On properties of Abel integral operators (Q1207894)

Let \[ (A_\alpha u)(x)= \int_x^R (y- x)^{\alpha- 1} u(y)dy, \qquad 0<x <R; \quad 0<\alpha< 1, \] \(\overline {H}_p^\lambda (0, R)= \{f\in H_p^\lambda (R_+)\): \(f(x)=0\) for \(x>R\}\), \(\lambda>0\), where \(H_p^\lambda (R_+)\) is the Nikol'skij space on \(R_+\). It is proved that \(A_\alpha\) acts as an isomorphism from \(\overline {H}_p^\lambda (0, R)\) onto \(\overline {H}_p^{\lambda+ \alpha} (0,R)\). A similar result holds for the Besov spaces.