Another characterizations of Muckenhoupt Ap class

Abstract

This manuscript addresses Muckenhoupt Ap weight theory in connection to Morrey and BMO spaces. It is proved that ω belongs to Muckenhoupt Ap class, if and only if Hardy-Littlewood maximal function M is bounded from weighted Lebesgue spaces Lp(ω) to weighted Morrey spaces Mpq(ω) for 1<q< p<∞. As a corollary, if M is (weak) bounded on Mpq(ω), then ω∈ Ap. The Ap condition also characterizes the boundedness of the Riesz transform Rj and convolution operators Tε on weighted Morrey spaces. Finally, we show that ω∈ Ap if and only if ω∈ BMOp'(ω) for 1≤ p< ∞ and 1/p+1/p'=1.