+{\it \_C3}\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}\\
\mbox{}-{\it \_C4}\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}}{k_{{1}}}} \right\} \]}
$](https://dxdy-01.korotkov.co.uk/f/0/a/b/0ab33811c05899edcdbaf743d9d8df5482.png "$ sys := [diff(x(s), s) = k[1]*y(s), diff(y(s), s) = -k[1]*x(s)+k[2]*z(s), diff(z(s), s) = -k[2]*y(s)+k[3]*t(s), diff(t(s), s) = k[3]*z(s)]}{\[{\it sys}\, := \,[{\frac {d}{ds}}x \left( s \right) =k_{{1}}y \left( s \right) ,{\frac {d}{ds}}y \left( s \right) =-k_{{1}}x \left( s \right) +k_{{2}}z \left( s \right) ,{\frac {d}{ds}}z \left( s \right) =-k_{{2}}y \left( s \right) \\
\mbox{}+k_{{3}}t \left( s \right) ,{\frac {d}{ds}}t \left( s \right) =k_{{3}}z \left( s \right) ]\]}
}{ans0 := {z(s) = (k[1]^2*(_C1*exp(-(1/2)*sqrt(-2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C2*exp((1/2)*sqrt(-2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C3*exp(-(1/2)*sqrt(2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C4*exp((1/2)*sqrt(2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s))+(1/4)*_C1*(-2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(-2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+(1/4)*_C2*(-2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(-2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+(1/4)*_C3*(2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+(1/4)*_C4*(2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(2*sqrt(k[3]^4-2*k[3]^2*k[2]^2+2*k[3]^2*k[1]^2+k[2]^4+2*k[2]^2*k[1]^2+k[1]^4)+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s))/(k[2]*k[1]), t(s) = -(1/8)*(4*k[2]^2*_C1*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-4*k[2]^2*_C2*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+4*k[2]^2*_C3*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-4*k[2]^2*_C4*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+4*k[1]^2*_C1*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-4*k[1]^2*_C2*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+4*k[1]^2*_C3*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-4*k[1]^2*_C4*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C1*(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)^(3/2)*exp(-(1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-_C2*(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)^(3/2)*exp((1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C3*(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)^(3/2)*exp(-(1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-_C4*(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)^(3/2)*exp((1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s))/(k[2]*k[3]*k[1]), x(s) = _C1*exp(-(1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C2*exp((1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C3*exp(-(1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C4*exp((1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s), y(s) = -(1/2)*(_C1*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-_C2*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(-2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)+_C3*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp(-(1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s)-_C4*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*exp((1/2)*sqrt(2*sqrt((k[2]^2+k[1]^2+2*k[3]*k[2]+k[3]^2)*(k[2]^2+k[1]^2-2*k[3]*k[2]+k[3]^2))+2*k[3]^2-2*k[2]^2-2*k[1]^2)*s))/k[1]}}{\[{\it ans0}\, := \, \left\{ z \left( s \right) ={\frac {{k_{{1}}}^{2} \left( {\it \_C1}\,{e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}+{\it \_C2}\,{e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}+{\it \_C3}\,{e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}\\
\mbox{}+{\it \_C4}\,{e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}} \right) +1/4\,{\it \_C1}\, \left( -2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) \\
\mbox{}{e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}+1/4\,{\it \_C2}\, \left( -2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) {e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}\\
\mbox{}+1/4\,{\it \_C3}\, \left( 2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) \\
\mbox{}{e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}+1/4\,{\it \_C4}\, \left( 2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) \\
\mbox{}{e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( {k_{{3}}}^{4}-2\,{k_{{3}}}^{2}{k_{{2}}}^{2}+2\,{k_{{3}}}^{2}{k_{{1}}}^{2}+{k_{{2}}}^{4}+2\,{k_{{2}}}^{2}{k_{{1}}}^{2}\\
\mbox{}+{k_{{1}}}^{4} \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2} \right) s}}}{k_{{2}}k_{{1}}}},t \left( s \right) =-1/8\,{\frac {4\,{k_{{2}}}^{2}{\it \_C1}\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}\\
\mbox{}-4\,{k_{{2}}}^{2}{\it \_C2}\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+4\,{k_{{2}}}^{2}{\it \_C3}\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}-4\,{k_{{2}}}^{2}{\it \_C4}\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+4\,{k_{{1}}}^{2}{\it \_C1}\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}\\
\mbox{}-4\,{k_{{1}}}^{2}{\it \_C2}\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+4\,{k_{{1}}}^{2}{\it \_C3}\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}\\
\mbox{}-4\,{k_{{1}}}^{2}{\it \_C4}\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+{\it \_C1}\, \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) ^{3/2}{e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}-{\it \_C2}\, \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) ^{3/2}{e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+{\it \_C3}\, \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) ^{3/2}{e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}\\
\mbox{}-{\it \_C4}\, \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) ^{3/2}{e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}}{k_{{2}}k_{{3}}k_{{1}}}},x \left( s \right) ={\it \_C1}\,{e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}\\
\mbox{}+{\it \_C2}\,{e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+{\it \_C3}\,{e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+{\it \_C4}\,{e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}},y \left( s \right) =-1/2\,{\frac {{\it \_C1}\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{-1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}-{\it \_C2}\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{1/2\,{\it sqrt} \left( -2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}+{\it \_C3}\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{-1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}\\
\mbox{}-{\it \_C4}\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) {e^{1/2\,{\it sqrt} \left( 2\,{\it sqrt} \left( \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}+2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \left( {k_{{2}}}^{2}+{k_{{1}}}^{2}-2\,k_{{3}}k_{{2}}+{k_{{3}}}^{2} \right) \right) +2\,{k_{{3}}}^{2}-2\,{k_{{2}}}^{2}-2\,{k_{{1}}}^{2}\\
\mbox{} \right) s}}}{k_{{1}}}} \right\} \]}
$")