Congruence classes of matrices in GL2(Fq)

Priscilla S. Bremser

doi:10.1016/0012-365x(93)90066-3

CARTAN SUBALGEBRAS IN DIMENSION DROP ALGEBRAS

Journal of the Institute of Mathematics of Jussieu ◽

10.1017/s147474801900032x ◽

2019 ◽

pp. 1-31

Author(s):

Selçuk Barlak ◽

Sven Raum

Keyword(s):

Conjugacy Classes ◽

Natural Numbers ◽

Cartan Subalgebras ◽

Classes Of Matrices ◽

Congruence Classes

We completely classify Cartan subalgebras of dimension drop algebras with coprime parameters. More generally, we classify Cartan subalgebras of arbitrary stabilised dimension drop algebras that are non-degenerate in the sense that the dimensions of their fibres in the endpoints are maximal. Conjugacy classes by an automorphism are parametrised by certain congruence classes of matrices over the natural numbers with prescribed row and column sums. In particular, each dimension drop algebra admits only finitely many non-degenerate Cartan subalgebras up to conjugacy. As a consequence of this parametrisation, we can provide examples of subhomogeneous $\text{C}^{\ast }$ -algebras with exactly $n$ Cartan subalgebras up to conjugacy. Moreover, we show that in many dimension drop algebras two Cartan subalgebras are conjugate if and only if their spectra are homeomorphic.

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Global Properties of Eigenvalues of Parametric Rank One Perturbations for Unstructured and Structured Matrices

Complex Analysis and Operator Theory ◽

10.1007/s11785-021-01094-7 ◽

2021 ◽

Vol 15 (3) ◽

Author(s):

André C. M. Ran ◽

Michał Wojtylak

Keyword(s):

Unit Circle ◽

Structured Matrices ◽

Additional Structure ◽

General Properties ◽

Global Properties ◽

Classes Of Matrices ◽

Rank One

AbstractGeneral properties of eigenvalues of $$A+\tau uv^*$$ A + τ u v ∗ as functions of $$\tau \in {\mathbb {C} }$$ τ ∈ C or $$\tau \in {\mathbb {R} }$$ τ ∈ R or $$\tau ={{\,\mathrm{{e}}\,}}^{{{\,\mathrm{{i}}\,}}\theta }$$ τ = e i θ on the unit circle are considered. In particular, the problem of existence of global analytic formulas for eigenvalues is addressed. Furthermore, the limits of eigenvalues with $$\tau \rightarrow \infty $$ τ → ∞ are discussed in detail. The following classes of matrices are considered: complex (without additional structure), real (without additional structure), complex H-selfadjoint and real J-Hamiltonian.

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SUMS OF PRODUCTS OF CONGRUENCE CLASSES AND OF ARITHMETIC PROGRESSIONS

International Journal of Number Theory ◽

10.1142/s1793042109002286 ◽

2009 ◽

Vol 05 (04) ◽

pp. 625-634

Author(s):

SERGEI V. KONYAGIN ◽

MELVYN B. NATHANSON

Keyword(s):

Arithmetic Progression ◽

Congruence Class ◽

Arithmetic Progressions ◽

Sum Of Products ◽

Sums Of Products ◽

Positive Integers ◽

Congruence Classes

Consider the congruence class Rm(a) = {a + im : i ∈ Z} and the infinite arithmetic progression Pm(a) = {a + im : i ∈ N0}. For positive integers a,b,c,d,m the sum of products set Rm(a)Rm(b) + Rm(c)Rm(d) consists of all integers of the form (a+im) · (b+jm)+(c+km)(d+ℓm) for some i,j,k,ℓ ∈ Z. It is proved that if gcd (a,b,c,d,m) = 1, then Rm(a)Rm(b) + Rm(c)Rm(d) is equal to the congruence class Rm(ab+cd), and that the sum of products set Pm(a)Pm(b)+Pm(c)Pm eventually coincides with the infinite arithmetic progression Pm(ab+cd).

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Lehmer points and visible points on affine varieties over finite fields

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004113000613 ◽

2013 ◽

Vol 156 (2) ◽

pp. 193-207 ◽

Cited By ~ 1

Author(s):

KIT-HO MAK ◽

ALEXANDRU ZAHARESCU

Keyword(s):

Finite Fields ◽

Affine Variety ◽

Asymptotic Results ◽

Visible Points ◽

Congruence Classes

AbstractLet V be an absolutely irreducible affine variety over $\mathbb{F}_p$. A Lehmer point on V is a point whose coordinates satisfy some prescribed congruence conditions, and a visible point is one whose coordinates are relatively prime. Asymptotic results for the number of Lehmer points and visible points on V are obtained, and the distribution of visible points into different congruence classes is investigated.

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Congruence Class Sizes in Finite Sectionally Complemented Lattices

Canadian Mathematical Bulletin ◽

10.4153/cmb-2004-019-3 ◽

2004 ◽

Vol 47 (2) ◽

pp. 191-205 ◽

Cited By ~ 2

Author(s):

G. Grätzer ◽

E. T. Schmidt

Keyword(s):

Congruence Class ◽

Typical Result ◽

Complemented Lattices ◽

The Family ◽

Complemented Lattice ◽

Congruence Classes

AbstractThe congruences of a finite sectionally complemented lattice L are not necessarily uniform (any two congruence classes of a congruence are of the same size). To measure how far a congruence Θ of L is from being uniform, we introduce Spec Θ, the spectrum of Θ, the family of cardinalities of the congruence classes of Θ. A typical result of this paper characterizes the spectrum S = (mj | j < n) of a nontrivial congruence Θ with the following two properties:

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Dimensions, Indices and Congruence Classes of Representations of Affine Kac-Moody Algebras (with examples for affine E8)

Super Field Theories ◽

10.1007/978-1-4613-0913-0_10 ◽

1987 ◽

pp. 265-273

Author(s):

S. N. Kass ◽

J. Patera

Keyword(s):

Congruence Classes

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Congruence Classes

A Concrete Introduction to Higher Algebra - Undergraduate Texts in Mathematics ◽

10.1007/978-1-4684-0065-6_7 ◽

1979 ◽

pp. 56-61

Author(s):

Lindsay Childs

Keyword(s):

Congruence Classes

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ACDC: Analysis of Congruent Diversification Classes

10.1101/2022.01.12.476142 ◽

2022 ◽

Author(s):

Sebastian Hoehna ◽

Bjoern Tore Kopperud ◽

Andrew F Magee

Keyword(s):

Congruence Class ◽

R Package ◽

Rate Function ◽

Diversification Rate ◽

Extinction Rate ◽

Diversification Rates ◽

Common Features ◽

Alternative Hypotheses ◽

Rate Functions ◽

Congruence Classes

Diversification rates inferred from phylogenies are not identifiable. There are infinitely many combinations of speciation and extinction rate functions that have the exact same likelihood score for a given phylogeny, building a congruence class. The specific shape and characteristics of such congruence classes have not yet been studied. Whether speciation and extinction rate functions within a congruence class share common features is also not known. Instead of striving to make the diversification rates identifiable, we can embrace their inherent non-identifiable nature. We use two different approaches to explore a congruence class: (i) testing of specific alternative hypotheses, and (ii) randomly sampling alternative rate function within the congruence class. Our methods are implemented in the open-source R package ACDC (https://github.com/afmagee/ACDC). ACDC provides a flexible approach to explore the congruence class and provides summaries of rate functions within a congruence class. The summaries can highlight common trends, i.e. increasing, flat or decreasing rates. Although there are infinitely many equally likely diversification rate functions, these can share common features. ACDC can be used to assess if diversification rate patterns are robust despite non-identifiability. In our example, we clearly identify three phases of diversification rate changes that are common among all models in the congruence class. Thus, congruence classes are not necessarily a problem for studying historical patterns of biodiversity from phylogenies.

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