On the module structure of the center of hyperelliptic Krichever-Novikov algebras II

Abstract

Let R := R2(p)=C[t 1, u : u2 = t(t-α1)·s (t-α2n)] be the coordinate ring of a nonsingular hyperelliptic curve and let g R be the corresponding current Lie algebra. black Here g is a finite dimensional simple Lie algebra defined over C and equation* p(t)= t(t-α1)·s (t-α2n)=Σk=12n+1aktk. equation* In earlier work, Cox and Im gave a generator and relations description of the universal central extension of g R in terms of certain families of polynomials Pk,i and Qk,i and they described how the center R/dR of this universal central extension decomposes into a direct sum of irreducible representations when the automorphism group was the cyclic group C2k or the dihedral group D2k. We give examples of 2n-tuples (α1,…,α2n), which are the automorphism groups Gn=Dicn, Un Dn (n odd), or Un (n even) of the hyperelliptic curves equation S=C[t, u: u2 = t(t-α1)·s (t-α2n)] equation given in [CGLZ17]. In the work below, we describe this decomposition when the automorphism group is Un=Dn, where n is odd.