Masatoshi Kitagawa scite author profile

Masatoshi Kitagawa

5Publications

13Citation Statements Received

80Citation Statements Given

How they've been cited

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122

Affiliations

Waseda University, The University of Tokyo

Publications

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Family of $\mathscr{D}$-modules and representations with a boundedness property

Kitagawa¹

2021

Preprint

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In the representation theory of real reductive Lie groups, many objects have finiteness properties. For example, the lengths of Verma modules and principal series representations are finite, and more precisely, they are bounded. In this paper, we introduce a notion of uniformly bounded families of holonomic D-modules to explain and find such boundedness properties.A uniform bounded family has good properties. For instance, the lengths of modules in the family are bounded and the uniform boundedness is preserved by direct images and inverse images. By the Beilinson-Bernstein correspondence, we can deduce several boundedness results about the representation theory of complex reductive Lie algebras from corresponding results of uniformly bounded families of D-modules. In this paper, we concentrate on proving fundamental properties of uniformly bounded families, and preparing abstract results for applications to the branching problem and harmonic analysis.

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Stability of Branching Laws for Highest Weight Modules

Kitagawa

2014

Transformation Groups

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In this paper, we study the irreducible decomposition of a (C[X], G)-module M for a quasi-affine spherical variety X of a connected reductive algebraic group G over C. We show that for sufficiently large parameters, the decomposition of M with respect to G is reduced to the decomposition of the 'fiber' M/m(x 0 )M with respect to some reductive subgroup L of G. In particular, we obtain a method to compute the maximum value of multiplicities in M . Our main result is a generalization of earlier work by F. Satō in [17]. We apply this result to branching laws of holomorphic discrete series representations with respect to symmetric pairs of holomorphic type. We give a necessary and sufficient condition for multiplicity-freeness of the branching laws.

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Stability of branching laws for spherical varieties and highest weight modules

Kitagawa¹

2013

Proc. Japan Acad. Ser. A Math. Sci.

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Stability of Branching Laws for Highest Weight Modules

Kitagawa¹

2013

Preprint

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Family of 𝒟-modules and representations with a boundedness property

Kitagawa

2023

Represent. Theory

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In the representation theory of real reductive Lie groups, many objects have finiteness properties. For example, the lengths of Verma modules and principal series representations are finite, and more precisely, they are bounded. In this paper, we introduce a notion of uniformly bounded families of holonomic D {\mathscr {D}} -modules to explain and find such boundedness properties. A uniform bounded family has good properties. For instance, the lengths of modules in the family are bounded and the uniform boundedness is preserved by direct images and inverse images. By the Beilinson–Bernstein correspondence, we deduce several boundedness results about the representation theory of complex reductive Lie algebras from corresponding results of uniformly bounded families of D {\mathscr {D}} -modules. In this paper, we concentrate on proving fundamental properties of uniformly bounded families, and preparing abstract results for applications to the branching problem and harmonic analysis.

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