José M. Conde-Alonso, Adrián M. González-Pérez, Javier Parcet, Eduardo Tablate
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引用次数: 0
摘要
建立了高阶单李群群von Neumann代数上傅里叶乘子的lp $L_p$有界性的正则性条件。这提供了一个自然的Hörmander-Mikhlin (HM)准则,根据符号的李导数和伴随表示给出的度量。根据Lafforgue/de la Salle的刚性定理,我们的条件使符号在无穷远处有一定的衰减。它改进并广泛推广了parcot、richard和de la Salle最近关于S L n(R)$ S L_n(\mathbf {R})$的结果。我们的方法部分基于任意李群的一个尖锐的局部HM定理,该定理是由作者最近对奇异非toeplitz舒尔乘子的估计而来的。我们将后者推广到任意局部紧群,并改进了Junge, Mei和paret在群代数中基于循环的傅里叶乘子方法。本文还讨论了几个相关的开放性问题。
A Hörmander–Mikhlin theorem for higher rank simple Lie groups
We establish regularity conditions for -boundedness of Fourier multipliers on the group von Neumann algebras of higher rank simple Lie groups. This provides a natural Hörmander–Mikhlin (HM) criterion in terms of Lie derivatives of the symbol and a metric given by the adjoint representation. In line with Lafforgue/de la Salle's rigidity theorem, our condition imposes certain decay of the symbol at infinity. It refines and vastly generalizes a recent result by Parcet, Ricard, and de la Salle for . Our approach is partly based on a sharp local HM theorem for arbitrary Lie groups, which follows in turn from recent estimates by the authors on singular non-Toeplitz Schur multipliers. We generalize the latter to arbitrary locally compact groups and refine the cocycle-based approach to Fourier multipliers in group algebras by Junge, Mei, and Parcet. A few related open problems are also discussed.
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The Journal of the London Mathematical Society has been publishing leading research in a broad range of mathematical subject areas since 1926. The Journal welcomes papers on subjects of general interest that represent a significant advance in mathematical knowledge, as well as submissions that are deemed to stimulate new interest and research activity.
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