Your search keyword '"Yoshiki Oshima"' showing total 5 results

1. Determinant formula for parabolic Verma modules of Lie superalgebras

Author

Yoshiki Oshima and Masahito Yamazaki

Subjects

High Energy Physics - Theory, Pure mathematics, Algebra and Number Theory, Verma module, 010308 nuclear & particles physics, FOS: Physical sciences, Lie superalgebra, Generalized Verma module, 01 natural sciences, Affine Lie algebra, Lie conformal algebra, Graded Lie algebra, Algebra, High Energy Physics - Theory (hep-th), Mathematics::Quantum Algebra, 0103 physical sciences, Lie algebra, FOS: Mathematics, Representation Theory (math.RT), Mathematics::Representation Theory, 010306 general physics, Mathematics - Representation Theory, Mathematics, Supersymmetry algebra

Abstract

We prove a determinant formula for a parabolic Verma module of a Lie superalgebra, previously conjectured by the second author. Our determinant formula generalizes the previous results of Jantzen for a parabolic Verma module of a (non-super) Lie algebra, and of Kac concerning a (non-parabolic) Verma module for a Lie superalgebra. The resulting formula is expected to have a variety of applications in the study of higher-dimensional supersymmetric conformal field theories. We also discuss irreducibility criteria for the Verma module., 24 pages

Published

2018

2. Knapp–Stein type intertwining operators for symmetric pairs

Author

Bent Ørsted, Jan Möllers, and Yoshiki Oshima

Subjects

Secondary, Pure mathematics, General Mathematics, Open set, Double flag variety, 01 natural sciences, 0103 physical sciences, FOS: Mathematics, Invariant trilinear forms, Uniqueness, Symmetric pair, Representation Theory (math.RT), Symmetry breaking operator, 0101 mathematics, Meromorphic function, Mathematics, 010102 general mathematics, Intertwining operator, Operator theory, Principal series, Primary 22E45, Secondary 47G10, Algebra, Knapp-Stein intertwiner, 010307 mathematical physics, Mathematics - Representation Theory, Primary

Abstract

For a symmetric pair $(G,H)$ of reductive groups we construct a family of intertwining operators between spherical principal series representations of $G$ and $H$ that are induced from parabolic subgroups satisfying certain compatibility conditions. The operators are given explicitly in terms of their integral kernels and we prove convergence of the integrals for an open set of parameters and meromorphic continuation. We further discuss uniqueness of intertwining operators, and for the rank one cases $$ (G,H)=(SU(1,n;\mathbb{F}),S(U(1,m;\mathbb{F})\times U(n-m;\mathbb{F}))), \qquad \mathbb{F}=\mathbb{R},\mathbb{C},\mathbb{H},\mathbb{O}, $$ and for the pair $$ (G,H)=(GL(4n,\mathbb{R}),GL(2n,\mathbb{C})) $$ we show that for a certain choice of maximal parabolic subgroups our operators generically span the space of intertwiners., 44 pages, added another detailed example in Section 5

Published

2016

3. On Orbits in Double Flag Varieties for Symmetric Pairs

Author

Hiroyuki Ochiai, Xuhua He, Yoshiki Oshima, and Kyo Nishiyama

Subjects

Discrete mathematics, Algebra and Number Theory, Flag (linear algebra), Unipotent, Automorphism, Semisimple algebraic group, Combinatorics, 14M15 (Primary) 53C35, 14M17 (Secondary), Borel subgroup, Simply connected space, FOS: Mathematics, Generalized flag variety, Geometry and Topology, Representation Theory (math.RT), Mathematics - Representation Theory, Quotient, Mathematics

Abstract

Let $ G $ be a connected, simply connected semisimple algebraic group over the complex number field, and let $ K $ be the fixed point subgroup of an involutive automorphism of $ G $ so that $ (G, K) $ is a symmetric pair. We take parabolic subgroups $ P $ of $ G $ and $ Q $ of $ K $ respectively and consider the product of partial flag varieties $ G/P $ and $ K/Q $ with diagonal $ K $-action, which we call a \emph{double flag variety for symmetric pair}. It is said to be \emph{of finite type} if there are only finitely many $ K $-orbits on it. In this paper, we give a parametrization of $ K $-orbits on $ G/P \times K/Q $ in terms of quotient spaces of unipotent groups without assuming the finiteness of orbits. If one of $ P \subset G $ or $ Q \subset K $ is a Borel subgroup, the finiteness of orbits is closely related to spherical actions. In such cases, we give a complete classification of double flag varieties of finite type, namely, we obtain classifications of $ K $-spherical flag varieties $ G/P $ and $ G $-spherical homogeneous spaces $ G/Q $., 47 pages, 3 tables; add all the details of the classification

Published

2013

4. Classification of symmetric pairs with discretely decomposable restrictions of (𝔤,K)-modules

Author

Yoshiki Oshima and Toshiyuki Kobayashi

Subjects

Derived functor, Applied Mathematics, General Mathematics, Existential quantification, Lambda, Combinatorics, Tensor product, FOS: Mathematics, Pi, Representation Theory (math.RT), Special case, Mathematics::Representation Theory, Representation (mathematics), Mathematics - Representation Theory, 22E46 (Primary) 53C35 (Secondary), Mathematics

Abstract

We give a complete classification of reductive symmetric pairs (g, h) with the following property: there exists at least one infinite-dimensional irreducible (g,K)-module X that is discretely decomposable as an (h,H \cap K)-module. We investigate further if such X can be taken to be a minimal representation, a Zuckerman derived functor module A_q(\lambda), or some other unitarizable (g,K)-module. The tensor product $\pi_1 \otimes \pi_2$ of two infinite-dimensional irreducible (g,K)-modules arises as a very special case of our setting. In this case, we prove that $\pi_1 \otimes \pi_2$ is discretely decomposable if and only if they are simultaneously highest weight modules., Comment: To appear in Crelles J. (19 pages)

Published

2013

5. Localization of cohomological induction

Author

Yoshiki Oshima

Subjects

Sheaf cohomology, Pure mathematics, General Mathematics, Flag (linear algebra), Subalgebra, (g,K)-module, Reductive group, Tensor product, Mathematics::K-Theory and Homology, Algebraic group, D-module, FOS: Mathematics, 22E47 (Primary) 14F05, 20G20 (Secondary), Representation Theory (math.RT), Mathematics - Representation Theory, Mathematics

Abstract

We give a geometric realization of cohomologically induced (g,K)-modules. Let (h,L) be a subpair of (g,K). The cohomological induction is an algebraic construction of (g,K)-modules from a (h,L)-module V. For a real semisimple Lie group, the duality theorem by Hecht, Milicic, Schmid, and Wolf relates (g,K)-modules cohomologically induced from a Borel subalgebra with D-modules on the flag variety of g. In this article we extend the theorem for more general pairs (g,K) and (h,L). We consider the tensor product of a D-module and a certain module associated with V, and prove that its sheaf cohomology groups are isomorphic to cohomologically induced modules., Comment: 24 pages, typos corrected

Published

2012