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Научный форум dxdyМатематика, Физика, Computer Science, Machine Learning, LaTeX, Механика и Техника, Химия,Биология и Медицина, Экономика и Финансовая Математика, Гуманитарные науки |
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| Страница 1 из 1 |
[ Сообщений: 2 ] |
19.04.2010, 12:37 
![$d{N_0}(t) = [ - {k_{01}}(DR){N_0}(t) + {k_{R1}}{N_1}(t) + {M_0}(t){N_0}(t) - {k_d}{N_0}(t)]dt + {\sigma _{0,0}}\sqrt {{N_0}(t)} d{w_0}(t) + {\sigma _{0,1}}\sqrt {{N_1}(t)} d{w_1}(t);$](https://dxdy-01.korotkov.co.uk/f/0/9/a/09a4bf1272176aec23474d96d441fef582.png "$d{N_0}(t) = [ - {k_{01}}(DR){N_0}(t) + {k_{R1}}{N_1}(t) + {M_0}(t){N_0}(t) - {k_d}{N_0}(t)]dt + {\sigma _{0,0}}\sqrt {{N_0}(t)} d{w_0}(t) + {\sigma _{0,1}}\sqrt {{N_1}(t)} d{w_1}(t);$")
![$d{N_1}(t) = [{k_{01}}(DR){N_0}(t) - {k_{12}}(DR){N_1}(t) + {k_{R2}}{N_2}(t) - {k_{R1}}{N_1}(t) - {k_d}{N_1}(t)]dt + {\sigma _{1,0}}\sqrt {{N_0}(t)} d{w_0}(t) + {\sigma _{1,1}}\sqrt {{N_1}(t)} d{w_1}(t) + {\sigma _{1,2}}\sqrt {{N_2}(t)} d{w_2}(t);$](https://dxdy-02.korotkov.co.uk/f/d/9/1/d913226d15ec354452d97931b2d626aa82.png "$d{N_1}(t) = [{k_{01}}(DR){N_0}(t) - {k_{12}}(DR){N_1}(t) + {k_{R2}}{N_2}(t) - {k_{R1}}{N_1}(t) - {k_d}{N_1}(t)]dt + {\sigma _{1,0}}\sqrt {{N_0}(t)} d{w_0}(t) + {\sigma _{1,1}}\sqrt {{N_1}(t)} d{w_1}(t) + {\sigma _{1,2}}\sqrt {{N_2}(t)} d{w_2}(t);$")
![$d{N_2}(t) = [{k_{12}}(DR){N_1}(t) - {k_{23}}(DR){N_2}(t) - {k_{R2}}{N_2}(t) - {k_d}{N_2}(t)]dt + {\sigma _{2,0}}\sqrt {{N_1}(t)} d{w_1}(t) + {\sigma _{2,1}}\sqrt {{N_2}(t)} d{w_3}(t);$](https://dxdy-04.korotkov.co.uk/f/f/2/e/f2ee0abca8337d8d4fd09e9683a8beb382.png "$d{N_2}(t) = [{k_{12}}(DR){N_1}(t) - {k_{23}}(DR){N_2}(t) - {k_{R2}}{N_2}(t) - {k_d}{N_2}(t)]dt + {\sigma _{2,0}}\sqrt {{N_1}(t)} d{w_1}(t) + {\sigma _{2,1}}\sqrt {{N_2}(t)} d{w_3}(t);$")
![$d{N_3}(t) = [{k_{23}}(DR){N_2}(t) + (1 - {P_4}){M_3}(t){N_3}(t) - {P_4}{M_3}(t){N_3}(t) - {k_d}{N_3}(t)]dt + {\sigma _{3,0}}\sqrt {{N_2}(t)} d{w_3}(t) + {\sigma _{3,1}}\sqrt {{N_3}(t)} d{w_4}(t); $](https://dxdy-01.korotkov.co.uk/f/0/6/0/0604faa5802e67ffe59180c866a5d28182.png "$d{N_3}(t) = [{k_{23}}(DR){N_2}(t) + (1 - {P_4}){M_3}(t){N_3}(t) - {P_4}{M_3}(t){N_3}(t) - {k_d}{N_3}(t)]dt + {\sigma _{3,0}}\sqrt {{N_2}(t)} d{w_3}(t) + {\sigma _{3,1}}\sqrt {{N_3}(t)} d{w_4}(t); $")
![$d{N_4}(t) = [{P_4}{M_3}{N_3}(t) + ({M_4} - {k_d}){N_4}(t)]dt + {\sigma _{4,0}}\sqrt {{N_3}(t)} d{w_4}(t) + {\sigma _{4,1}}\sqrt {{N_4}(t)} d{w_5}(t).$](https://dxdy-04.korotkov.co.uk/f/b/8/7/b8756c4438a766d09da0d192dccc967e82.png "$d{N_4}(t) = [{P_4}{M_3}{N_3}(t) + ({M_4} - {k_d}){N_4}(t)]dt + {\sigma _{4,0}}\sqrt {{N_3}(t)} d{w_4}(t) + {\sigma _{4,1}}\sqrt {{N_4}(t)} d{w_5}(t).$")
![$dE{N_0}(t) = [( - {k_{01}} + {M_0} - {k_d})E{N_0}(t) + {k_{R1}}E{N_1}(t)]dt$](https://dxdy-01.korotkov.co.uk/f/8/d/c/8dcfcaee412a6313475a7dbe5064d01182.png "$dE{N_0}(t) = [( - {k_{01}} + {M_0} - {k_d})E{N_0}(t) + {k_{R1}}E{N_1}(t)]dt$")
![$dE{N_1}(t) = [{k_{01}}E{N_0}(t)dt + ( - {k_{12}} - {k_{R1}} - {k_d})E{N_1}(t) + {k_{R2}}E{N_2}(t)]dt$](https://dxdy-04.korotkov.co.uk/f/b/2/c/b2c724e80e74d4f3919c7b891558058482.png "$dE{N_1}(t) = [{k_{01}}E{N_0}(t)dt + ( - {k_{12}} - {k_{R1}} - {k_d})E{N_1}(t) + {k_{R2}}E{N_2}(t)]dt$")
![$dE{N_2}(t) = [{k_{12}}E{N_1}(t) + ( - {k_{23}} - {k_{R2}} - {k_d})E{N_2}(t)]dt$](https://dxdy-01.korotkov.co.uk/f/4/f/6/4f6450e818762c44f72494c3969ffdea82.png "$dE{N_2}(t) = [{k_{12}}E{N_1}(t) + ( - {k_{23}} - {k_{R2}} - {k_d})E{N_2}(t)]dt$")
![$dE{N_3}(t) = [{k_{23}}E{N_2}(t) + ({M_3} - 2{P_4}{M_3} - {k_d})E{N_3}(t)]dt$](https://dxdy-03.korotkov.co.uk/f/6/b/b/6bb1b27a44f65d4fafcdc0b4f3e239b982.png "$dE{N_3}(t) = [{k_{23}}E{N_2}(t) + ({M_3} - 2{P_4}{M_3} - {k_d})E{N_3}(t)]dt$")
![$dE{N_4}(t) = [{P_4}{M_3}E{N_3}(t) + ({M_4} - {k_d})E{N_4}(t)]dt$](https://dxdy-03.korotkov.co.uk/f/6/4/e/64ea3d6bba81c654fd0ab4c6a7cd471d82.png "$dE{N_4}(t) = [{P_4}{M_3}E{N_3}(t) + ({M_4} - {k_d})E{N_4}(t)]dt$")
![$dEN_0^2(t) = [( - 2{k_{01}} + 2{M_0} - 2{k_d})EN_0^2(t) + 2{k_{R1}}E{N_0}{N_1}(t) + \sigma _{0,0}^2E{N_0}(t) + \sigma _{0,1}^2E{N_1}(t)]dt$](https://dxdy-04.korotkov.co.uk/f/3/a/9/3a99816373dfcebcb48ef1f2e0ab487582.png "$dEN_0^2(t) = [( - 2{k_{01}} + 2{M_0} - 2{k_d})EN_0^2(t) + 2{k_{R1}}E{N_0}{N_1}(t) + \sigma _{0,0}^2E{N_0}(t) + \sigma _{0,1}^2E{N_1}(t)]dt$")
![$dEN_1^2(t) = [2{k_{01}}E{N_0}{N_1}(t) + ( - 2{k_{12}} - 2{k_{R1}} - 2{k_d})EN_1^2(t) + 2{k_{R2}}E{N_1}{N_2}(t) + \sigma _{1,1}^2E{N_1}(t) + \sigma _{1,0}^2E{N_0}(t) + \sigma _{1,2}^2E{N_2}(t)]dt$](https://dxdy-02.korotkov.co.uk/f/5/b/e/5be62b44f1ed1d07cd0eaa613549732c82.png "$dEN_1^2(t) = [2{k_{01}}E{N_0}{N_1}(t) + ( - 2{k_{12}} - 2{k_{R1}} - 2{k_d})EN_1^2(t) + 2{k_{R2}}E{N_1}{N_2}(t) + \sigma _{1,1}^2E{N_1}(t) + \sigma _{1,0}^2E{N_0}(t) + \sigma _{1,2}^2E{N_2}(t)]dt$")
![$dEN_2^2(t) = [2{k_{12}}E{N_1}{N_2}(t) + ( - 2{k_{23}} - 2{k_{R2}} - 2{k_d})EN_2^2(t) + \sigma _{2,1}^2E{N_2}(t) + \sigma _{2,0}^2E{N_1}(t)]dt$](https://dxdy-03.korotkov.co.uk/f/e/6/6/e666d8d3fb78017658bf9f841dfd5d9a82.png "$dEN_2^2(t) = [2{k_{12}}E{N_1}{N_2}(t) + ( - 2{k_{23}} - 2{k_{R2}} - 2{k_d})EN_2^2(t) + \sigma _{2,1}^2E{N_2}(t) + \sigma _{2,0}^2E{N_1}(t)]dt$")
![$dEN_3^2(t) = [2{k_{23}}E{N_2}{N_3}(t) + (2{M_3} - 4{P_4}{M_3} - 2{k_d})EN_3^2(t) + \sigma _{3,1}^2E{N_3}(t) + \sigma _{3,0}^2E{N_2}(t)]dt$](https://dxdy-01.korotkov.co.uk/f/c/3/7/c374764e1217844be9190d80d97ce0b682.png "$dEN_3^2(t) = [2{k_{23}}E{N_2}{N_3}(t) + (2{M_3} - 4{P_4}{M_3} - 2{k_d})EN_3^2(t) + \sigma _{3,1}^2E{N_3}(t) + \sigma _{3,0}^2E{N_2}(t)]dt$")
![$dEN_4^2(t) = [2{P_4}{M_3}E{N_3}{N_4}(t) + (2{M_4} - 2{k_d})EN_4^2(t) + \sigma _{4,1}^2E{N_4}(t) + \sigma _{4,0}^2E{N_3}(t)]dt $](https://dxdy-04.korotkov.co.uk/f/3/5/c/35cf128279a7b022da4de8ed0ee208d782.png "$dEN_4^2(t) = [2{P_4}{M_3}E{N_3}{N_4}(t) + (2{M_4} - 2{k_d})EN_4^2(t) + \sigma _{4,1}^2E{N_4}(t) + \sigma _{4,0}^2E{N_3}(t)]dt $")
![$dE{N_0}{N_1}(t) = [{k_{01}}EN_0^2(t) + {k_{R1}}EN_1^2(t) + ({M_0} - {k_{01}} - {k_{12}} - {k_{R1}} - 2{k_d})E{N_0}{N_1}(t) + {k_{R1}}E{N_0}{N_2}(t)]dt$](https://dxdy-02.korotkov.co.uk/f/d/8/8/d8834e71f2d0783404eb000297dbd96f82.png "$dE{N_0}{N_1}(t) = [{k_{01}}EN_0^2(t) + {k_{R1}}EN_1^2(t) + ({M_0} - {k_{01}} - {k_{12}} - {k_{R1}} - 2{k_d})E{N_0}{N_1}(t) + {k_{R1}}E{N_0}{N_2}(t)]dt$")
![$dE{N_0}{N_2}(t) = [({M_0} - {k_{01}} - {k_{23}} - {k_{R2}} - 2{k_d})E{N_0}{N_2}(t) + {k_{R1}}E{N_1}{N_2}(t) + {k_{12}}E{N_0}{N_1}(t)]dt$](https://dxdy-01.korotkov.co.uk/f/8/b/f/8bfd5225f042071945f982b6a299458782.png "$dE{N_0}{N_2}(t) = [({M_0} - {k_{01}} - {k_{23}} - {k_{R2}} - 2{k_d})E{N_0}{N_2}(t) + {k_{R1}}E{N_1}{N_2}(t) + {k_{12}}E{N_0}{N_1}(t)]dt$")
![$dE{N_1}{N_2}(t) = [{k_{01}}E{N_0}{N_2}(t) + {k_{12}}EN_1^2(t) + {k_{R2}}EN_2^2(t) + ( - {k_{12}} - {k_{23}} - {k_{R1}} - {k_{R2}} - 2{k_d})E{N_1}{N_2}(t)]dt$](https://dxdy-03.korotkov.co.uk/f/e/a/a/eaa332861fd010142639b65426765c8882.png "$dE{N_1}{N_2}(t) = [{k_{01}}E{N_0}{N_2}(t) + {k_{12}}EN_1^2(t) + {k_{R2}}EN_2^2(t) + ( - {k_{12}} - {k_{23}} - {k_{R1}} - {k_{R2}} - 2{k_d})E{N_1}{N_2}(t)]dt$")
![$dE{N_2}{N_3}(t) = [{k_{23}}EN_2^2(t) + {k_{12}}E{N_1}{N_3}(t) + ({M_3} - 2{P_4}{M_3} - {k_{23}} - {k_{R2}} - 2{k_d})E{N_2}{N_3}(t)]dt$](https://dxdy-04.korotkov.co.uk/f/7/0/e/70ec0bc7c5716c74b379951927ec8ab782.png "$dE{N_2}{N_3}(t) = [{k_{23}}EN_2^2(t) + {k_{12}}E{N_1}{N_3}(t) + ({M_3} - 2{P_4}{M_3} - {k_{23}} - {k_{R2}} - 2{k_d})E{N_2}{N_3}(t)]dt$")
![$dE{N_1}{N_3}(t) = [{k_{01}}E{N_0}{N_3}(t) + {k_{23}}E{N_1}{N_2}(t) + {k_{R2}}E{N_2}{N_3}(t) + ( - {k_{12}} - {k_{R1}} + {M_3} - 2{P_4}{M_3} - 2{k_d})E{N_1}{N_3}(t)]dt$](https://dxdy-04.korotkov.co.uk/f/3/c/f/3cf7cc3bc81081d1ade444004f8f1a0782.png "$dE{N_1}{N_3}(t) = [{k_{01}}E{N_0}{N_3}(t) + {k_{23}}E{N_1}{N_2}(t) + {k_{R2}}E{N_2}{N_3}(t) + ( - {k_{12}} - {k_{R1}} + {M_3} - 2{P_4}{M_3} - 2{k_d})E{N_1}{N_3}(t)]dt$")
![$dE{N_0}{N_3}(t) = [{k_{R1}}E{N_1}{N_3}(t) + {k_{23}}E{N_0}{N_2}(t) + ({M_0} + {M_3} - 2{P_4}{M_3} - {k_{01}} - 2{k_d})E{N_0}{N_3}(t)]dt$](https://dxdy-04.korotkov.co.uk/f/3/4/8/348bffcfc0622b3218a434a8370e982782.png "$dE{N_0}{N_3}(t) = [{k_{R1}}E{N_1}{N_3}(t) + {k_{23}}E{N_0}{N_2}(t) + ({M_0} + {M_3} - 2{P_4}{M_3} - {k_{01}} - 2{k_d})E{N_0}{N_3}(t)]dt$")
![$dE{N_3}{N_4}(t) = [{k_{23}}E{N_2}{N_4}(t) + {P_4}{M_3}EN_3^2(t) + ({M_3} - 2{P_4}{M_3} + {M_4} - 2{k_d})E{N_3}{N_4}(t)]dt$](https://dxdy-02.korotkov.co.uk/f/1/d/0/1d0de50007ec71f6c80f2bcfa498de3382.png "$dE{N_3}{N_4}(t) = [{k_{23}}E{N_2}{N_4}(t) + {P_4}{M_3}EN_3^2(t) + ({M_3} - 2{P_4}{M_3} + {M_4} - 2{k_d})E{N_3}{N_4}(t)]dt$")
![$dE{N_2}{N_4}(t) = [{k_{12}}E{N_1}{N_4}(t) + {P_4}{M_3}E{N_2}{N_3}(t) + ({M_4} - {k_{23}} - {k_{R2}} - 2{k_d})E{N_2}{N_4}(t)]dt$](https://dxdy-04.korotkov.co.uk/f/3/c/1/3c1dedc69535669e7fb31a90b74cdc6582.png "$dE{N_2}{N_4}(t) = [{k_{12}}E{N_1}{N_4}(t) + {P_4}{M_3}E{N_2}{N_3}(t) + ({M_4} - {k_{23}} - {k_{R2}} - 2{k_d})E{N_2}{N_4}(t)]dt$")
![$dE{N_1}{N_4}(t) = [{k_{01}}E{N_0}{N_4}(t) + {k_{R2}}E{N_2}{N_4}(t) + {P_4}{M_3}E{N_1}{N_3}(t) + ({M_4} - {k_{12}} - {k_{R1}} - 2{k_d})E{N_1}{N_4}(t)]dt$](https://dxdy-03.korotkov.co.uk/f/6/3/c/63c0b7932a1b29158d3f545740a2666082.png "$dE{N_1}{N_4}(t) = [{k_{01}}E{N_0}{N_4}(t) + {k_{R2}}E{N_2}{N_4}(t) + {P_4}{M_3}E{N_1}{N_3}(t) + ({M_4} - {k_{12}} - {k_{R1}} - 2{k_d})E{N_1}{N_4}(t)]dt$")
![$dE{N_0}{N_4}(t) = [{k_{R1}}E{N_1}{N_4}(t) + {P_4}{M_3}E{N_0}{N_3}(t) + ({M_0} + {M_4} - {k_{01}} - 2{k_d})E{N_0}{N_4}(t)]dt$](https://dxdy-02.korotkov.co.uk/f/5/d/5/5d5af18556ece8402258dabfae723a8f82.png "$dE{N_0}{N_4}(t) = [{k_{R1}}E{N_1}{N_4}(t) + {P_4}{M_3}E{N_0}{N_3}(t) + ({M_0} + {M_4} - {k_{01}} - 2{k_d})E{N_0}{N_4}(t)]dt$")
