Hochschild cohomology of Fermat type polynomials with non-abelian symmetries

Abstract

For a polynomial f = x1n + … + xNn let Gf be the non--abelian maximal group of symmetries of f. This is a group generated by all g ∈ GL(N,C), rescaling and permuting the variables, so that f(x) = f(g · x). For any G ⊂eq Gf we compute explicitly Hochschild cohomology of the category of G--equivarint matrix factorizations of f. We introduce the pairing on it showing that it is a Frobenius algebra.