Splitting of Volterra Integral Operators with Degenerate Kernels

Abstract

Volterra integral operators with non-sign-definite degenerate kernels A(x,t)= Σk=0n Ak(x,t), Ak(x,t)= ak (x) tk, are studied acting from one weighted L2 space on (0,+∞) to another. Imposing an integral doubling condition on one of the weights, it is shown that the operator with the kernel A(x,t) is bounded if and only n+1 operators with kernels Ak(x,t) are all bounded. We apply this result to describe spaces of pointwise multipliers in weighted Sobolev spaces on (0,+∞).