A counterexample to Abel-type asymptotics for scaled Volterra equations

Abstract

We consider scaled Volterra equations of the form fn + n k*fn = g for n ∈ N, where g is given and fn is sought. We show that global two-sided Abel-type bounds on a positive kernel k do not force the solutions fn to converge to zero as n +∞. More precisely, we construct a continuous strictly positive kernel globally comparable with the Abel kernel x-1/2, and a continuous strictly positive g, for which a subsequence of (fn)n ∈ N diverges to +∞ at some point x0 > 0. Consequently, the resolvents associated with the scaled kernels nk need not form a generalized approximate identity, in contrast to a couple of classical results.