Dilated Hankel determinants

Abstract

For a sequence a=(a0,a1,…) we define its dilated Hankel determinant Hn( a)=(a2i+j)0 i,j n-1, the minor of the infinite Hankel matrix (ai+j) formed from the even-indexed rows and the first n columns. We prove that, for a broad class of sequences, Hn admits a remarkably simple product evaluation. This mirrors the behaviour of the classical Hankel determinant Hn, but with two key distinctions: the class of sequences for which such formulas are known is far larger in the classical case; and, whereas Hn enjoys a single universal evaluation -- the Heilermann formula via the Jacobi continued fraction -- no analogous general method exists for the dilated determinant, which is therefore considerably more challenging. Our evaluations instead rest on six methods developed here, four of general scope and two of a more specialised nature. The cases treated include the factorial numbers, the Catalan and central binomial coefficients; the Euler numbers and a one-parameter secant family; the involution numbers; the Springer numbers along with elliptic and derivative deformations; the reciprocal-sine function, whose evaluation rests on a new Catalan determinant proved by condensation; a Bessel analogue of the Euler numbers; and a multiplicative Bessel family. As an application, we settle a conjecture of Chapoton and the author on the roots of the Poupard and Kreweras polynomials.

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