Subgroups of a finitary linear group

Let V be a left vector space over the arbitrary division ring D and G a locally nilpotent group of finitary automorphisms of V (automorphisms g of V such that dimDV(g-1)<∞) such that V is irreducible as D-G bimodule. If V is infinite dimensional we show that such groups are very rare, much rarer than in the finite-dimensional case. For example we show that if dimDV is infinite then dimDV = |G| = ℵ0 and G is a locally finite q-group for some prime q ≠ char D. Moreover G is isomorphic to a finitary linear group over a field. Examples show that infinite-dimensional such groups G do exist. Note also that there exist examples of finite-dimensional such groups G that are not isomorphic to any finitary linear group over a field. Generally the finite-dimensional examples are more varied.

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Ascending Subgroups of Irreducible Finitary Linear Group

Journal of the London Mathematical Society ◽

10.1112/jlms/51.1.75 ◽

1995 ◽

Vol 51 (1) ◽

pp. 75-92 ◽

Cited By ~ 4

Author(s):

U. Meierfrankenfeld

Keyword(s):

Linear Group ◽

Finitary Linear Group ◽

Finitary Linear

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Automorphic Representations and L-Functions for the General Linear Group

10.1017/cbo9780511973628 ◽

2009 ◽

Cited By ~ 6

Author(s):

Dorian Goldfeld ◽

Joseph Hundley

Keyword(s):

Linear Group ◽

General Linear Group ◽

General Linear ◽

Automorphic Representations

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On generic complexity of the subset sum problem in monoids and groups of integer matrix of order two

Herald of Omsk University ◽

10.24147/1812-3996.2020.25(4).10-15 ◽

2020 ◽

Vol 25 (4) ◽

pp. 10-15

Author(s):

Alexander Nikolaevich Rybalov

Keyword(s):

Linear Group ◽

Modular Group ◽

Special Linear Group ◽

Second Order ◽

Integer Matrix ◽

Subset Sum ◽

Algorithmic Problems ◽

Almost All ◽

Subset Sum Problems ◽

Generic Complexity

Generic-case approach to algorithmic problems was suggested by A. Miasnikov, I. Kapovich, P. Schupp and V. Shpilrain in 2003. This approach studies behavior of an algo-rithm on typical (almost all) inputs and ignores the rest of inputs. In this paper, we prove that the subset sum problems for the monoid of integer positive unimodular matrices of the second order, the special linear group of the second order, and the modular group are generically solvable in polynomial time.

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Order Conditions for Sampling the Invariant Measure of Ergodic Stochastic Differential Equations on Manifolds

Foundations of Computational Mathematics ◽

10.1007/s10208-021-09495-y ◽

2021 ◽

Author(s):

Adrien Laurent ◽

Gilles Vilmart

Keyword(s):

Invariant Measure ◽

Differential Equations ◽

Stochastic Differential Equations ◽

Linear Group ◽

Langevin Equation ◽

Numerical Experiments ◽

Special Linear Group ◽

Order Conditions ◽

High Order ◽

Differential Equations On Manifolds

AbstractWe derive a new methodology for the construction of high-order integrators for sampling the invariant measure of ergodic stochastic differential equations with dynamics constrained on a manifold. We obtain the order conditions for sampling the invariant measure for a class of Runge–Kutta methods applied to the constrained overdamped Langevin equation. The analysis is valid for arbitrarily high order and relies on an extension of the exotic aromatic Butcher-series formalism. To illustrate the methodology, a method of order two is introduced, and numerical experiments on the sphere, the torus and the special linear group confirm the theoretical findings.

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Representations induced from the Zelevinsky segment and discrete series in the half-integral case

Forum Mathematicum ◽

10.1515/forum-2020-0054 ◽

2020 ◽

Vol 0 (0) ◽

Author(s):

Ivan Matić

Keyword(s):

Linear Group ◽

Local Field ◽

General Linear Group ◽

Discrete Series ◽

Series Representation ◽

General Linear ◽

Composition Series ◽

Induced Representations ◽

Discrete Series Representation

AbstractLet {G_{n}} denote either the group {\mathrm{SO}(2n+1,F)} or {\mathrm{Sp}(2n,F)} over a non-archimedean local field of characteristic different than two. We study parabolically induced representations of the form {\langle\Delta\rangle\rtimes\sigma}, where {\langle\Delta\rangle} denotes the Zelevinsky segment representation of the general linear group attached to the segment Δ, and σ denotes a discrete series representation of {G_{n}}. We determine the composition series of {\langle\Delta\rangle\rtimes\sigma} in the case when {\Delta=[\nu^{a}\rho,\nu^{b}\rho]} where a is half-integral.

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TOPOLOGICAL QUANTIZATION OF THE MAGNETIC FLUX

Modern Physics Letters A ◽

10.1142/s021773230000181x ◽

2000 ◽

Vol 15 (24) ◽

pp. 1491-1495 ◽

Cited By ~ 1

Author(s):

DANIEL WISNIVESKY

Keyword(s):

Quantum Theory ◽

Charged Particle ◽

Magnetic Flux ◽

Linear Group ◽

Connected Region ◽

Magnetic Tube ◽

Dirac Monopole ◽

Multiply Connected ◽

Quantum Problem ◽

Multiply Connected Region

We discuss the quantum problem of a charged particle in a multiply connected region encircling a magnetic tube, using a theory in which space and internal coordinates are derived from the parameters of a linear group of transformations (group space quantum theory). Based only on symmetry considerations, we show that, the magnetic flux in the tube must be quantized in multiples of the Dirac monopole charge.

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