Harmonic Analysis

Inhaltsverzeichnis

• Nankai lecture in -Neumann problem.
• Duality of H 1 and BMO on positively curved manifolds and their characterizations.
• Oscillatory integral with polynomial phase.
• On a generalized paraproduct defined by non-convolution.
• H p boundedness of claderón-Zygmund operators for product domains.
• A ? condition characterized by maximal geometric mean operator.
• A weighted norm inequality for oscillatory singular integrals.
• The nilpotent Lie group G d+2 and a class of differential operators with multiple characteristics.
• Characterization of BMO p sq - functions by generalized Carleson measure.
• Besov spaces of paley-wiener type.
• The weak H p spaces on homogeneous groups.
• Applications of Hörmander multiplier theorem to approximation in real Hardy spaces.
• Weighted norm inequalities for the restriction of fourier transform to S n?1.
• Weighted sobolev inequality and eigenvalue estimates of Schrödinger operators.
• Convolution singular integral operators on lipschitz curves.
• Multipliers from L 1 (G) to a reflexive segal algebra.
• Weighted norm inequalities for certain maximal operators with approach regions.
• The hausdorff dimension of a class of lacunary trigonomitric series.
• Hermitian nilpotent lie groups: Harmonic analysis as spectral theory of Laplacians.
• Weak coupling asymptotics of schrodinger operators with stark effect.
• Set of zeros of harmonic functions of two variables.
• Ergodic theorem for the functions with uniform mean.
• On the structures of locally compact groups admitting inner invariant means.
• Harmonic boundaries and poisson integrals on symmetric spaces.
• On p-adic cantor function.