Superelliptic Affine Lie algebras and orthogonal polynomials II
Abstract
Let g be a finite-dimensional complex simple Lie algebra and r,m 2. The universal central extension of the superelliptic current algebra g A is g Ag A (1A/dA), where A=C[t,t-1,u]/ um-(1-2ctr+t2r). We compute the recursion relations governing a natural cocycle basis in 1A/dA and encode them by generating functions admitting closed integral expressions of superelliptic type. The 2r possible choices of initial conditions are classified into four structural types; two canonical choices (types~1 and~2) produce two distinguished polynomial families. We prove that these polynomials satisfy fourth-order linear ordinary differential equations in~c, valid for all integers r,m 2. For the type~2 family the proof combines the Picard-Fuchs theory of the superelliptic curve um=1-2ctr+t2r with an algebraic identification of the explicit coefficient formulas via a rational-function identity argument. After a parity restriction and a reindexing, the resulting sequences are identified with associated ultraspherical polynomials. We show that, for each admissible~n and m4, the corresponding fourth-order equations admit a unique polynomial solution up to scalar multiples.
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