Gorenstein simplices with the given h*-polynomial are classified up to unimodular equivalence by strict divisor chains in the divisor lattice of v, yielding an explicit counting formula.
Batyrev and Johannes Hofscheier , Title =
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Gorenstein simplices of dimension 2s-1 and degree s that are not lattice pyramids are characterized by even binary self-complementary codes, yielding classifications for degrees 3 and 4.
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Classification and counting of Gorenstein simplices with $h^*$-polynomial $1+t^k+\cdots+t^{(v-1)k}$
Gorenstein simplices with the given h*-polynomial are classified up to unimodular equivalence by strict divisor chains in the divisor lattice of v, yielding an explicit counting formula.
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Gorenstein Simplices and Even Binary Self-Complementary Codes
Gorenstein simplices of dimension 2s-1 and degree s that are not lattice pyramids are characterized by even binary self-complementary codes, yielding classifications for degrees 3 and 4.