scholarly journals Irreducible Unitary Representations Concerning Homogeneous Holomorphic Line Bundles Over Elliptic Orbits

2018 ◽  
Vol 10 (4) ◽  
pp. 62
Author(s):  
Nobutaka Boumuki ◽  
Tomonori Noda
Keyword(s):  
Line Bundle ◽  
Cross Sections ◽  
Lie Group ◽  
Vector Subspace ◽  
Line Bundles ◽  
Semisimple Lie Group ◽  
Complex Vector ◽  
Elliptic Orbits ◽  
Irreducible Unitary Representations ◽  
Holomorphic Line Bundles

In this paper we consider a homogeneous holomorphic line bundle over an elliptic adjoint orbit of a real semisimple Lie group, and set a continuous representation of the Lie group on a certain complex vector subspace of the complex vector space of holomorphic cross-sections of the line bundle. Then, we demonstrate that the representation is irreducible unitary.

scholarly journals THE PICARD GROUP OF THE LOOP SPACE OF THE RIEMANN SPHERE

2010 ◽  
Vol 21 (11) ◽  
pp. 1387-1399
Author(s):  
NING ZHANG
Keyword(s):  
Lie Algebra ◽  
Lie Group ◽  
Loop Space ◽  
Riemann Sphere ◽  
Loop Group ◽  
Picard Group ◽  
Line Bundles ◽  
Projective Embedding ◽  
Infinite Dimensional ◽  
Holomorphic Line Bundles

The loop space Lℙ1 of the Riemann sphere consisting of all Ck or Sobolev Wk, p maps S1 → ℙ1 is an infinite dimensional complex manifold. We compute the Picard group pic(Lℙ1) of holomorphic line bundles on Lℙ1 as an infinite dimensional complex Lie group with Lie algebra the Dolbeault group H0, 1(Lℙ1). The group G of Möbius transformations and its loop group LG act on Lℙ1. We prove that an element of pic(Lℙ1) is LG-fixed if it is G-fixed, thus completely answering the question of Millson and Zombro about the G-equivariant projective embedding of Lℙ1.

scholarly journals Homogeneous line bundles over a toroidal group

1989 ◽  
Vol 116 ◽  
pp. 17-24 ◽  
Author(s):  
Yukitaka Abe
Keyword(s):  
Line Bundle ◽  
Lie Group ◽  
Quotient Group ◽  
Holomorphic Functions ◽  
Line Bundles ◽  
Holomorphic Line Bundle ◽  
Complex Torus ◽  
Group 5 ◽  
Group 2

A connected complex Lie group without non-constant holomorphic functions is called a toroidal group ([5]) or an (H, C)-group ([9]). Let X be an n-dimensional toroidal group. Since a toroidal group is commutative ([5], [9] and [10]), X is isomorphic to the quotient group Cn/Γ by a lattice of Cn. A complex torus is a compact toroidal group. Cousin first studied a non-compact toroidal group ([2]).Let L be a holomorphic line bundle over X. L is said to be homogeneous if is isomorphic to L for all x ε X, where Tx is the translation defined by x ε X. It is well-known that if X is a complex torus, then the following assertions are equivalent:

scholarly journals Log Picard Algebroids and Meromorphic Line Bundles

2019 ◽  
Author(s):  
Marco Gualtieri ◽  
Kevin Luk
Keyword(s):  
Line Bundle ◽  
Projective Variety ◽  
Hodge Structure ◽  
Smooth Projective Variety ◽  
Line Bundles ◽  
Mixed Hodge Structure ◽  
Natural Class ◽  
De Rham ◽  
Integrality Condition ◽  
Holomorphic Line Bundles

Abstract We introduce logarithmic Picard algebroids, a natural class of Lie algebroids adapted to a simple normal crossings divisor on a smooth projective variety. We show that such algebroids are classified by a subspace of the de Rham cohomology of the divisor complement determined by its mixed Hodge structure. We then solve the prequantization problem, showing that under the appropriate integrality condition, a log Picard algebroid is the Lie algebroid of symmetries of what is called a meromorphic line bundle, a generalization of the usual notion of line bundle in which the fibers degenerate along the divisor. We give a geometric description of such bundles and establish a classification theorem for them, showing that they correspond to a subgroup of the holomorphic line bundles on the divisor complement. Importantly, these holomorphic line bundles need not be algebraic. Finally, we provide concrete methods for explicitly constructing examples of meromorphic line bundles, such as for a smooth cubic divisor in the projective plane.

The strength for line bundles

2021 ◽  
Vol 127 (3) ◽  
Author(s):  
Edoardo Ballico ◽  
Emanuele Ventura
Keyword(s):  
Line Bundle ◽  
Algebraic Variety ◽  
Commutative Algebra ◽  
Upper Bounds ◽  
Line Bundles ◽  
Homogeneous Polynomials

We introduce the strength for sections of a line bundle on an algebraic variety. This generalizes the strength of homogeneous polynomials that has been recently introduced to resolve Stillman's conjecture, an important problem in commutative algebra. We establish the first properties of this notion and give some tool to obtain upper bounds on the strength in this framework. Moreover, we show some results on the usual strength such as the reducibility of the set of strength two homogeneous polynomials.

On Limit Multiplicities for Spaces of Automorphic Forms

1999 ◽  
Vol 51 (5) ◽  
pp. 952-976 ◽  
Author(s):  
Anton Deitmar ◽  
Werner Hoffmann
Keyword(s):  
Lie Group ◽  
Automorphic Forms ◽  
Plancherel Measure ◽  
Semisimple Lie Group ◽  
Selberg Trace Formula ◽  
Arithmetic Subgroup ◽  
Trivial Group ◽  
Rank One ◽  
Discrete Part ◽  
Cocompact Lattices

AbstractLet Γ be a rank-one arithmetic subgroup of a semisimple Lie group G. For fixed K-Type, the spectral side of the Selberg trace formula defines a distribution on the space of infinitesimal characters of G, whose discrete part encodes the dimensions of the spaces of square-integrable Γ-automorphic forms. It is shown that this distribution converges to the Plancherel measure of G when Γ shrinks to the trivial group in a certain restricted way. The analogous assertion for cocompact lattices Γ follows from results of DeGeorge-Wallach and Delorme.

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