Hodge diamonds of the Landau--Ginzburg orbifolds
Abstract
Consider the pairs (f,G) with f = f(x1,…,xN) being a polynomial defining a quasihomogeneous singularity and G being a subgroup of SL(N,C), preserving f. In particular, G is not necessary abelian. Assume further that G contains the grading operator jf and f satisfies the Calabi-Yau condition. We prove that the nonvanishing bigraded pieces of the B-model state space of (f,G) form a diamond. We identify its topmost, bottommost, leftmost and rightmost entries as one-dimensional and show that this diamond enjoys the essential horizontal and vertical isomorphisms.
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