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28 results on '"Howe, Roger E."'

1. Reciprocity Algebras and Branching for Classical Symmetric Pairs

Author

Howe, Roger E., Tan, Eng Chye, and Willenbring, Jeb F.

Subjects
Mathematics - Representation Theory
Abstract

We study branching laws for a classical group $G$ and a symmetric subgroup $H$. Our approach is through the {\it branching algebra}, the algebra of covariants for $H$ in the regular functions on the natural torus bundle over the flag manifold for $G$. We give concrete descriptions of (natural subalgebras of) the branching algebra using classical invariant theory. In this context, it turns out that the ten classes of classical symmetric pairs $(G,H)$ are associated in pairs, $(G,H)$ and $(H',G')$, and that the (partial) branching algebra for $(G,H)$ also describes a branching law from $H'$ to $G'$. (However, the second branching law may involve certain infinite-dimensional highest weight modules for $H'$.) To highlight the fact that these algebras describe two branching laws simultaneously, we call them {\it reciprocity algebras}. Our description of the reciprocity algebras reveals that they all are related to the tensor product algebra for $GL_n$. This relation is especially strong in the {\it stable range}. We give quite explicit descriptions of reciprocity algebras in the stable range in terms of the tensor product algebra for $GL_n$. This is the structure lying behind formulas for branching multiplicities in terms of Littlewood-Richardson coefficients., Comment: 39 pages

Published
2004

2. A Basis for the GL_n Tensor Product Algebra

Author

Howe, Roger E., Tan, Eng Chye, and Willenbring, Jeb F.

Subjects
Mathematics - Representation Theory
Abstract

This paper focuses on the $GL_n$ tensor product algebra, which encapsulates the decomposition of tensor products of arbitrary finite dimensional irreducible representations of $GL_n$. We will describe an explicit basis for this algebra. This construction relates directly with the combinatorial description of Littlewood-Richardson coefficients in terms of Littlewood-Richardson tableaux. Philosophically, one may view this construction as a recasting of the Littlewood-Richardson rule in the context of classical invariant theory., Comment: 34 pages

Published
2004

3. Stable branching rules for classical symmetric pairs

Author

Howe, Roger E., Tan, Eng Chye, and Willenbring, Jeb F.

Subjects
Mathematics - Representation Theory, 22E46
Abstract

We approach the problem of obtaining branching rules from the point of view of dual reductive pairs. Specifically, we obtain a stable branching rule for each of 10 classical families of symmetric pairs. In each case, the branching multiplicities are expressed in terms of Littlewood-Richardson coefficients. Some of the formulas are classical and include, for example, Littlewood's restriction rule as a special case., Comment: 26 pages

Published
2003

4. Homogeneous functions on light cones: the infinitesimal structure of some degenerate principal series representations

Author

Howe, Roger E.

Subjects
Mathematics - Representation Theory
Abstract

In this paper we study the reducibility, composition series and unitarity of the components of some degenerate principal series representations of $\RMO(p,q)$, $\RMU(p,q)$ and $\SP(p,q)$. This is done by realizing these representations in paces of homogeneous functions on light cones and writing down the explicit actions of the universal enveloping algebra of the group concerned., Comment: 74 pages

Published
1992

5. The Legacy of Dick Askey (1933–2019)

Author

Cohl, Howard S, primary, Ismail, Mourad E H, additional, Wu, Hung-Hsi, additional, Terwilliger, Paul M, additional, Andrews, George E, additional, Alladi, Krishnaswami, additional, Berndt, Bruce C., additional, Vinet, Luc, additional, Zhedanov, Alexei, additional, Stanton, Dennis W, additional, Koornwinder, Tom H, additional, Cuoco, Al, additional, Howe, Roger E, additional, and Roberts, Curtis D, additional

Published
2022
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12. Homogenous functions on light cones: the infinitesimal structure of some degenerate principal series representations

Author

Howe, Roger E. and Tan, Eng-Chye

Subjects
Algebra, Abstract -- Analysis, Representations of groups -- Analysis, Mathematics
Abstract

The description of the representations of the indefinite orthogonal groups O(p,q) is presented. From the formulas for the O(p,q) action, the structure of the composition series is found to depend on the parities of p and q. The formulas are applied to determine which representations carry invariant Hermitian forms and which constituents of the representations are unitary. The role of these representations in the general theory of representations of semisimple Lie groups. semisimple Lie groups is discussed.

Published
1993

15. The Cuoco Configuration.

Author

Howe, Roger E.

Subjects
*SQUARES (Instruments), *CONFIGURATIONS (Geometry), *TRIANGLES, *EUCLID'S elements, *PYTHAGOREAN theorem
Abstract

The article offers information on a proof of the Law of Cosines using squares constructed on sides of the triangle. It discusses the configuration consisting of the original triangle and the triangle defined by the centers of these squares. It mentions that the Law of Cosines is a direct generalization of Euclid's proof of the Pythagorean Theorem.

Published
2013
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17. On the principal series of ${\rm Gl}\sb{n}$ over$p$-adic fields

Author

Howe, Roger E.

Abstract

The entire principal series of $ G = G{l_n}(F)$p-adic field F, is analyzed after the manner of the analysis of Bruhat and Satake for the spherical principal series. If K is the group of integral matrices in $ G{l_n}(F)$K is defined. It is shown that precisely one of these occurs, and only once, in a given principal series representation of G. Further, the spherical function algebras attached to these representations of K are all shown to be abelian, and their explicit spectral decomposition is accomplished using the principal series of G. Computation of the Plancherel measure is reduced to MacDonald's computation for the spherical principal series, as is computation of the spherical functions themselves.

Published
1973

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