A one parameter family of Volterra-type operators

Abstract

For every α ∈ (0,+∞) and p,q ∈ (1,+∞) let Tα be the operator Lp[0,1] Lq[0,1] defined via the equality (Tα f)(x) := ∫0xα f(y) d y. We study the norms of Tα for every p, q. In the case p=q we further study its spectrum, point spectrum, eigenfunctions, and the norms of its iterates. Moreover, for the case p=q=2 we determine the point spectrum and eigenfunctions for T*α Tα, where T*α is the adjoint operator.