Mirror partner for a Klein quartic polynomial

Abstract

The results of A.Chiodo, Y.Ruan and M.Krawitz associate the mirror partner Calabi-Yau variety X to a Landau--Ginzburg orbifold (f,G) if f is an invertible polynomial satisfying Calabi-Yau condition and the group G is a diagonal symmetry group of f. In this paper we investigate the Landau-Ginzburg orbifolds with a Klein quartic polynomial f = x13x2 + x23x3+x33x1 and G being all possible subgroups of GL(3,C), preserving the polynomial f and also the pairing in its Jacobian algebra. In particular, G is not necessarily abelian or diagonal. The zero-set of polynomial f, called Klein quartic, is a genus 3 smooth compact Riemann surface. We show that its mirror Landau-Ginzburg orbifold is (f,G) with G being a Z/2Z-extension of a Klein four-group.