Let Gamma be a convex curve in the plane and let mu is an element of M(R-2) be the arc-length measure of Gamma. Let us rotate Gamma by an angle theta and let mu (theta) be the corresponding measure. Let Tf(x, theta) = f *mu (theta) (x). Then parallel to Tf parallel to (L3(TxR2)) less than or equal to c parallel tof parallel to (L3/2(R2)). This is optimal for an arbitrary Gamma. Depending on the curvature of Gamma, this estimate can be improved by introducing mixed-norm estimates of the form parallel to Tf parallel to (Ls(T,Lp'(R2))) less than or equal to c parallel tof parallel to (Lp(R2)) where p and p' are conjugate exponents
Ricci, F., Travaglini, G. (2001). Convex curves, radon transforms and convolution operators defined by singular measures. PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY, 129(6), 1739-1744 [10.1090/S0002-9939-00-05751-8].
Convex curves, radon transforms and convolution operators defined by singular measures
Travaglini, G.
2001
Abstract
Let Gamma be a convex curve in the plane and let mu is an element of M(R-2) be the arc-length measure of Gamma. Let us rotate Gamma by an angle theta and let mu (theta) be the corresponding measure. Let Tf(x, theta) = f *mu (theta) (x). Then parallel to Tf parallel to (L3(TxR2)) less than or equal to c parallel tof parallel to (L3/2(R2)). This is optimal for an arbitrary Gamma. Depending on the curvature of Gamma, this estimate can be improved by introducing mixed-norm estimates of the form parallel to Tf parallel to (Ls(T,Lp'(R2))) less than or equal to c parallel tof parallel to (Lp(R2)) where p and p' are conjugate exponents
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