Bernstein's theorem for compact, connected Lie groups

In what follows, G will denote a compact, connected Lie group.Definition. A complex-valued function f ε L2(G) lies in the space A(G) if it can be written in the formwhereThe A(G) norm of f is the infimum of all sums (2) with respect to all decompositions (1).

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On nth roots and infinitely divisible elements in a connected Lie group

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100058175 ◽

1981 ◽

Vol 89 (2) ◽

pp. 293-299 ◽

Cited By ~ 11

Author(s):

M. McCrudden

Keyword(s):

Topological Group ◽

Finite Number ◽

Lie Groups ◽

Lie Group ◽

Connected Components ◽

Compact Lie Group ◽

Infinitely Divisible ◽

Closed Set ◽

Image Position ◽

Connected Lie Group

For any group G, x ∈ G and n ∈ ℕ (the natural numbers), leti.e. the set of all nth roots of x in G. If G is a Hausdorff topological group, then Rn(x, G) is a closed set in G, but may otherwise be quite complicated. However, as we have observed in (4), if G is a compact Lie group, then Rn(x, G) always has a finite number of connected components, and this result has led us to wonder about the connectedness properties of Rn(x, G) for other Lie groups G. Here is the result.

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Some groups with T1 primitive ideal spaces

Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics ◽

10.1017/s144678870002259x ◽

1985 ◽

Vol 38 (1) ◽

pp. 55-64 ◽

Cited By ~ 2

Author(s):

A. L. Carey ◽

W. Moran

Keyword(s):

Normal Subgroup ◽

Lie Groups ◽

Lie Group ◽

Locally Compact Group ◽

Primitive Ideal ◽

Ideal Space ◽

Solvable Lie Groups ◽

Locally Compact ◽

Simply Connected ◽

Connected Lie Group

AbstractLet G be a second countable locally compact group possessing a normal subgroup N with G/N abelian. We prove that if G/N is discrete then G has T1 primitive ideal space if and only if the G-quasiorbits in Prim N are closed. This condition on G-quasiorbits arose in Pukanzky's work on connected and simply connected solvable Lie groups where it is equivalent to the condition of Auslander and Moore that G be type R on N (-nilradical). Using an abstract version of Pukanzky's arguments due to Green and Pedersen we establish that if G is a connected and simply connected Lie group then Prim G is T1 whenever G-quasiorbits in [G, G] are closed.

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Equidimensional immersions of locally compact groups

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100067748 ◽

1989 ◽

Vol 105 (2) ◽

pp. 253-261 ◽

Cited By ~ 2

Author(s):

K. H. Hofmann ◽

T. S. Wu ◽

J. S. Yang

Keyword(s):

Exponential Function ◽

Lie Group ◽

Compact Groups ◽

Locally Compact ◽

Lie Group Theory ◽

Group A ◽

Image Position ◽

Analytic Subgroup ◽

Algebra Level ◽

Connected Lie Group

Dense immersions occur frequently in Lie group theory. Suppose that exp: g → G denotes the exponential function of a Lie group and a is a Lie subalgebra of g. Then there is a unique Lie group ALie with exponential function exp:a → ALie and an immersion f:ALie→G whose induced morphism L(j) on the Lie algebra level is the inclusion a → g and which has as image an analytic subgroup A of G. The group Ā is a connected Lie group in which A is normal and dense and the corestrictionis a dense immersion. Unless A is closed, in which case f' is an isomorphism of Lie groups, dim a = dim ALie is strictly smaller than dim h = dim H.

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Some Results in the Connective K-Theory of Lie Groups

Canadian Mathematical Bulletin ◽

10.4153/cmb-1988-030-9 ◽

1988 ◽

Vol 31 (2) ◽

pp. 194-199

Author(s):

L. Magalhães

Keyword(s):

Hopf Algebra ◽

Lie Groups ◽

Lie Group ◽

Algebra Structure ◽

Hopf Algebra Structure ◽

K Theory ◽

Torsion Free ◽

Connected Lie Group

AbstractIn this paper we give a description of:(1) the Hopf algebra structure of k*(G; L) when G is a compact, connected Lie group and L is a ring of type Q(P) so that H*(G; L) is torsion free;(2) the algebra structure of k*(G2; L) for L = Z2 or Z.

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A minimal realization for affine control systems on connected Lie groups

International Journal of Geometric Methods in Modern Physics ◽

10.1142/s0219887817501262 ◽

2017 ◽

Vol 14 (09) ◽

pp. 1750126

Author(s):

A. Kara Hansen ◽

S. Selcuk Sutlu

Keyword(s):

Control System ◽

Control Systems ◽

Lie Groups ◽

Lie Group ◽

Canonical Projection ◽

Minimal Realization ◽

Realization Problem ◽

Affine Control Systems ◽

Affine Control System ◽

Connected Lie Group

In this work, we study minimal realization problem for an affine control system [Formula: see text] on a connected Lie group [Formula: see text]. We construct a minimal realization by using a canonical projection and by characterizing indistinguishable points of the system.

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LEFT INVARIANT COMPLEX STRUCTURES ON NILPOTENT SIMPLY CONNECTED INDECOMPOSABLE 6-DIMENSIONAL REAL LIE GROUPS

International Journal of Algebra and Computation ◽

10.1142/s0218196707003512 ◽

2007 ◽

Vol 17 (01) ◽

pp. 115-139 ◽

Cited By ~ 2

Author(s):

L. MAGNIN

Keyword(s):

Automorphism Group ◽

Normal Form ◽

Lie Groups ◽

Lie Algebras ◽

Lie Group ◽

Normal Forms ◽

Equivalence Classes ◽

Complex Structures ◽

Simply Connected ◽

Connected Lie Group

Integrable complex structures on indecomposable 6-dimensional nilpotent real Lie algebras have been computed in a previous paper, along with normal forms for representatives of the various equivalence classes under the action of the automorphism group. Here we go to the connected simply connected Lie group G0 associated to such a Lie algebra 𝔤. For each normal form J of integrable complex structures on 𝔤, we consider the left invariant complex manifold G = (G0, J) associated to G0 and J. We explicitly compute a global holomorphic chart for G and we write down the multiplication in that chart.

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Ergodic elements for actions of Lie groups

Ergodic Theory and Dynamical Systems ◽

10.1017/s0143385700009056 ◽

1996 ◽

Vol 16 (4) ◽

pp. 703-717

Author(s):

K. Robert Gutschera

Keyword(s):

Invariant Measure ◽

Simple Group ◽

Lie Groups ◽

Lie Group ◽

Isometry Group ◽

Group Structure ◽

Structure Theory ◽

Ergodic Action ◽

Finite Invariant Measure ◽

Connected Lie Group

AbstractGiven a connected Lie group G acting ergodically on a space S with finite invariant measure, one can ask when G will contain single elements (or one-parameter subgroups) that still act ergodically. For a compact simple group or the isometry group of the plane, or any group projecting onto such groups, an ergodic action may have no ergodic elements, but for any other connected Lie group ergodic elements will exist. The proof uses the unitary representation theory of Lie groups and Lie group structure theory.

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Self-Maps of Low Rank Lie Groups at Odd Primes

Canadian Journal of Mathematics ◽

10.4153/cjm-2010-017-0 ◽

2010 ◽

Vol 62 (2) ◽

pp. 284-304 ◽

Cited By ~ 3

Author(s):

Jelena Grbić ◽

Stephen Theriault

Keyword(s):

Lie Groups ◽

Structural Properties ◽

Lie Group ◽

Low Rank ◽

Rank Condition ◽

Homotopy Classes ◽

Simply Connected ◽

Connected Lie Group

AbstractLet G be a simple, compact, simply-connected Lie group localized at an odd prime p. We study the group of homotopy classes of self-maps [G, G] when the rank of G is low and in certain cases describe the set of homotopy classes ofmultiplicative self-maps H[G, G]. The low rank condition gives G certain structural properties which make calculations accessible. Several examples and applications are given.

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MAXIMAL TORUS ACTIONS ON SOLVMANIFOLDS AND DOUBLE COSET SPACES

International Journal of Mathematics ◽

10.1142/s0129167x91000065 ◽

1991 ◽

Vol 02 (01) ◽

pp. 67-76

Author(s):

KYUNG BAI LEE ◽

FRANK RAYMOND

Keyword(s):

Lie Groups ◽

Lie Group ◽

Maximal Torus ◽

Double Coset ◽

Torus Action ◽

Torus Actions ◽

Coset Spaces ◽

Aspherical Manifold ◽

Aspherical Manifolds ◽

Connected Lie Group

Any compact, connected Lie group which acts effectively on a closed aspherical manifold is a torus Tk with k ≤ rank of [Formula: see text], the center of π1 (M). When [Formula: see text], the torus action is called a maximal torus action. The authors have previously shown that many closed aspherical manifolds admit maximal torus actions. In this paper, a smooth maximal torus action is constructed on each solvmanifold. They also construct smooth maximal torus actions on some double coset spaces of general Lie groups as applications.

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Strictification of étale stacky Lie groups

Compositio Mathematica ◽

10.1112/s0010437x11007020 ◽

2011 ◽

Vol 148 (3) ◽

pp. 807-834 ◽

Cited By ~ 3

Author(s):

Giorgio Trentinaglia ◽

Chenchang Zhu

Keyword(s):

Fundamental Group ◽

Lie Groups ◽

Lie Algebra ◽

Lie Group ◽

Crossed Module ◽

Simply Connected ◽

The Given ◽

Connected Lie Group

AbstractWe define stacky Lie groups to be group objects in the 2-category of differentiable stacks. We show that every connected and étale stacky Lie group is equivalent to a crossed module of the form (Γ,G) where Γ is the fundamental group of the given stacky Lie group and G is the connected and simply connected Lie group integrating the Lie algebra of the stacky group. Our result is closely related to a strictification result of Baez and Lauda.

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