Harmonic Analysis: Proceedings of a Conference Held in Sendai, Japan, August 14-18, 1990Satoru Igari |
Contents
G ALEXOPOULOS Paraboloc Harnack inequalities and Riesz transforms on | 1 |
H ARAI Harmonic analysis with respect to degenerate Laplacian on strictly | 15 |
ASH and R BROWN Uniqueness and nonuniqueness for harmonic functions | 30 |
Copyright | |
16 other sections not shown
Common terms and phrases
Bergman metric Borel measure boundary bounded Co(G compact condition conformal factors conformal metrics converges Corollary CR manifolds cube decomposition defined denote differential equivalent estimate Euclidean exponentially small finite formula Fourier transform Haar measure Harmonic Analysis harmonic function Harnack Heisenberg group Hence holds hypoellipticity implies interpolation isospectral isospectral set Japan L²(G Laplacian Lemma Lie algebra Lie group linear Math maximal function maximal operator norm inequalities obtain orthogonal orthonormal Paley-Wiener theorem polynomial positive constant proof of Theorem Proposition prove respect result Riemannian manifold Riesz products s¯¹ds satisfying semisimple singular integral Sobolev Sobolev inequality solutions space spline square function strictly pseudoconvex subset Suppose symmetric Szegö kernel Tohoku Univ V₁ variables vector fields vr,i wavelet weak type weight X₁ zero