On weighted estimates for a class of Volterra integral operators

Abstract

Volterra integral operators A=Σk=0m Ak, ( Ak f)(x)= ak (x)∫0x tk f(t) \,dt, are studied acting between weighted L2 spaces on (0,+∞). Under certain conditions on the weights and functions ak, it is shown that A is bounded if and only if each Ak is bounded. This result is then applied to describe spaces of pointwise multipliers in weighted Sobolev spaces on (0,+∞).