Enveloping superalgebra U(osp(1|2)) and orthogonal polynomials in discrete indeterminate
Abstract
Let A be an associative simple (central) superalgebra over C and L an invariant linear functional on it (trace). Let a at be an antiautomorphism of A such that (at) t=(-1)p(a)a, where p(a) is the parity of a, and let L(at)=L(a). Then A admits a nondegenerate supersymmetric invariant bilinear form a, b=L(abt). For A=U(sl(2))/m, where m is any maximal ideal of U(sl(2)), Leites and I have constructed orthogonal basis in A whose elements turned out to be, essentially, Chebyshev (Hahn) polynomials in one discrete variable. Here I take A=U(osp(1|2))/m for any maximal ideal m and apply a similar procedure. As a result we obtain either Hahn polynomials over C[τ], where τ2∈ C, or a particular case of Meixner polynomials, or --- when A=Mat(n+1|n) --- dual Hahn polynomials of even degree, or their (hopefully, new) analogs of odd degree. Observe that the nondegenerate bilinear forms we consider for orthogonality are, as a rule, not sign definite.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.