2005, Oxford lecture series in mathematics and its applications, ISBN 0198568207, Volume 30, xvi, 243

A number of methods, from several areas of mathematics, have been used in the hope of finding a formula giving the Frobenius number and algorithms to calculate...

Frobenius algebras | Frobenius groups | Diophantine analysis | Denumerants | Frobenius number | Semigroups | Modular change problem | Gaps | Integer representation | Postage stamp problem

Frobenius algebras | Frobenius groups | Diophantine analysis | Denumerants | Frobenius number | Semigroups | Modular change problem | Gaps | Integer representation | Postage stamp problem

Book

2017, Studien zur Kulturkunde, ISBN 9783496015888, Volume 131. Band, 319

Book

2016, ISBN 9783791355030, 2 v. (270 p., 120 p.)

Book

2009, 1. Aufl., Progress in mathematics, ISBN 9783764399979, Volume 274., 498

This book contributes to important questions in the representation theory of finite groups over fields of positive characteristic — an area of research...

Grothendieck groups | Frobenius algebras | Brauer groups | Frobenius groups | Finite groups | Representations of groups | Modules (Algebra) | Differential equations, Nonlinear | Algebraic Topology | Mathematics | Group Theory and Generalizations

Grothendieck groups | Frobenius algebras | Brauer groups | Frobenius groups | Finite groups | Representations of groups | Modules (Algebra) | Differential equations, Nonlinear | Algebraic Topology | Mathematics | Group Theory and Generalizations

Book

2005, Progress in mathematics, ISBN 9780817641917, Volume 231, viii, 250

Book

Linear Algebra and Its Applications, ISSN 0024-3795, 06/2013, Volume 438, Issue 11, pp. 4166 - 4182

Many important spectral properties of nonnegative matrices have recently been successfully extended to higher order nonnegative tensors; for example, see...

Nonnegative tensor | Perron–Frobenius | 15A69 | 15A18 | Perron-Frobenius | MATHEMATICS | MATHEMATICS, APPLIED | APPROXIMATION | RANK-1 | PERRON-FROBENIUS THEOREM

Nonnegative tensor | Perron–Frobenius | 15A69 | 15A18 | Perron-Frobenius | MATHEMATICS | MATHEMATICS, APPLIED | APPROXIMATION | RANK-1 | PERRON-FROBENIUS THEOREM

Journal Article

Advances in Mathematics, ISSN 0001-8708, 07/2019, Volume 351, pp. 804 - 869

We invert the period map defined by the second structure connection of quantum cohomology of P2. For small quantum cohomology the inverse is given explicitly...

Frobenius manifolds | Quantum cohomology

Frobenius manifolds | Quantum cohomology

Journal Article

Journal of Symbolic Computation, ISSN 0747-7171, 12/2019

Journal Article

IEEE Transactions on Automatic Control, ISSN 0018-9286, 02/2015, Volume 60, Issue 2, pp. 342 - 357

For communities of agents which are not necessarily cooperating, distributed processes of opinion forming are naturally represented by signed graphs, with...

Context | Heuristic algorithms | Communities | Eigenvalues and eigenfunctions | Vectors | Trajectory | Indexes | opinion dynamics | Eventually positive matrices | invariant cones | Perron-Frobenius theorem | signed graphs | social networks | CONSENSUS | STRUCTURAL BALANCE | NEGATIVE ENTRIES | ENGINEERING, ELECTRICAL & ELECTRONIC | CONTINUOUS-TIME SYSTEMS | EVENTUALLY NONNEGATIVE MATRICES | INVARIANT POLYHEDRA | AUTOMATION & CONTROL SYSTEMS | PERRON-FROBENIUS PROPERTY | Teknik och teknologier | Engineering and Technology | Elektroteknik och elektronik | Electrical Engineering, Electronic Engineering, Information Engineering | Eventually positive matrices; invariant cones; opinion dynamics; Perron-Frobenius theorem; signed graphs; social networks

Context | Heuristic algorithms | Communities | Eigenvalues and eigenfunctions | Vectors | Trajectory | Indexes | opinion dynamics | Eventually positive matrices | invariant cones | Perron-Frobenius theorem | signed graphs | social networks | CONSENSUS | STRUCTURAL BALANCE | NEGATIVE ENTRIES | ENGINEERING, ELECTRICAL & ELECTRONIC | CONTINUOUS-TIME SYSTEMS | EVENTUALLY NONNEGATIVE MATRICES | INVARIANT POLYHEDRA | AUTOMATION & CONTROL SYSTEMS | PERRON-FROBENIUS PROPERTY | Teknik och teknologier | Engineering and Technology | Elektroteknik och elektronik | Electrical Engineering, Electronic Engineering, Information Engineering | Eventually positive matrices; invariant cones; opinion dynamics; Perron-Frobenius theorem; signed graphs; social networks

Journal Article

2003, Cambridge tracts in mathematics, ISBN 0521815932, Volume 158, xvii, 307

A ring is called quasi-Frobenius if it is right or left selfinjective, and right or left artinian (all four combinations are equivalent). The study of these...

Quasi-Frobenius rings

Quasi-Frobenius rings

Book

Automatica, ISSN 0005-1098, 06/2016, Volume 68, pp. 140 - 147

It is a well-known fact that externally positive linear systems may fail to have a minimal positive realization. In order to investigate these cases, we...

Eventually positive matrices | Positive linear systems | Perron–Frobenius theorem | Minimal realization | Perron-Frobenius theorem | CONSTRUCTION | NEGATIVE ENTRIES | NONNEGATIVE MATRICES | REAL POLES | REACHABILITY | AUTOMATION & CONTROL SYSTEMS | PERRON-FROBENIUS PROPERTY | ENGINEERING, ELECTRICAL & ELECTRONIC | Electrical engineering | Matching | Linear systems | Markov processes | Sampling | Impulse response | Engineering and Technology | Elektroteknik och elektronik | Electrical Engineering, Electronic Engineering, Information Engineering | Reglerteknik | Teknik och teknologier | Control Engineering | Positive linear systems;Minimal realization;Eventually positive matrices;Perron–Frobenius theorem

Eventually positive matrices | Positive linear systems | Perron–Frobenius theorem | Minimal realization | Perron-Frobenius theorem | CONSTRUCTION | NEGATIVE ENTRIES | NONNEGATIVE MATRICES | REAL POLES | REACHABILITY | AUTOMATION & CONTROL SYSTEMS | PERRON-FROBENIUS PROPERTY | ENGINEERING, ELECTRICAL & ELECTRONIC | Electrical engineering | Matching | Linear systems | Markov processes | Sampling | Impulse response | Engineering and Technology | Elektroteknik och elektronik | Electrical Engineering, Electronic Engineering, Information Engineering | Reglerteknik | Teknik och teknologier | Control Engineering | Positive linear systems;Minimal realization;Eventually positive matrices;Perron–Frobenius theorem

Journal Article

Axioms, ISSN 2075-1680, 12/2012, Volume 1, Issue 3, pp. 395 - 403

The aim of this paper is to construct generating functions, related to nonnegative real parameters, for q-Eulerian type polynomials and numbers (or q-Apostol...

Frobenius-Euler polynomials | Frobenius-Euler Numbers | Q-series | Euler Numbers | Generating function | Q-Frobenius-Euler polynomials | q-Frobenius–Euler polynomials | Frobenius–Euler polynomials | Frobenius–Euler Numbers | q-series

Frobenius-Euler polynomials | Frobenius-Euler Numbers | Q-series | Euler Numbers | Generating function | Q-Frobenius-Euler polynomials | q-Frobenius–Euler polynomials | Frobenius–Euler polynomials | Frobenius–Euler Numbers | q-series

Journal Article

SIAM Journal on Applied Mathematics, ISSN 0036-1399, 2018, Volume 78, Issue 2, pp. 853 - 876

Eigenvector-based centrality measures are among the most popular centrality measures in network science. The underlying idea is intuitive and the mathematical...

Networks | Multilayer | Eigenvector | Multiplex | Centrality | Perron–Frobenius theory | Multi-homogeneous map | MATHEMATICS, APPLIED | multilayer | multiplex | centrality | multi-homogeneous map | networks | Perron-Frobenius theory | eigenvector

Networks | Multilayer | Eigenvector | Multiplex | Centrality | Perron–Frobenius theory | Multi-homogeneous map | MATHEMATICS, APPLIED | multilayer | multiplex | centrality | multi-homogeneous map | networks | Perron-Frobenius theory | eigenvector

Journal Article

Mathematische Annalen, ISSN 0025-5831, 06/2015, Volume 362, Issue 1-2, pp. 25 - 42

Let (R, M, K) be a local ring that contains a field. We show that, when has equal characteristic and when has finite length for all , then is -injective if and...

MATHEMATICS | FROBENIUS | PURITY | IDEALS

MATHEMATICS | FROBENIUS | PURITY | IDEALS

Journal Article

Applied Mathematics and Information Sciences, ISSN 1935-0090, 09/2017, Volume 11, Issue 5, pp. 1335 - 1346

Journal Article

Linear Algebra and Its Applications, ISSN 0024-3795, 09/2014, Volume 456, pp. 122 - 137

Eventually positive matrices are real matrices whose powers become and remain strictly positive. As such, eventually positive matrices are a fortiori matrix...

Matrix root | Stochastic matrix | Perron–Frobenius theorem | Perron–Frobenius property | Eventually positive matrix | Primitive matrix | Matrix function | Perron-Frobenius theorem | Perron-Frobenius property | MATHEMATICS | MATHEMATICS, APPLIED | Parathyroid hormone | Mathematics - Rings and Algebras

Matrix root | Stochastic matrix | Perron–Frobenius theorem | Perron–Frobenius property | Eventually positive matrix | Primitive matrix | Matrix function | Perron-Frobenius theorem | Perron-Frobenius property | MATHEMATICS | MATHEMATICS, APPLIED | Parathyroid hormone | Mathematics - Rings and Algebras

Journal Article

Pattern Recognition, ISSN 0031-3203, 2008, Volume 41, Issue 4, pp. 1350 - 1362

We describe Nonnegative Double Singular Value Decomposition ( NNDSVD), a new method designed to enhance the initialization stage of nonnegative matrix...

SVD | Sparse NMF | Perron–Frobenius | Nonnegative matrix factorization | NMF | Structured initialization | Sparse factorization | Low rank | Singular value decomposition | Perron-Frobenius | low rank | sparse NMF | sparse factorization | ALGORITHMS | nonnegative matrix factorization | COMPUTER SCIENCE, ARTIFICIAL INTELLIGENCE | ENGINEERING, ELECTRICAL & ELECTRONIC | DECOMPOSITIONS | structured initialization | singular value decomposition | Algorithms

SVD | Sparse NMF | Perron–Frobenius | Nonnegative matrix factorization | NMF | Structured initialization | Sparse factorization | Low rank | Singular value decomposition | Perron-Frobenius | low rank | sparse NMF | sparse factorization | ALGORITHMS | nonnegative matrix factorization | COMPUTER SCIENCE, ARTIFICIAL INTELLIGENCE | ENGINEERING, ELECTRICAL & ELECTRONIC | DECOMPOSITIONS | structured initialization | singular value decomposition | Algorithms

Journal Article

Journal of Mathematical Analysis and Applications, ISSN 0022-247X, 01/2016, Volume 433, Issue 2, pp. 1561 - 1593

We develop a systematic theory of eventually positive semigroups of linear operators mainly on spaces of continuous functions. By eventually positive we mean...

One-parameter semigroups of linear operators | Semigroups on Banach lattices | Eventually positive semigroup | Perron–Frobenius theory | Perron-Frobenius theory | Perron Frobenius theory | MATHEMATICS | MATHEMATICS, APPLIED | TO-NEUMANN OPERATOR | MATRICES | NEGATIVE ENTRIES

One-parameter semigroups of linear operators | Semigroups on Banach lattices | Eventually positive semigroup | Perron–Frobenius theory | Perron-Frobenius theory | Perron Frobenius theory | MATHEMATICS | MATHEMATICS, APPLIED | TO-NEUMANN OPERATOR | MATRICES | NEGATIVE ENTRIES

Journal Article

2007, 1st American ed., ISBN 9781558764255, xiii, 233 p., 24 p. of plates

Book

Journal of Mathematical Analysis and Applications, ISSN 0022-247X, 12/2015, Volume 432, Issue 2, pp. 983 - 993

Let h(t) be a nonnegative measurable function supported in [−12,12] and Md(t)=(χ[−12,12]⋆χ[−12,12]⋆⋯⋆χ[−12,12])(t)(d+1 times) be the central B-spline of degree...

Generalized Euler–Frobenius Laurent polynomial | Spline interpolation | Average sampling | Generalized Euler-Frobenius Laurent polynomial | MATHEMATICS | MATHEMATICS, APPLIED | SPACES | Generalized Euler-Frobenius | Laurent polynomial | SHIFT-INVARIANT

Generalized Euler–Frobenius Laurent polynomial | Spline interpolation | Average sampling | Generalized Euler-Frobenius Laurent polynomial | MATHEMATICS | MATHEMATICS, APPLIED | SPACES | Generalized Euler-Frobenius | Laurent polynomial | SHIFT-INVARIANT

Journal Article

No results were found for your search.

Cannot display more than 1000 results, please narrow the terms of your search.