On determinants identity minus Hankel matrix

Abstract

In this note, we study the asymptotics of the determinant (IN - β HN) for N large, where HN is the N× N restriction of a Hankel matrix H with finitely many jump discontinuities in its symbol satisfying \|H\|≤ 1. Moreover, we assume β∈ C with |β|<1 and IN denotes the identity matrix. We determine the first order asymtoptics as N∞ of such determinants and show that they exhibit power-like asymptotic behaviour, with exponent depending on the height of the jumps. For example, for the N × N truncation of the Hilbert matrix H with matrix elements π-1(j+k+1)-1, where j,k∈ Z+ we obtain (IN - β HN) = - N2π2 (π(β)+2(β)+o(1)), N∞.