A family of anisotropic integral operators and behaviour of its maximal eigenvalue

Abstract

We study the family of compact integral operators Kβ in L2( R) with the kernel Kβ(x, y) = 1π11 + (x-y)2 + β2(x, y), depending on the parameter β >0, where (x, y) is a symmetric non-negative homogeneous function of degree γ 1. The main result is the following asymptotic formula for the maximal eigenvalue Mβ of Kβ: Mβ = 1 - λ1 β2γ+1 + o(β2γ+1), β 0, where λ1 is the lowest eigenvalue of the operator A = |d/dx| + (x, x)/2. A central role in the proof is played by the fact that Kβ, β>0, is positivity improving. The case (x, y) = (x2 + y2)2 has been studied earlier in the literature as a simplified model of high-temperature superconductivity.