Polynomials associated to Lie algebras
Abstract
We associate to a semisimple complex Lie algebra g a sequence of polynomials P,g(x)∈Q[x] in r variables, where r is the rank of g and =0,1,2,… . The polynomials P,g(x) are uniquely associated to the isomorphism class of g, up to re-numbering the variables, and are defined as special values of a variant of Witten's zeta function. Another set of polynomials associated to g were defined in 2008 by Komori, Matsumoto and Tsumura using different special values of another variant of Witten's zeta function.
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