Bergman projection on Lebesgue space induced by doubling weight

Abstract

Let ω and be radial weights on the unit disc of the complex plane, and denote σ=ωp'-p'p and ωx =∫01 sx ω(s)\,ds for all 1 x<∞. Consider the one-weight inequality equationab1 \|Pω(f)\|Lp C\|f\|Lp, 1<p<∞, equation for the Bergman projection Pω induced by ω. It is shown that the moment condition Dp(ω,)=n∈ N\0\(np+1)1p(σnp'+1)1p'ω2n+1<∞ is necessary for ab1 to hold. Further, Dp(ω,)<∞ is also sufficient for ab1 if admits the doubling properties 0 r<1∫r1 ω(s)s\,ds∫1+r21 ω(s)s\,ds<∞ and 0 r<1∫r1 ω(s)s\,ds∫r1-1-rK ω(s)s\,ds<∞ for some K>1. In addition, an analogous result for the one weight inequality \|Pω(f)\|Dp,k C\|f\|Lp, where f Dp, kp =Σj=0k-1| f(j)(0)|p+ ∫D f(k)(z)p (1-|z| )kp(z)\,dA(z)<∞, k∈ N, is established. The inequality ab1 is further studied by using the necessary condition Dp(ω,)<∞ in the case of the exponential type weights (r)= (-α(1-rl)β ) and ω(r)= (-α(1-rl)β ), where 0<α, \, α, \, l, \, l<∞ and 0<β , \, β 1.