Non-invertible quasihomogeneous singularities and their Landau-Ginzburg orbifolds
Abstract
According to the classification of quasihomogeneus singularities, any polynomial f defining such singularity has a decomposition f = f + fadd. The polynomial f is of the certain form while fadd is only restricted by the condition that the singularity of f should be isolated. The polynomial fadd is zero if and only if f is invertible, and in the non-invertible case fadd is arbitrary complicated. In this paper we investigate all possible polynomials fadd for a given non-invertible f. For a given f we introduce the specific small collection of monomials that build up fadd such that the polynomial f = f + fadd defines an isolated quasihomogeneus singularity. If (f,Z/2Z) is Landau-Ginzburg orbifold with such non-invertible polynomial f, we provide the quasihomogeneus polynomial f such that the orbifold equivalence (f,Z/2Z) (f, \id\) holds. We also give the explicit isomorphism between the corresponding Frobenius algebras.
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