Asymptotics of determinants of discrete Schr\"odinger operators

Abstract

We consider the asymptotics of the determinants of large discrete Schr\"odinger operators, i.e. "discrete Laplacian + diagonal": \[Tn(f) = -[δj,j+1+δj+1,j] + diag(f(1n), f(2n),…, f(nn)) \] We extend a result of M. Kac, who found a formula for \[n→∞ (Tn(f))G(f)n \] in terms of the values of f, where G(f) is a constant. We extend this result in two ways: First, we consider shifting the index: Let \[Tn(f;) = -[δj,j+1+δj+1,j] + diag(f(n), f(1+ n), …, f(n-1+ n)) \] We calculate Tn(f;)/G(f)n and show that this limit can be any positive number by shifting , even though the asymptotic eigenvalue distribution of Tn(f;) does not depend on . Secondly, we derive a formula for the asymptotics of Tn(f)/G(f)n when f has jump discontinuities. In this case the asymptotics depend on the fractional part of c n, where c is a point of discontinuity.