Necessary and sufficient conditions for boundedness of commutators of the general fractional integral operators on weighted Morrey spaces

Abstract

We prove that b is in Lip() if and only if the commutator [b,L-α/2] of the multiplication operator by b and the general fractional integral operator L-α/2 is bounded from the weighed Morrey space Lp,k(ω) to Lq,kq/p(ω1-(1-α/n)q,ω), where 0<β<1, 0<α+β<n, 1<p<n/(α+β), 1/q=1/p-(α+β)/n, 0≤ k<p/q, ωq/p∈ A1 and rω> 1-kp/q-k, and here rω denotes the critical index of ω for the reverse H\"older condition.