Semisimplicity of the quantum cohomology for smooth Fano toric varieties
  associated with facet symmetric polytopes

Alexander Givental; Benjamin Nill; Benjamin P. Mirabelli; D. McDuff; David Cox; Günter Ewald; J. Lagarias; K. Fukaya; M. Entov; Maksim Maydanskiy; Matthew Strom Borman; Michael Usher; Mikkel Obro; Robin Hartshorne; T. Delzant; W. Fulton; Wilhelm Ljunggren; William Fulton; Y. Eliashberg; Y. Ostrover; Yaron Ostrover

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Semisimplicity of the quantum cohomology for smooth Fano toric varieties associated with facet symmetric polytopes

Authors: Alexander Givental
Benjamin Nill
Benjamin P. Mirabelli
D. McDuff
David Cox
Günter Ewald
J. Lagarias
K. Fukaya
M. Entov
Maksim Maydanskiy
Matthew Strom Borman
Michael Usher
Mikkel Obro
Robin Hartshorne
T. Delzant
W. Fulton
Wilhelm Ljunggren
William Fulton
Y. Eliashberg
Y. Ostrover
Yaron Ostrover
Publication date: 12 November 2012
Publisher: 'American Institute of Mathematical Sciences (AIMS)'
Doi

Abstract

The degree zero part of the quantum cohomology algebra of a smooth Fano toric symplectic manifold is determined by the superpotential function, W, of its moment polytope. In particular, this algebra is semisimple, i.e. splits as a product of fields, if and only if all the critical points of W are non-degenerate. In this paper we prove that this non-degeneracy holds for all smooth Fano toric varieties with facet-symmetric duals to moment polytopes.Comment: 16 pages; corrected version, published in Electron. Res. Announc. Math. Sc

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