Научный форум dxdy

As Cartier explains, motives are a part of Grothendieck's dream, a vision of unifying number theory and modern topology, and hence almost everything else as well. The theory of motives is still mysterious, although an impressive amount of progress in the related physics and mathematics has been made in the last 30 years. Consider for example the work of Kontsevich on motives and operads in deformation quantization. It's kind of funny that the mathematicians have chosen a word (motives) that starts with M. It's their version of M-theory!

Cohomology in any vector space with a nilpotent operator Q (one such that Q^2 = 0), the kernel of Q modulo the image of Q. That is, the space of closed states (those annihilated by Q) with the exact states (those of the form ) defined to be equivalent to zero. De Rham cohomobgy is the cohomology of the exterior derivative d acting on differential forms. On a complex manifold, Dolbeault cohomology is the cohomology of and (the (1,0) and (0,1) parts of d) on (p, q)-forms. Homology is the cohomology of the boundary operator. BRST cohomology is the cohomology of the BRST operator, and defines the physical space of a gauge-invariant theory.