On algebraic properties of the spectrum and spectral radius of elements in a unital algebra

AbstractWe prove a comprehensive version of the Ruelle–Perron–Frobenius Theorem with explicit estimates of the spectral radius of the Ruelle transfer operator and various other quantities related to spectral properties of this operator. The novelty here is that the Hölder constant of the function generating the operator appears only polynomially, not exponentially as in previously known estimates.

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Maximal distance spectral radius of 4-chromatic planar graphs

Linear Algebra and its Applications ◽

10.1016/j.laa.2021.02.005 ◽

2021 ◽

Vol 618 ◽

pp. 183-202

Author(s):

Aysel Erey

Keyword(s):

Spectral Radius ◽

Planar Graphs ◽

Maximal Distance

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The signless Laplacian spectral radius of graphs with no intersecting triangles

Linear Algebra and its Applications ◽

10.1016/j.laa.2021.01.018 ◽

2021 ◽

Vol 618 ◽

pp. 12-21

Author(s):

Yanhua Zhao ◽

Xueyi Huang ◽

Hangtian Guo

Keyword(s):

Spectral Radius ◽

Laplacian Spectral Radius ◽

Signless Laplacian Spectral Radius ◽

Signless Laplacian

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Convergence of the spectral radius of a random matrix through its characteristic polynomial

Probability Theory and Related Fields ◽

10.1007/s00440-021-01079-9 ◽

2021 ◽

Author(s):

Charles Bordenave ◽

Djalil Chafaï ◽

David García-Zelada

Keyword(s):

Spectral Radius ◽

Characteristic Polynomial ◽

Random Matrix

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L-fuzzy ideals and L-fuzzy subalgebras of Novikov algebras

Open Mathematics ◽

10.1515/math-2019-0126 ◽

2019 ◽

Vol 17 (1) ◽

pp. 1538-1546

Author(s):

Xin Zhou ◽

Liangyun Chen ◽

Yuan Chang

Keyword(s):

Fuzzy Sets ◽

Homomorphic Image ◽

Quotient Algebra ◽

Algebraic Properties ◽

Novikov Algebras ◽

Fuzzy Ideal

Abstract In this paper, we apply the concept of fuzzy sets to Novikov algebras, and introduce the concepts of L-fuzzy ideals and L-fuzzy subalgebras. We get a sufficient and neccessary condition such that an L-fuzzy subspace is an L-fuzzy ideal. Moreover, we show that the quotient algebra A/μ of the L-fuzzy ideal μ is isomorphic to the algebra A/Aμ of the non-fuzzy ideal Aμ. Finally, we discuss the algebraic properties of surjective homomorphic image and preimage of an L-fuzzy ideal.

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The normalized distance Laplacian

Special Matrices ◽

10.1515/spma-2020-0114 ◽

2021 ◽

Vol 9 (1) ◽

pp. 1-18

Author(s):

Carolyn Reinhart

Keyword(s):

Spectral Radius ◽

Characteristic Polynomial ◽

Adjacency Matrix ◽

Connected Graph ◽

Distance Matrix ◽

Laplacian Matrix ◽

Diagonal Matrix ◽

The Matrix

Abstract The distance matrix 𝒟(G) of a connected graph G is the matrix containing the pairwise distances between vertices. The transmission of a vertex vi in G is the sum of the distances from vi to all other vertices and T(G) is the diagonal matrix of transmissions of the vertices of the graph. The normalized distance Laplacian, 𝒟𝒧(G) = I−T(G)−1/2 𝒟(G)T(G)−1/2, is introduced. This is analogous to the normalized Laplacian matrix, 𝒧(G) = I − D(G)−1/2 A(G)D(G)−1/2, where D(G) is the diagonal matrix of degrees of the vertices of the graph and A(G) is the adjacency matrix. Bounds on the spectral radius of 𝒟 𝒧 and connections with the normalized Laplacian matrix are presented. Twin vertices are used to determine eigenvalues of the normalized distance Laplacian. The distance generalized characteristic polynomial is defined and its properties established. Finally, 𝒟𝒧-cospectrality and lack thereof are determined for all graphs on 10 and fewer vertices, providing evidence that the normalized distance Laplacian has fewer cospectral pairs than other matrices.

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Protein–Protein Interaction Prediction Based on Spectral Radius and General Regression Neural Network

Journal of Proteome Research ◽

10.1021/acs.jproteome.0c00871 ◽

2021 ◽

Vol 20 (3) ◽

pp. 1657-1665

Author(s):

Hanxiao Xu ◽

Da Xu ◽

Naiqian Zhang ◽

Yusen Zhang ◽

Rui Gao

Keyword(s):

Neural Network ◽

Spectral Radius ◽

Protein Interaction ◽

General Regression Neural Network ◽

Interaction Prediction ◽

Protein Protein Interaction ◽

Protein Interaction Prediction ◽

General Regression

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Convergence analysis of gradient-based iterative algorithms for a class of rectangular Sylvester matrix equations based on Banach contraction principle

Advances in Difference Equations ◽

10.1186/s13662-020-03185-9 ◽

2021 ◽

Vol 2021 (1) ◽

Author(s):

Adisorn Kittisopaporn ◽

Pattrawut Chansangiam ◽

Wicharn Lewkeeratiyutkul

Keyword(s):

Spectral Radius ◽

Matrix Equation ◽

Iterative Algorithms ◽

Banach Contraction Principle ◽

Contraction Principle ◽

Convergence Factor ◽

Sylvester Matrix ◽

Iteration Matrix ◽

Banach Contraction ◽

The Matrix

AbstractWe derive an iterative procedure for solving a generalized Sylvester matrix equation $AXB+CXD = E$ A X B + C X D = E , where $A,B,C,D,E$ A , B , C , D , E are conforming rectangular matrices. Our algorithm is based on gradients and hierarchical identification principle. We convert the matrix iteration process to a first-order linear difference vector equation with matrix coefficient. The Banach contraction principle reveals that the sequence of approximated solutions converges to the exact solution for any initial matrix if and only if the convergence factor belongs to an open interval. The contraction principle also gives the convergence rate and the error analysis, governed by the spectral radius of the associated iteration matrix. We obtain the fastest convergence factor so that the spectral radius of the iteration matrix is minimized. In particular, we obtain iterative algorithms for the matrix equation $AXB=C$ A X B = C , the Sylvester equation, and the Kalman–Yakubovich equation. We give numerical experiments of the proposed algorithm to illustrate its applicability, effectiveness, and efficiency.

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Cyclic-Homology Chern–Weil Theory for Families of Principal Coactions

Communications in Mathematical Physics ◽

10.1007/s00220-020-03804-2 ◽

2020 ◽

Author(s):

Piotr M. Hajac ◽

Tomasz Maszczyk

Keyword(s):

Cyclic Homology ◽

Quantum Deformation ◽

Homotopy Formula ◽

Standard Quantum ◽

Unital Algebra ◽

Hopf Fibrations ◽

Chain Homotopy ◽

Cartan Model ◽

Extension Algebra ◽

Hochschild Complex

AbstractViewing the space of cotraces in the structural coalgebra of a principal coaction as a noncommutative counterpart of the classical Cartan model, we construct the cyclic-homology Chern–Weil homomorphism. To realize the thus constructed Chern–Weil homomorphism as a Cartan model of the homomorphism tautologically induced by the classifying map on cohomology, we replace the unital subalgebra of coaction-invariants by its natural H-unital nilpotent extension (row extension). Although the row-extension algebra provides a drastically different model of the cyclic object, we prove that, for any row extension of any unital algebra over a commutative ring, the row-extension Hochschild complex and the usual Hochschild complex are chain homotopy equivalent. It is the discovery of an explicit homotopy formula that allows us to improve the homological quasi-isomorphism arguments of Loday and Wodzicki. We work with families of principal coactions, and instantiate our noncommutative Chern–Weil theory by computing the cotrace space and analyzing a dimension-drop-like effect in the spirit of Feng and Tsygan for the quantum-deformation family of the standard quantum Hopf fibrations.

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