次椭圆函数不等式

IF 1 3区 数学 Q1 MATHEMATICS Mathematische Zeitschrift Pub Date : 2024-04-29 DOI:10.1007/s00209-024-03493-w
Michael Ruzhansky, Nurgissa Yessirkegenov
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引用次数: 0

摘要

在这篇论文中,我们推导出了在零potent Lie 群上的一般同质不变次椭球微分算子的各种函数不等式。得到的不等式包括 Hardy、Sobolev、Rellich、Hardy-Littllewood-Sobolev、Gagliardo-Nirenberg、Caffarelli-Kohn-Nirenberg 和 Heisenberg-Pauli-Weyl 型不确定性不等式。其中一些估计值在亚拉普拉卡算子的情况下是已知的,然而,对于更一般的次椭圆算子,几乎所有估计值都是新的,因为还没有获得这些估计值的方法。本文所开发的方法依赖于建立同质李群上哈代不等式的积分版本,我们还为这些不等式的权重找到了必要和充分条件。因此,我们利用与所描述的次椭圆算子相关的里兹核和贝塞尔核,将这种积分哈代不等式与不同的次椭圆不等式联系起来。
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Hypoelliptic functional inequalities

In this paper we derive a variety of functional inequalities for general homogeneous invariant hypoelliptic differential operators on nilpotent Lie groups. The obtained inequalities include Hardy, Sobolev, Rellich, Hardy–Littllewood–Sobolev, Gagliardo–Nirenberg, Caffarelli–Kohn–Nirenberg and Heisenberg–Pauli–Weyl type uncertainty inequalities. Some of these estimates have been known in the case of the sub-Laplacians, however, for more general hypoelliptic operators almost all of them appear to be new as no approaches for obtaining such estimates have been available. The approach developed in this paper relies on establishing integral versions of Hardy inequalities on homogeneous Lie groups, for which we also find necessary and sufficient conditions for the weights for such inequalities to be true. Consequently, we link such integral Hardy inequalities to different hypoelliptic inequalities by using the Riesz and Bessel kernels associated to the described hypoelliptic operators.

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来源期刊
CiteScore
1.60
自引率
0.00%
发文量
236
审稿时长
3-6 weeks
期刊介绍: "Mathematische Zeitschrift" is devoted to pure and applied mathematics. Reviews, problems etc. will not be published.
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