Title of article
Upper bounds on the Witten index for supersymmetric lattice models by discrete Morse theory
Author/Authors
Engstrِm، نويسنده , , Alexander، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
10
From page
429
To page
438
Abstract
The Witten index for certain supersymmetric lattice models treated by de Boer, van Eerten, Fendley, and Schoutens, can be formulated as a topological invariant of simplicial complexes, arising as independence complexes of graphs. We prove a general theorem on independence complexes, using discrete Morse theory: if G is a graph and D a subset of its vertex set such that G ∖ D is a forest, then ∑ i dim H ̃ i ( Ind ( G ) ; Q ) ≤ | Ind ( G [ D ] ) | . We use the theorem to calculate upper bounds on the Witten index for several classes of lattices. These bounds confirm some of the computer calculations by van Eerten on small lattices.
homological method and the 3-rule of Fendley et al. is a special case of when G ∖ D lacks edges. We prove a generalized 3-rule and introduce lattices in arbitrary dimensions satisfying it.
Journal title
European Journal of Combinatorics
Serial Year
2009
Journal title
European Journal of Combinatorics
Record number
1547104
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