Sharp Convolution Estimates for Measures on Flat Surfaces

## Abstract In this paper, we consider a sequence of multibubble solutions __u~k~__ of the equation where __h__ is a __C__^2,β^ positive function in a compact Riemann surface __M__, and ρ~__k__~ is a constant satisfying lim~__k__→+∞~ ρ~__k__~ = 8__m__π for some positive integer __m__ ≥ 1. We prov

## Abstract In this paper we study the heat equation (of Hodge Laplacian) deformation of (__p, p__)‐forms on a Kähler manifold. After identifying the condition and establishing that the positivity of a (__p, p__)‐form solution is preserved under such an invariant condition, we prove the sharp diffe

## Abstract In the case of submerged multijets impinging on to a flat surface, the limiting current densities were measured at microelectrodes, fixed flush with the target surface using diffusion controlled electrode reactions (i.e. reduction of ferricyanide ion). The height of the multijet distrib

Let \(\mu\) be an invariant measure on a regular orbit in a compact Lie group or in a Lie algebra. We prove sharp \(L^{\prime \prime}-L^{4}\) estimates for the convolution operators defined through \(\mu\). We also obtain similar results for the related Radon transform on the Lie algebra. 1945 Acade