generalized Radon transforms on fractal measures
Abstract
In the setting of a general Borel measure μ on Rd with the natural ball size condition μ[B(x,r)]≤ Crs, we establish the Lp(μ)-Lq(μ)-estimate for the generalized Radon transform (Af)(x):=∫(x,y)=0(fμ)(y)(x,y)dσx(y), where is a smooth function away from the diagonal. Among other reasonable assumptions, an L2-Sobolev bound on A on Rd is imposed. This bound is satisfied in many natural situations. The main result is, in general, sharp up to endpoints.
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