Showing total 104 results

1. The General Solution to a Classical Matrix Equation AXB = C over the Dual Split Quaternion Algebra.

Author

Si, Kai-Wen and Wang, Qing-Wen

Subjects

*QUATERNIONS, *ALGEBRA, *EQUATIONS, *MATRICES (Mathematics)

Abstract

In this paper, we investigate the necessary and sufficient conditions for solving a dual split quaternion matrix equation A X B   =   C , and present the general solution expression when the solvability conditions are met. As an application, we delve into the necessary and sufficient conditions for the existence of a Hermitian solution to this equation by using a newly defined real representation method. Furthermore, we obtain the solutions for the dual split quaternion matrix equations A X   =   C and X B   =   C . Finally, we provide a numerical example to demonstrate the findings of this paper. [ABSTRACT FROM AUTHOR]

Published

2024

2. A System of Four Generalized Sylvester Matrix Equations over the Quaternion Algebra.

Author

He, Zhuo-Heng, Tian, Jie, and Yu, Shao-Wen

Subjects

*SYLVESTER matrix equations, *MATRIX decomposition, *QUATERNIONS, *ALGEBRA, *EQUATIONS

Abstract

In this paper, we make use of the simultaneous decomposition of eight quaternion matrices to study the solvability conditions and general solutions to a system of two-sided coupled Sylvester-type quaternion matrix equations A i X i C i + B i X i + 1 D i = Ω i , i = 1 , 2 , 3 , 4. We design an algorithm to compute the general solution to the system and give a numerical example. Additionally, we consider the application of the system in the encryption and decryption of color images. [ABSTRACT FROM AUTHOR]

Published

2024

3. Cohomology and Crossed Modules of Modified Rota–Baxter Pre-Lie Algebras.

Author

Zhu, Fuyang and Teng, Wen

Subjects

*ALGEBRA

Abstract

The goal of the present paper is to provide a cohomology theory and crossed modules of modified Rota–Baxter pre-Lie algebras. We introduce the notion of a modified Rota–Baxter pre-Lie algebra and its bimodule. We define a cohomology of modified Rota–Baxter pre-Lie algebras with coefficients in a suitable bimodule. Furthermore, we study the infinitesimal deformations and abelian extensions of modified Rota–Baxter pre-Lie algebras and relate them with the second cohomology groups. Finally, we investigate skeletal and strict modified Rota–Baxter pre-Lie 2-algebras. We show that skeletal modified Rota–Baxter pre-Lie 2-algebras can be classified into the third cohomology group, and strict modified Rota–Baxter pre-Lie 2-algebras are equivalent to the crossed modules of modified Rota–Baxter pre-Lie algebras. [ABSTRACT FROM AUTHOR]

Published

2024

4. Quantization of the Rank Two Heisenberg–Virasoro Algebra.

Author

Chen, Xue

Subjects

*QUANTUM groups, *HOPF algebras, *LIE algebras, *MATHEMATICAL physics, *ALGEBRA

Abstract

Quantum groups occupy a significant position in both mathematics and physics, contributing to progress in these fields. It is interesting to obtain new quantum groups by the quantization of Lie bialgebras. In this paper, the quantization of the rank two Heisenberg–Virasoro algebra by Drinfel'd twists is presented, Lie bialgebra structures of which have been investigated by the authors recently. [ABSTRACT FROM AUTHOR]

Published

2024

5. Fredholm Theory Relative to Any Algebra Homomorphisms.

Author

Kong, Yingying, Wang, Yabo, and Yang, Jingen

Subjects

*ALGEBRA, *HOMOMORPHISMS, *DEFINITIONS

Abstract

In this paper, we give another definition of Ruston elements and almost Ruston elements, which is equivalent to the definitions given by Mouton and Raubenheimer in the case that the homomorphism has a closed range and Riesz property. For two homomorphisms, we consider the preserver problems of Fredholm theory and Fredholm spectrum theory. In addition, we study the spectral mapping theorems of Fredholm (Weyl, Browder, Ruston, and almost Ruston) elements relative to a homomorphism. Last but not least, the dependence of Fredholm theory on three homomorphisms is considered, and meanwhile, the transitivity of Fredholm theory relative to three homomorphisms is illustrated. Furthermore, we consider the Fredholm theory relative to more homomorphisms. [ABSTRACT FROM AUTHOR]

Published

2024

6. Weighted Convolution for Quaternion Linear Canonical Cosine Transform and Its Application.

Author

Wang, Rongbo and Feng, Qiang

Subjects

*COSINE transforms, *QUATERNIONS, *COMPUTATIONAL complexity, *SIGNAL processing, *ALGEBRA, *QUATERNION functions

Abstract

Convolution plays a pivotal role in the domains of signal processing and optics. This paper primarily focuses on studying the weighted convolution for quaternion linear canonical cosine transform (QLCcT) and its application in multiplicative filter analysis. Firstly, we propose QLCcT by combining quaternion algebra with linear canonical cosine transform (LCcT), which extends LCcT to Hamiltonian quaternion algebra. Secondly, we introduce weighted convolution and correlation operations for QLCcT, accompanied by their corresponding theorems. We also explore the properties of QLCcT. Thirdly, we utilize these proposed convolution structures to analyze multiplicative filter models that offer lower computational complexity compared to existing methods based on quaternion linear canonical transform (QLCT). Additionally, we discuss the rationale behind studying such transforms using quaternion functions as an illustrative example. [ABSTRACT FROM AUTHOR]

Published

2024

7. Characterization of Isoclinic, Transversally Geodesic and Grassmannizable Webs.

Author

Saab, Jihad and Absi, Rafik

Subjects

*DIFFERENTIAL forms, *TANGENT bundles, *GEODESICS, *ALGEBRA, *TORSION, *CURVATURE, *VECTOR bundles

Abstract

One of the most relevant topics in web theory is linearization. A particular class of linearizable webs is the Grassmannizable web. Akivis gave a characterization of such a web, showing that Grassmannizable webs are equivalent to isoclinic and transversally geodesic webs. The obstructions given by Akivis that characterize isoclinic and transversally geodesic webs are computed locally, and it is difficult to give them an interpretation in relation to torsion or curvature of the unique Chern connection associated with a web. In this paper, using Nagy's web formalism, Frölisher—Nejenhuis theory for derivation associated with vector differential forms, and Grifone's connection theory for tensorial algebra on the tangent bundle, we find invariants associated with almost-Grassmann structures expressed in terms of torsion, curvature, and Nagy's tensors, and we provide an interpretation in terms of these invariants for the isoclinic, transversally geodesic, Grassmannizable, and parallelizable webs. [ABSTRACT FROM AUTHOR]

Published

2024

8. Abelian Extensions of Modified λ -Differential Left-Symmetric Algebras and Crossed Modules.

Author

Zhu, Fuyang, You, Taijie, and Teng, Wen

Subjects

*MODULES (Algebra), *COHOMOLOGY theory, *ALGEBRA

Abstract

In this paper, we define a cohomology theory of a modified λ -differential left-symmetric algebra. Moreover, we introduce the notion of modified λ -differential left-symmetric 2-algebras, which is the categorization of a modified λ -differential left-symmetric algebra. As applications of cohomology, we classify linear deformations and abelian extensions of modified λ -differential left-symmetric algebras using the second cohomology group and classify skeletal modified λ -differential left-symmetric 2-algebra using the third cohomology group. Finally, we show that strict modified λ -differential left-symmetric 2-algebras are equivalent to crossed modules of modified λ -differential left-symmetric algebras. [ABSTRACT FROM AUTHOR]

Published

2024

9. Some Remarks Regarding Special Elements in Algebras Obtained by the Cayley–Dickson Process over Z p.

Author

Flaut, Cristina and Baias, Andreea

Subjects

*ALGEBRA, *QUATERNIONS, *PLAINS

Abstract

In this paper, we provide some properties of k-potent elements in algebras obtained by the Cayley–Dickson process over Z p . Moreover, we find a structure of nonunitary ring over Fibonacci quaternions over Z 3 and we present a method to encrypt plain texts, by using invertible elements in some of these algebras. [ABSTRACT FROM AUTHOR]

Published

2024

10. On Normed Algebras and the Generalized Maligranda–Orlicz Lemma.

Author

Cichoń, Mieczysław and Cichoń, Kinga

Subjects

*ALGEBRA, *OPERATOR equations, *BANACH algebras, *FUNCTION spaces, *QUADRATIC equations, *COMPACT operators

Abstract

In this paper, we discuss some extensions of the Maligranda–Orlicz lemma. It deals with the problem of constructing a norm in a subspace of the space of bounded functions, for which it becomes a normed algebra so that the norm introduced is equivalent to the initial norm of the subspace. This is done by satisfying some inequality between these norms. We show in this paper how this inequality is relevant to the study of operator equations in Banach algebras. In fact, we study how to equip a subspace of the space of bounded functions with a norm equivalent to a given one so that it is a normed algebra. We give a general condition for the construction of such norms, which allows us to easily check whether a space with a given norm is an algebra with a pointwise product and the consequences of such a choice for measures of noncompactness in such spaces. We also study quasi-normed spaces. We introduce a general property of measures of noncompactness that allows the study of quadratic operator equations, prove a fixed-point theorem suitable for such problems, and complete the whole with examples and applications. [ABSTRACT FROM AUTHOR]

Published

2024

11. From Quantum Automorphism of (Directed) Graphs to the Associated Multiplier Hopf Algebras.

Author

Razavinia, Farrokh and Haghighatdoost, Ghorbanali

Subjects

*HOPF algebras, *PERMUTATION groups, *GRAPH theory, *COMPACT groups, *QUANTUM groups, *ALGEBRA, *PERMUTATIONS

Abstract

This is a noticeably short biography and introductory paper on multiplier Hopf algebras. It delves into questions regarding the significance of this abstract construction and the motivation behind its creation. It also concerns quantum linear groups, especially the coordinate ring of Mq(n) and the observation that K [Mq(n)] is a quadratic algebra, and can be equipped with a multiplier Hopf ∗-algebra structure in the sense of quantum permutation groups developed byWang and an observation by Rollier–Vaes. In our next paper, we will propose the study of multiplier Hopf graph algebras. The current paper can be viewed as a precursor to this upcoming work, serving as a crucial intermediary bridging the gap between the abstract concept of multiplier Hopf algebras and the well-developed field of graph theory, thereby establishing connections between them! This survey review paper is dedicated to the 78th birthday anniversary of Professor Alfons Van Daele. [ABSTRACT FROM AUTHOR]

Published

2024

12. Optimal System, Symmetry Reductions and Exact Solutions of the (2 + 1)-Dimensional Seventh-Order Caudrey–Dodd–Gibbon–KP Equation.

Author

Qin, Mengyao, Wang, Yunhu, and Yuen, Manwai

Subjects

*LIE algebras, *TRIGONOMETRIC functions, *EQUATIONS, *SYMMETRY, *ALGEBRA, *LIE groups

Abstract

In this paper, the  (2 + 1) -dimensional seventh-order Caudrey–Dodd–Gibbon–KP equation is investigated through the Lie group method. The Lie algebra of infinitesimal symmetries, commutative and adjoint tables, and one-dimensional optimal systems is presented. Then, the seventh-order Caudrey–Dodd–Gibbon–KP equation is reduced to nine types of  (1 + 1) -dimensional equations with the help of symmetry subalgebras. Finally, the unified algebra method is used to obtain the soliton solutions, trigonometric function solutions, and Jacobi elliptic function solutions of the seventh-order Caudrey–Dodd–Gibbon–KP equation. [ABSTRACT FROM AUTHOR]

Published

2024

13. Maps on the Mirror Heisenberg–Virasoro Algebra.

Author

Guo, Xuelian, Kaygorodov, Ivan, and Tang, Liming

Subjects

*ALGEBRA, *MODULES (Algebra), *MIRRORS, *VERTEX operator algebras, *LIE algebras

Abstract

Using the first cohomology from the mirror Heisenberg–Virasoro algebra to the twisted Heisenberg algebra (as the mirror Heisenberg–Virasoro algebra module), in this paper, we determined the derivations on the mirror Heisenberg–Virasoro algebra. Based on this result, we proved that any two-local derivation on the mirror Heisenberg–Virasoro algebra is a derivation. All half-derivations are described, and as corollaries, we have descriptions of transposed Poisson structures and local (two-local) half-derivations on the mirror Heisenberg–Virasoro algebra. [ABSTRACT FROM AUTHOR]

Published

2024

14. Using Vector-Product Loop Algebra to Generate Integrable Systems.

Author

Zhang, Jian, Feng, Binlu, Zhang, Yufeng, and Ju, Long

Subjects

*ALGEBRA, *SINE-Gordon equation, *LIE algebras, *EVOLUTION equations, *SCHRODINGER equation, *COMMUTATION (Electricity), *LOOPS (Group theory)

Abstract

A new three-dimensional Lie algebra and its loop algebra are proposed by us, whose commutator is a vector product. Based on this, a positive flow and a negative flow are obtained by introducing a new kind of spectral problem expressed by the vector product, which reduces to a generalized KdV equation, a generalized Schrödinger equation, a sine-Gordon equation, and a sinh-Gordon equation. Next, the well-known Tu scheme is generalized for generating isospectral integrable hierarchies and non-isospectral integrable hierarchies. It is important that we make use of the variational method to create a new vector-product trace identity for which the Hamiltonian structure of the isospectral integrable hierarchy presented in the paper is worded out. Finally, we further enlarge the three-dimensional loop algebra into a six-dimensional loop algebra so that a new isospectral integrable hierarchy which is a type of extended integrable model is produced whose bi-Hamiltonian structure is also derived from the vector-product trace identity. This new approach presented in the paper possesses extensive applications in the aspect of generating integrable hierarchies of evolution equations. [ABSTRACT FROM AUTHOR]

Published

2023

15. On Extendibility of Evolution Subalgebras Generated by Idempotents.

Author

Mukhamedov, Farrukh and Qaralleh, Izzat

Subjects

*ALGEBRAIC fields, *TENSOR products, *ISOMORPHISM (Mathematics), *ALGEBRA

Abstract

In the present paper, we examined the extendibility of evolution subalgebras generated by idempotents of evolution algebras. The extendibility of the isomorphism of such subalgebras to the entire algebra was investigated. Moreover, the existence of an evolution algebra generated by arbitrary idempotents was also studied. Furthermore, we described the tensor product of algebras generated by arbitrary idempotents and found the conditions of the tensor decomposability of four-dimensional S-evolution algebras. This paper's findings shed light on the field of algebraic structures, particularly in studying evolution algebras. By examining the extendibility of evolution subalgebras generated by idempotents, we provide insights into the structural properties and relationships within these algebras. Understanding the isomorphism of such subalgebras and their extension allows a deeper comprehension of the overall algebraic structure and its behaviour. [ABSTRACT FROM AUTHOR]

Published

2023

16. Block-Supersymmetric Polynomials on Spaces of Absolutely Convergent Series.

Author

Kravtsiv, Viktoriia

Subjects

*POLYNOMIALS, *ANALYTIC functions, *BANACH spaces, *ALGEBRA, *SYMMETRIC functions

Abstract

In this paper, we consider a supersymmetric version of block-symmetric polynomials on a Banach space of two-sided absolutely summing series of vectors in C s for some positive integer s > 1. We describe some sequences of generators of the algebra of block-supersymmetric polynomials and algebraic relations between the generators for the finite-dimensional case and construct algebraic bases of block-supersymmetric polynomials in the infinite-dimensional case. Furthermore, we propose some consequences for algebras of block-supersymmetric analytic functions of bounded type and their spectra. Finally, we consider some special derivatives in algebras of block-symmetric and block-supersymmetric analytic functions and find related Appell-type sequences of polynomials. [ABSTRACT FROM AUTHOR]

Published

2024

17. Canonical Construction of Invariant Differential Operators: A Review.

Author

Dobrev, Vladimir K.

Subjects

*DIFFERENTIAL operators, *LIE algebras, *CONSTRUCTION projects, *ALGEBRA

Abstract

In the present paper, we review the progress of the project of the classification and construction of invariant differential operators for non-compact, semisimple Lie groups. Our starting point is the class of algebras which we called earlier 'conformal Lie algebras' (CLA), which have very similar properties to the conformal algebras of Minkowski space-time, though our aim is to go beyond this class in a natural way. For this purpose, we introduced recently the new notion of a parabolic relation between two non-compact, semi-simple Lie algebras G and G ′ that have the same complexification and possess maximal parabolic subalgebras with the same complexification. [ABSTRACT FROM AUTHOR]

Published

2024

18. Tilting Quivers for Hereditary Algebras.

Author

Li, Shen

Subjects

*ALGEBRA, *ISOMORPHISM (Mathematics), *LOGICAL prediction, *ARTIN algebras

Abstract

Let A be a finite dimensional hereditary algebra over an algebraically closed field k. In this paper, we study the tilting quiver of A from the viewpoint of τ -tilting theory. First, we prove that there exists an isomorphism between the support τ -tilting quiver Q(s τ -tilt A) of A and the tilting quiver Q(tilt A ¯ ) of the duplicated algebra A ¯ . Then, we give a new method to calculate the number of arrows in the tilting quiver Q(tilt A) when A is representation-finite. Finally, we study the conjecture given by Happel and Unger, which claims that each connected component of Q(tilt A) contains only finitely many non-saturated vertices. We provide an example to show that this conjecture does not hold for some algebras whose quivers are wild with at least four vertices. [ABSTRACT FROM AUTHOR]

Published

2024

19. A Generalization of Secondary Characteristic Classes on Lie Pseudoalgebras.

Author

Balcerzak, Bogdan

Subjects

*GENERALIZATION, *ALGEBRA

Abstract

The aim of the paper is to construct a secondary characteristic homomorphism for Lie pseudoalgebras. The case of inner product modules is under consideration. [ABSTRACT FROM AUTHOR]

Published

2024

20. Hom-Lie Superalgebras in Characteristic 2.

Author

Bouarroudj, Sofiane and Makhlouf, Abdenacer

Subjects

*COHOMOLOGY theory, *LIE algebras, *STRUCTURAL analysis (Engineering), *ALGEBRA

Abstract

The main goal of this paper was to develop the structure theory of Hom-Lie superalgebras in characteristic 2. We discuss their representations, semidirect product, and α k -derivations and provide a classification in low dimension. We introduce another notion of restrictedness on Hom-Lie algebras in characteristic 2, different from the one given by Guan and Chen. This definition is inspired by the process of the queerification of restricted Lie algebras in characteristic 2. We also show that any restricted Hom-Lie algebra in characteristic 2 can be queerified to give rise to a Hom-Lie superalgebra. Moreover, we developed a cohomology theory of Hom-Lie superalgebras in characteristic 2, which provides a cohomology of ordinary Lie superalgebras. Furthermore, we established a deformation theory of Hom-Lie superalgebras in characteristic 2 based on this cohomology. [ABSTRACT FROM AUTHOR]

Published

2023

21. Certain Bounds of Formulas in Free Temporal Algebras.

Author

García-Olmedo, Francisco Miguel, Rodríguez-Salas, Antonio Jesús, and González-Rodelas, Pedro

Subjects

*ALGEBRA, *VARIETIES (Universal algebra), *EXTREME value theory, *ALGEBRAIC varieties

Abstract

In this paper, we give a basic structure theorem based on the study of extreme cases for the value of ≺ (the classical precedence relation between ultrafilters), i.e., ≺ = ∅ and no isolated element in ≺. This gives rise, respectively, to the temporal varieties O and W , with the result that O generates a variety of temporal algebras. We also characterize the simple temporal algebras by means of arithmetical properties related to basical temporal operators; we conclude that the simplicity of the temporal algebra lies in being able to make 0 any element less than 1 by repeated application to it of the L operator. We then present an algebraic construction similar to a product but in which the temporal operations are not defined componentwise. This new "product" is shown to be useful in the study of algebra order and finding of bounds by means of something similar to a lifting process. Finally, we give an alternative proof of an already known result on atoms counting in free temporal algebras. [ABSTRACT FROM AUTHOR]

Published

2023

22. Unitary Diagonalization of the Generalized Complementary Covariance Quaternion Matrices with Application in Signal Processing.

Author

He, Zhuo-Heng, Zhang, Xiao-Na, and Chen, Xiaojing

Subjects

*COVARIANCE matrices, *SIGNAL processing, *QUATERNIONS, *ALGEBRA

Abstract

Let H denote the quaternion algebra. This paper investigates the generalized complementary covariance, which is the ϕ -Hermitian quaternion matrix. We give the properties of the generalized complementary covariance matrices. In addition, we explore the unitary diagonalization of the covariance and generalized complementary covariance. Moreover, we give the generalized quaternion unitary transform algorithm and test the performance by numerical simulation. [ABSTRACT FROM AUTHOR]

Published

2023

23. Symmetric Polynomials in Free Associative Algebras—II.

Author

Boumova, Silvia, Drensky, Vesselin, Dzhundrekov, Deyan, and Kassabov, Martin

Subjects

*ASSOCIATIVE algebras, *POLYNOMIALS, *NONCOMMUTATIVE algebras, *ALGEBRA

Abstract

Let K 〈 X d 〉 be the free associative algebra of rank d ≥ 2 over a field, K. In 1936, Wolf proved that the algebra of symmetric polynomials K 〈 X d 〉 Sym (d) is infinitely generated. In 1984 Koryukin equipped the homogeneous component of degree n of K 〈 X d 〉 with the additional action of Sym (n) by permuting the positions of the variables. He proved finite generation with respect to this additional action for the algebra of invariants K 〈 X d 〉 G of every reductive group, G. In the first part of the present paper, we established that, over a field of characteristic 0 or of characteristic p > d , the algebra K 〈 X d 〉 Sym (d) with the action of Koryukin is generated by (noncommutative version of) the elementary symmetric polynomials. Now we prove that if the field, K, is of positive characteristic at most d then the algebra K 〈 X d 〉 Sym (d) , taking into account that Koryukin's action is infinitely generated, describe a minimal generating set. [ABSTRACT FROM AUTHOR]

Published

2023

24. Fuzzy Algebras of Concepts.

Author

Ojeda-Hernández, Manuel, López-Rodríguez, Domingo, and Cordero, Pablo

Subjects

*ALGEBRA

Abstract

Preconcepts are basic units of knowledge that form the basis of formal concepts in formal concept analysis (FCA). This paper investigates the relations among different kinds of preconcepts, such as protoconcepts, meet and join-semiconcepts and formal concepts. The first contribution of this paper, is to present a fuzzy powerset lattice gradation, that coincides with the preconcept lattice at its 1-cut. The second and more significant contribution, is to introduce a preconcept algebra gradation that yields different algebras for protoconcepts, semiconcepts, and concepts at different cuts. This result reveals new insights into the structure and properties of the different categories of preconcepts. [ABSTRACT FROM AUTHOR]

Published

2023

25. Quickening Data-Aware Conformance Checking through Temporal Algebras †.

Author

Bergami, Giacomo, Appleby, Samuel, and Morgan, Graham

Subjects

*BUSINESS process management, *RELATIONAL databases, *ALGEBRA, *DATABASE design, *TRUST, *TEMPORAL databases, *DEEP learning

Abstract

A temporal model describes processes as a sequence of observable events characterised by distinguishable actions in time. Conformance checking allows these models to determine whether any sequence of temporally ordered and fully-observable events complies with their prescriptions. The latter aspect leads to Explainable and Trustworthy AI, as we can immediately assess the flaws in the recorded behaviours while suggesting any possible way to amend the wrongdoings. Recent findings on conformance checking and temporal learning lead to an interest in temporal models beyond the usual business process management community, thus including other domain areas such as Cyber Security, Industry 4.0, and e-Health. As current technologies for accessing this are purely formal and not ready for the real world returning large data volumes, the need to improve existing conformance checking and temporal model mining algorithms to make Explainable and Trustworthy AI more efficient and competitive is increasingly pressing. To effectively meet such demands, this paper offers KnoBAB, a novel business process management system for efficient Conformance Checking computations performed on top of a customised relational model. This architecture was implemented from scratch after following common practices in the design of relational database management systems. After defining our proposed temporal algebra for temporal queries (xtLTLf), we show that this can express existing temporal languages over finite and non-empty traces such as LTLf. This paper also proposes a parallelisation strategy for such queries, thus reducing conformance checking into an embarrassingly parallel problem leading to super-linear speed up. This paper also presents how a single xtLTLf operator (or even entire sub-expressions) might be efficiently implemented via different algorithms, thus paving the way to future algorithmic improvements. Finally, our benchmarks highlight that our proposed implementation of xtLTLf (KnoBAB) outperforms state-of-the-art conformance checking software running on LTLf logic. [ABSTRACT FROM AUTHOR]

Published

2023

26. The η -Anti-Hermitian Solution to a System of Constrained Matrix Equations over the Generalized Segre Quaternion Algebra.

Author

Ren, Bai-Ying, Wang, Qing-Wen, and Chen, Xue-Ying

Subjects

*QUATERNIONS, *ALGEBRA, *EQUATIONS, *SYLVESTER matrix equations, *MATRICES (Mathematics)

Abstract

In this paper, we propose three real representations of a generalized Segre quaternion matrix. We establish necessary and sufficient conditions for the existence of the η -anti-Hermitian solution to a system of constrained matrix equations over the generalized Segre quaternion algebra. We also obtain the expression of the general η -anti-Hermitian solution to the system when it is solvable. Finally, we provide a numerical example to verify the main results of this paper. [ABSTRACT FROM AUTHOR]

Published

2023

27. On the Equational Base of SMB Algebras.

Author

Đapić, Petar, Bačević, Sara, and Kovačević, Fedor

Subjects

*ALGEBRA, *VARIETIES (Universal algebra), *ALGEBRAIC varieties, *SEMILATTICES

Abstract

The "semilattices of Mal'cev blocks", for short SMB algebras, were defined by A. Bulatov. In a recently accepted paper by P. Đapić, P. Marković, R. McKenzie, and A. Prokić, the class of all SMB algebras and its subclass of regular SMB algebras were proved to be varieties of algebras. In this paper, we find an equational base of the first variety and simplify the previously known equational base of the second variety. [ABSTRACT FROM AUTHOR]

Published

2023

28. A New Class of Leonardo Hybrid Numbers and Some Remarks on Leonardo Quaternions over Finite Fields.

Author

Tan, Elif, Savin, Diana, and Yılmaz, Semih

Subjects

*QUATERNIONS, *FINITE fields, *ALGEBRA, *INTEGERS

Abstract

In this paper, we present a new class of Leonardo hybrid numbers that incorporate quantum integers into their components. This advancement presents a broader generalization of the q-Leonardo hybrid numbers. We explore some fundamental properties associated with these numbers. Moreover, we study special Leonardo quaternions over finite fields. In particular, we determine the Leonardo quaternions that are zero divisors or invertible elements in the quaternion algebra over the finite field Z p for special values of prime integer p. [ABSTRACT FROM AUTHOR]

Published

2023

29. Quasi-Semilattices on Networks.

Author

Wang, Yanhui and Meng, Dazhi

Subjects

*TREE graphs, *SEMILATTICES, *SPANNING trees, *ALGEBRA

Abstract

This paper introduces a representation of subnetworks of a network Γ consisting of a set of vertices and a set of relations, where relations are the primitive structures of a network. It is proven that all connected subnetworks of a network Γ form a quasi-semilattice L (Γ) , namely a network quasi-semilattice.Two equivalences σ and δ are defined on L (Γ) . Each δ class forms a semilattice and also has an order structure with the maximum element and minimum elements. Here, the minimum elements correspond to spanning trees in graph theory. Finally, we show how graph inverse semigroups, Leavitt path algebras and Cuntz–Krieger graph C * -algebras are constructed in terms of relations. [ABSTRACT FROM AUTHOR]

Published

2023

30. Generalized Reynolds Operators on Lie-Yamaguti Algebras.

Author

Teng, Wen, Jin, Jiulin, and Long, Fengshan

Subjects

*OPERATOR algebras, *COHOMOLOGY theory, *ALGEBRA, *LIE algebras

Abstract

In this paper, the notion of generalized Reynolds operators on Lie-Yamaguti algebras is introduced, and the cohomology of a generalized Reynolds operator is established. The formal deformations of a generalized Reynolds operator are studied using the first cohomology group. Then, we show that a Nijenhuis operator on a Lie-Yamaguti algebra gives rise to a representation of the deformed Lie-Yamaguti algebra and a 2-cocycle. Consequently, the identity map will be a generalized Reynolds operator on the deformed Lie-Yamaguti algebra. We also introduce the notion of a Reynolds operator on a Lie-Yamaguti algebra, which can serve as a special case of generalized Reynolds operators on Lie-Yamaguti algebras. [ABSTRACT FROM AUTHOR]

Published

2023

31. The Approximation Characteristics of Weighted p -Wiener Algebra.

Author

Chen, Ying, Pan, Xiangyu, Xu, Yanyan, and Chen, Guanggui

Subjects

*ALGEBRA, *ENTROPY

Abstract

In this paper, we study the approximation characteristics of weighted p-Wiener algebra A ω p T d for 1 ≤ p < ∞ defined on the d-dimensional torus T d . In particular, we investigate the asymptotic behavior of the approximation numbers, Kolmogorov numbers, and entropy numbers associated with the embeddings i d : A ω p T d → A T d and i d : A ω p T d → L q T d for 1 ≤ p , q < ∞ , where A T d is the Wiener algebra defined on the d-dimensional torus T d . [ABSTRACT FROM AUTHOR]

Published

2023

32. Deformations and Extensions of Modified λ -Differential 3-Lie Algebras.

Author

Teng, Wen and Zhang, Hui

Subjects

*ALGEBRA, *DIFFERENTIAL algebra

Abstract

In this paper, we propose the representation and cohomology of modified λ -differential 3-Lie algebras. As their applications, the linear deformations, abelian extensions and T ∗ -extensions of modified λ -differential 3-Lie algebras are also studied. [ABSTRACT FROM AUTHOR]

Published

2023

33. Hybrid near Algebra.

Author

Bhurgula, Harika, Pasham, Narasimha Swamy, Bandaru, Ravikumar, and Alali, Amal S.

Subjects

*ALGEBRA

Abstract

The objective of this paper is to study the hybrid near algebra. It has been summarized with the proper definitions and theorems of hybrid near algebra, hybrid near algebra homomorphism and direct product of hybrid near algebra. It has been proved that a homomorphic image of a hybrid near algebra is a hybrid near algebra. It also investigated the intersection of two hybrid near algebras is a hybrid near algebra. [ABSTRACT FROM AUTHOR]

Published

2023

34. On the Left Properness of the Model Category of Permutative Categories.

Author

Sharma, Amit

Subjects

*ALGEBRA

Abstract

In this paper, we introduce a notion of free cofibrations of permutative categories. We show that each cofibration of permutative categories is a retract of a free cofibration. The main goal of this paper is to show that the natural model category of permutative categories is a left proper model category. [ABSTRACT FROM AUTHOR]

Published

2023

35. On Advances of Lattice-Based Cryptographic Schemes and Their Implementations.

Author

Bandara, Harshana, Herath, Yasitha, Weerasundara, Thushara, and Alawatugoda, Janaka

Subjects

*BANACH lattices, *QUANTUM computers, *DATA encryption, *ALGEBRA, *QUANTUM computing

Abstract

Lattice-based cryptography is centered around the hardness of problems on lattices. A lattice is a grid of points that stretches to infinity. With the development of quantum computers, existing cryptographic schemes are at risk because the underlying mathematical problems can, in theory, be easily solved by quantum computers. Since lattice-based mathematical problems are hard to be solved even by quantum computers, lattice-based cryptography is a promising foundation for future cryptographic schemes. In this paper, we focus on lattice-based public-key encryption schemes. This survey presents the current status of the lattice-based public-key encryption schemes and discusses the existing implementations. Our main focus is the learning with errors problem (LWE problem) and its implementations. In this paper, the plain lattice implementations and variants with special algebraic structures such as ring-based variants are discussed. Additionally, we describe a class of lattice-based functions called lattice trapdoors and their applications. [ABSTRACT FROM AUTHOR]

Published

2022

36. Polynomial Automorphisms, Deformation Quantization and Some Applications on Noncommutative Algebras.

Author

Zhang, Wenchao, Yavich, Roman, Belov-Kanel, Alexei, Razavinia, Farrokh, Elishev, Andrey, and Yu, Jietai

Subjects

*AUTOMORPHISMS, *POLYNOMIALS, *NONCOMMUTATIVE algebras, *QUANTUM groups, *HOMOMORPHISMS, *ALGEBRA, *TORUS, *GEOMETRIC quantization

Abstract

This paper surveys results concerning the quantization approach to the Jacobian Conjecture and related topics on noncommutative algebras. We start with a brief review of the paper and its motivations. The first section deals with the approximation by tame automorphisms and the Belov–Kontsevich Conjecture. The second section provides quantization proof of Bergman's centralizer theorem which has not been revisited for almost 50 years and formulates several related centralizer problems. In the third section, we investigate a free algebra analogue of a classical theorem of Białynicki-Birula's theorem and give a noncommutative version of this famous theorem. Additionally, we consider positive-root torus actions and obtain the linearity property analogous to the Białynicki-Birula theorem. In the last sections, we introduce Feigin's homomorphisms and we see how they help us in proving our main and fundamental theorems on screening operators and in the construction of our lattice W n -algebras associated with sl n , which is by far the simplest known approach concerning constructing such algebras until now. [ABSTRACT FROM AUTHOR]

Published

2022

37. The Canonical Isomorphisms in the Yetter-Drinfeld Categories for Dual Quasi-Hopf Algebras.

Author

Ning, Yan, Lu, Daowei, and Zhao, Xiaofan

Subjects

*ALGEBRA, *HOPF algebras, *BRAIDED structures, *MATHEMATICAL physics

Abstract

Hopf algebras, as a crucial generalization of groups, have a very symmetric structure and have been playing a prominent role in mathematical physics. In this paper, let H be a dual quasi-Hopf algebra which is a more general Hopf algebra structure. A. Balan firstly introduced the notion of right-right Yetter-Drinfeld modules over H and studied its Galois extension. As a continuation, the aim of this paper is to introduce more properties of Yetter-Drinfeld modules. First, we will describe all the other three kinds of Yetter-Drinfeld modules over H, and the monoidal and braided structure of the categories of Yetter-Drinfeld modules explicitly. Furthermore, we will prove that the category H H YD f d of finite dimensional left-left Yetter-Drinfeld modules is rigid. Then we will compute explicitly the canonical isomorphisms in H H YD f d . Finally, as an application, we will rewrite the isomorphisms in the case of coquasitriangular dual quasi-Hopf algebra. [ABSTRACT FROM AUTHOR]

Published

2022

38. Omega Ideals in Omega Rings and Systems of Linear Equations over Omega Fields.

Author

Jimenez, Jorge, Serrano, María Luisa, Šešelja, Branimir, and Tepavčević, Andreja

Subjects

*LINEAR systems, *HOMOMORPHISMS, *ALGEBRA

Abstract

Omega rings (Ω -rings) (and other related structures) are lattice-valued structures (with Ω being the codomain lattice) defined on crisp algebras of the same type, with lattice-valued equality replacing the classical one. In this paper, Ω -ideals are introduced, and natural connections with Ω -congruences and homomorphisms are established. As an application, a framework of approximate solutions of systems of linear equations over Ω -fields is developed. [ABSTRACT FROM AUTHOR]

Published

2023

39. Computational Technology for the Basis and Coefficients of Geodynamo Spectral Models in the Maple System.

Author

Vodinchar, Gleb and Feshchenko, Liubov

Subjects

*SYMBOLIC computation, *ALGEBRA, *GALERKIN methods

Abstract

Spectral models are often used in the study of geodynamo problems. Physical fields in these models are presented as stationary basic modes combinations with time-dependent amplitudes. To construct a model it is necessary to calculate the modes parameters, and to calculate the model coefficients (the Galerkin coefficients). These coefficients are integrals of complex multiplicative combinations of modes and differential operators. The paper proposes computing technology for the calculation of parameters, the derivation of integrands and the calculation of the integrals themselves. The technology is based on computer algebra methods. The main elements for implementation of technology in the Maple system are described. The proposed computational technology makes it possible to quickly and accurately construct fairly wide classes of new geodynamo spectral models. [ABSTRACT FROM AUTHOR]

Published

2023

40. Genetic Algebras Associated with ξ (a) -Quadratic Stochastic Operators.

Author

Mukhamedov, Farrukh, Qaralleh, Izzat, Qaisar, Taimun, and Hasan, Mahmoud Alhaj

Subjects

*ALGEBRA, *BEHAVIORAL assessment, *GENETIC algorithms

Abstract

The present paper deals with a class of ξ (a) -quadratic stochastic operators, referred to as QSOs, on a two-dimensional simplex. It investigates the algebraic properties of the genetic algebras associated with ξ (a) -QSOs. Namely, the associativity, characters and derivations of genetic algebras are studied. Moreover, the dynamics of these operators are also explored. Specifically, we focus on a particular partition that results in nine classes, which are further reduced to three nonconjugate classes. Each class gives rise to a genetic algebra denoted as A i , and it is shown that these algebras are isomorphic. The investigation then delves into analyzing various algebraic properties within these genetic algebras, such as associativity, characters, and derivations. The conditions for associativity and character behavior are provided. Furthermore, a comprehensive analysis of the dynamic behavior of these operators is conducted. [ABSTRACT FROM AUTHOR]

Published

2023

41. Multiple-Attribute Decision Making Based on the Probabilistic Dominance Relationship with Fuzzy Algebras.

Author

Baklouti, Amir

Subjects

*DECISION making, *PROBABILISTIC number theory, *ALGEBRA, *SOCIAL dominance, *FUZZY numbers, *FUZZY sets

Abstract

In multiple-attribute decision-making (MADM) problems, ranking the alternatives is an important step for making the best decision. Intuitionistic fuzzy numbers (IFNs) are a powerful tool for expressing uncertainty and vagueness in MADM problems. However, existing ranking methods for IFNs do not consider the probabilistic dominance relationship between alternatives, which can lead to inconsistent and inaccurate rankings. In this paper, we propose a new ranking method for IFNs based on the probabilistic dominance relationship and fuzzy algebras. The proposed method is able to handle incomplete and uncertain information and can generate consistent and accurate rankings. [ABSTRACT FROM AUTHOR]

Published

2023

42. Gorenstein Flat Modules of Hopf-Galois Extensions.

Author

Guo, Qiaoling, Shan, Tingting, Shen, Bingliang, and Yang, Tao

Subjects

*HOPF algebras, *ALGEBRA

Abstract

Let A / B be a right H-Galois extension over a semisimple Hopf algebra H. The purpose of this paper is to give the relationship of Gorenstein flat dimensions between the algebra A and its subalgebra B, and obtain that the global Gorenstein flat dimension and the finitistic Gorenstein flat dimension of A is no more than that of B. Then the problem of preserving property of Gorenstein flat precovers for the Hopf-Galois extension will be studied. Finally, more relations for the crossed products and smash products will be obtained as applications. [ABSTRACT FROM AUTHOR]

Published

2023

43. A New Solvable Generalized Trigonometric Tangent Potential Based on SUSYQM.

Author

Xiong, Lulin, Tan, Xin, Zhong, Shikun, Cheng, Wei, and Luo, Guang

Subjects

*SCHRODINGER equation, *ALGEBRA, *GEOMETRIC shapes, *EIGENVALUES, *QUANTUM mechanics, *PIEZOELECTRIC ceramics

Abstract

Supersymmetric quantum mechanics has wide applications in physics. However, there are few potentials that can be solved exactly by supersymmetric quantum mechanics methods, so it is undoubtedly of great significance to find more potentials that can be solved exactly. This paper studies the supersymmetric quantum mechanics problems of the Schrödinger equation with a new kind of generalized trigonometric tangent superpotential: A tan n p x + B tan m p x . We will elaborate on this new potential in the following aspects. Firstly, the shape invariant relation of partner potential is generated by the generalized trigonometric tangent superpotential. We find three shape invariance forms that satisfy the additive condition. Secondly, the eigenvalues and the eigenwave functions of the potential are studied separately in these three cases. Thirdly, the potential algebra of such a superpotential is discussed, and the discussions are explored from two aspects: one parameter's and two parameters' potential algebra. Through the potential algebra, the eigenvalue spectrums are given separately which are consistent with those mentioned earlier. Finally, we summarize the paper and give an outlook on the two-parameter shape-invariant potential. [ABSTRACT FROM AUTHOR]

Published

2022

44. On Implicative Derivations of MTL-Algebras.

Author

Liu, Jianxin, Li, Yijun, Yang, Yongwei, and Wang, Juntao

Subjects

*REPRESENTATIONS of algebras, *COMMONS, *ALGEBRA, *BIJECTIONS

Abstract

This paper introduces the implicative derivations and gives some of their characterizations on MTL-algebras. Furthermore, we provide some representation of MTL-algebras by implicative derivations and obtain some representation of Boolean algebra via the algebra of all implicative derivations. Finally, we explore the relationship between implicative derivation and other operators on MTL-algebras and show that there exists a bijection between the sets of multiplier and implicative derivations on IMTL-algebras. The results of this paper can provide the common properties of implicative derivations in the t-norm-based fuzzy logical algebras. [ABSTRACT FROM AUTHOR]

Published

2022

45. Modeling Method to Abstract Collective Behavior of Smart IoT Systems in CPS.

Author

Song, Junsup, Karagiannis, Dimitris, and Lee, Moonkun

Subjects

*COLLECTIVE behavior, *INTERNET of things, *PROBLEM solving, *ALGEBRA

Abstract

This paper presents a new modeling method to abstract the collective behavior of Smart IoT Systems in CPS, based on process algebra and a lattice structure. In general, process algebra is known to be one of the best formal methods to model IoTs, since each IoT can be represented as a process; a lattice can also be considered one of the best mathematical structures to abstract the collective behavior of IoTs since it has the hierarchical structure to represent multi-dimensional aspects of the interactions of IoTs. The dual approach using two mathematical structures is very challenging since the process algebra have to provide an expressive power to describe the smart behavior of IoTs, and the lattice has to provide an operational capability to handle the state-explosion problem generated from the interactions of IoTs. For these purposes, this paper presents a process algebra, called dTP-Calculus, which represents the smart behavior of IoTs with non-deterministic choice operation based on probability, and a lattice, called n:2-Lattice, which has special join and meet operations to handle the state explosion problem. The main advantage of the method is that the lattice can represent all the possible behavior of the IoT systems, and the patterns of behavior can be elaborated by finding the traces of the behavior in the lattice. Another main advantage is that the new notion of equivalences can be defined within n:2-Lattice, which can be used to solve the classical problem of exponential and non-deterministic complexity in the equivalences of Norm Chomsky and Robin Milner by abstracting them into polynomial and static complexity in the lattice. In order to prove the concept of the method, two tools are developed based on the ADOxx Meta-Modeling Platform: SAVE for the dTP-Calculus and PRISM for the n:2-Lattice. The method and tools can be considered one of the most challenging research topics in the area of modeling to represent the collective behavior of Smart IoT Systems. [ABSTRACT FROM AUTHOR]

Published

2022

46. Remarks Regarding Computational Aspects in Algebras Obtained by Cayley–Dickson Process and Some of Their Applications.

Author

Flaut, Cristina and Zaharia, Geanina

Subjects

*DIVISION algebras, *ALGEBRA, *QUADRATIC equations, *IDENTITIES (Mathematics)

Abstract

Due to the computational aspects which appear in the study of algebras obtained by the Cayley–Dickson process, it is difficult to obtain nice properties for these algebras. For this reason, finding some identities in such algebras plays an important role in obtaining new properties of these algebras and facilitates computations. In this regard, in the first part of this paper, we present some new identities and properties in algebras obtained by the Cayley–Dickson process. As another remark regarding the computational aspects in these algebras, in the last part of this paper, we solve some quadratic equations in the real division quaternion algebra when their coefficients are some special elements. These special coefficients allowed us to solve interesting quadratic equations, providing solutions directly, without using specialized softs. [ABSTRACT FROM AUTHOR]

Published

2022

47. A Characterization of Multipliers of the Herz Algebra.

Author

Feichtinger, Hans G.

Subjects

*ALGEBRA, *MULTIPLIERS (Mathematical analysis), *LINEAR operators, *ABELIAN groups, *FUNCTION spaces, *MOVING average process

Abstract

For the characterization of multipliers of L p (R d) or more generally, of L p (G) for some locally compact Abelian group G, the so-called Figa-Talamanca–Herz algebra A p (G) plays an important role. Following Larsen's book, we describe multipliers as bounded linear operators that commute with translations. The main result of this paper is the characterization of the multipliers of A p (G) . In fact, we demonstrate that it coincides with the space of multipliers of L p (G) , ∥ · ∥ p . Given a multiplier T of (A p (G) , ∥ · ∥ A p (G) ) and using the embedding ( A p (G) , ∥ · ∥ A p (G) ) ↪ C 0 (G) , ∥ · ∥ ∞ , the linear functional f ↦ [ T (f) (0) ] is bounded, and T can be written as a moving average for some element in the dual P M p (G) of (A p (G) , ∥ · ∥ A p (G) ) . A key step for this identification is another elementary fact: showing that the multipliers from L p (G) , ∥ · ∥ p to C 0 (G) , ∥ · ∥ ∞ are exactly the convolution operators with kernels in L q (G) , ∥ · ∥ q for 1 < p < ∞ and 1 / p + 1 / q = 1 . The proofs make use of the space of mild distributions, which is the dual of the Segal algebra S 0 (G) , ∥ · ∥ S 0 , and the fact that multipliers T from S 0 (G) to S 0 ′ (G) are convolution operators of the form T : f ↦ σ ∗ f for some uniquely determined σ ∈ S 0 ′ . This setting also allows us to switch from the description of these multipliers as convolution operators (by suitable pseudomeasures) to their description as Fourier multipliers, using the extended Fourier transform in the setting of S 0 ′ (G) , ∥ · ∥ S 0 ′ . The approach presented here extends to other function spaces, but a more detailed discussion is left to future publications. [ABSTRACT FROM AUTHOR]

Published

2023

48. Octonion Internal Space Algebra for the Standard Model †.

Author

Todorov, Ivan

Subjects

*STANDARD model (Nuclear physics), *ALGEBRA, *CAYLEY numbers (Algebra), *PARTICLE physics, *CLIFFORD algebras, *COSINE function, *SUPERSYMMETRY

Abstract

This paper surveys recent progress in our search for an appropriate internal space algebra for the standard model (SM) of particle physics. After a brief review of the existing approaches, we start with the Clifford algebras involving operators of left multiplication by octonions. A central role is played by a distinguished complex structure that implements the splitting of the octonions O = C ⊕ C 3 , which reflect the lepton-quark symmetry. Such a complex structure on the 32-dimensional space S of C ℓ 10 Majorana spinors is generated by the C ℓ 6 (⊂ C ℓ 10) volume form, ω 6 = γ 1 ⋯ γ 6 , and is left invariant by the Pati–Salam subgroup of S p i n (10) , G PS = S p i n (4) × S p i n (6) / Z 2 . While the S p i n (10) invariant volume form ω 10 = γ 1 ... γ 10 of C ℓ 10 is known to split S on a complex basis into left and right chiral (semi)spinors, P = 1 2 (1 − i ω 6) is interpreted as the projector on the 16-dimensional particle subspace (which annihilates the antiparticles).The standard model gauge group appears as the subgroup of G PS that preserves the sterile neutrino (which is identified with the Fock vacuum). The Z 2 -graded internal space algebra A is then included in the projected tensor product A ⊂ P C ℓ 10 P = C ℓ 4 ⊗ C ℓ 6 0 . The Higgs field appears as the scalar term of a superconnection, an element of the odd part C ℓ 4 1 of the first factor. The fact that the projection of C ℓ 10 only involves the even part C ℓ 6 0 of the second factor guarantees that the color symmetry remains unbroken. As an application, we express the ratio m H m W of the Higgs to the W boson masses in terms of the cosine of the theoretical Weinberg angle. [ABSTRACT FROM AUTHOR]

Published

2023

49. Linear Maps Preserving the Set of Semi-Weyl Operators.

Author

Yu, Wei-Yan and Cao, Xiao-Hong

Subjects

*LINEAR operators, *HILBERT space, *ALGEBRA, *COMPACT operators, *AUTOMORPHISMS

Abstract

Let H be an infinite-dimensional separable complex Hilbert space and B (H) the algebra of all bounded linear operators on H. In this paper, we characterized the linear maps ϕ : B (H) → B (H) , which are surjective up to compact operators preserving the set of left semi-Weyl operators in both directions. As an application, we proved that ϕ preserves the essential approximate point spectrum if and only if the ideal of all compact operators is invariant under ϕ and the induced map φ on the Calkin algebra is an automorphism. Moreover, we have i n d (ϕ (T)) = i n d (T) if both ϕ (T) and T are Fredholm. [ABSTRACT FROM AUTHOR]

Published

2023

50. Seaweeds Arising from Brauer Configuration Algebras.

Author

Cañadas, Agustín Moreno and Mendez, Odette M.

Subjects

*ALGEBRA, *REPRESENTATION theory, *LIE algebras, *PARTITIONS (Mathematics)

Abstract

Seaweeds or seaweed Lie algebras are subalgebras of the full-matrix algebra Mat (n) introduced by Dergachev and Kirillov to give an example of algebras for which it is possible to compute the Dixmier index via combinatorial methods. It is worth noting that finding such an index for general Lie algebras is a cumbersome problem. On the other hand, Brauer configuration algebras are multiserial and symmetric algebras whose representation theory can be described using combinatorial data. It is worth pointing out that the set of integer partitions and compositions of a fixed positive integer give rise to Brauer configuration algebras. However, giving a closed formula for the dimension of these kinds of algebras or their centers for all positive integer is also a tricky problem. This paper gives formulas for the dimension of Brauer configuration algebras (and their centers) induced by some restricted compositions. It is also proven that some of these algebras allow defining seaweeds of Dixmier index one. [ABSTRACT FROM AUTHOR]

Published

2023