Net Spaces on Lattices, Hardy-Littlewood Type Inequalities, and Their Converses

Rauan Akylzhanov; Michael Ruzhansky

Net Spaces on Lattices, Hardy-Littlewood Type Inequalities, and Their Converses

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Authors

Rauan Akylzhanov
Michael Ruzhansky

Keywords:

net spaces, Lie groups, homogeneous manifolds, Hardy-Littlewood inequality

Abstract

We introduce abstract net spaces on directed sets and prove their embedding and interpolation properties. Typical examples of interest are lattices of irreducible unitary representations of compact Lie groups and of class I representations with respect to a subgroup. As an application, we prove Hardy-Littlewood type inequalities and their converses on compact Lie groups and on compact homogeneous manifolds.

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Published

2017-09-30

How to Cite

Akylzhanov, R., & Ruzhansky, M. (2017). Net Spaces on Lattices, Hardy-Littlewood Type Inequalities, and Their Converses. Eurasian Mathematical Journal, 8(3), 10–27. Retrieved from https://emj.enu.kz/index.php/main/article/view/667