On determinant expansions for Hankel operators

Abstract

Let w be a semiclassical weight which is generic in Magnus's sense, and (pn)n=0∞ the corresponding sequence of orthogonal polynomials. The paper expresses the Christoffel--Darboux kernel as a sum of products of Hankel integral operators. For ∈ L∞ (i R), let W( ) be the Wiener-Hopf operator with symbol . The paper gives sufficient conditions on such that 1/ W( )W(-1)= (I-φ1φ2) where φ1 and φ2 are Hankel operators that are Hilbert--Schmidt. For certain , Barnes's integral leads to an expansion of this determinant in terms of the generalised hypergeometric nFm. These results extend those of Basor and Chen [2], who obtained 4F3 likewise. The paper includes examples where the Wiener--Hopf factors are found explicitly.