Showing total 11,668 results

1. Pairs of commuting quadratic elements in the universal enveloping algebra of Euclidean algebra and integrals of motion* Inspiration and need for this paper came from numerous discussions with Pavel Winternitz over several years. Unfortunately, while he was alive we always found other more urgent research directions to follow together. Thus we can only dedicate our paper to his memory

Author

Marchesiello, A and Ĺ nobl, L

Subjects

*UNIVERSAL algebra, *ALGEBRA, *MAGNETIC structure, *LINEAR momentum, *INTEGRALS, *EUCLIDEAN algorithm

Abstract

Motivated by the consideration of integrable systems in three spatial dimensions in Euclidean space with integrals quadratic in the momenta we classify three-dimensional Abelian subalgebras of quadratic elements in the universal enveloping algebra of the Euclidean algebra under the assumption that the Casimir invariant p â†' â‹... l â†' vanishes in the relevant representation. We show by means of an explicit example that in the presence of magnetic field, i.e. terms linear in the momenta in the Hamiltonian, this classification allows for pairs of commuting integrals whose leading order terms cannot be written in the famous classical form of Makarov et al [17]. We consider limits simplifying the structure of the magnetic field in this example and corresponding reductions of integrals, demonstrating that singularities in the integrals may arise, forcing structural changes of the leading order terms. [ABSTRACT FROM AUTHOR]

Published

2022

2. Elementary Derivations of the Euclidean Hurwitz Algebras Adapted from Gadi Moran's last paper.

Author

Moran, Tomer, Moran, Shay, and Moran, Shlomo

Subjects

*ALGEBRA, *EUCLIDEAN geometry, *COMPLEX numbers, *MATHEMATICIANS, *QUATERNIONS, *EUCLIDEAN algorithm

Abstract

"Real Normed Algebras Revisited," the last paper of the late Gadi Moran, attempts to reconstruct the discovery of the complex numbers, the quaternions, and the octonions, as well as proofs of their properties, using only what was known to 19th-century mathematicians. In his research, Gadi had discovered simple and elegant proofs of the above-mentioned classical results using only basic properties of the geometry of Euclidean spaces and tools from high school geometry. His reconstructions underline an interesting connection between Euclidean geometry and these algebras, and avoid the advanced machinery used in previous derivations of these results. The goal of this article is to present Gadi's derivations in a way that is accessible to a wide audience of readers. [ABSTRACT FROM AUTHOR]

Published

2021

3. Quantization of two- and three-player cooperative games based on QRA.

Author

Eryganov, Ivan, Hrdina, Jaroslav, and Návrat, Aleš

Subjects

*CLIFFORD algebras, *QUANTUM computing, *ALGEBRA, *ANALOGY, *PROBABILITY theory

Abstract

In this paper, a novel quantization scheme for cooperative games is proposed. The circuit is inspired by the Eisert–Wilkens–Lewenstein protocol, which was modified to represent cooperation between players and extended to 3–qubit states. The framework of Clifford algebra is used to perform necessary computations. In particular, we use a direct analogy between Dirac formalism and Quantum Register Algebra (QRA) to represent circuits. This analogy enables us to perform automated proofs of the circuit equivalence in a simple fashion. The expected value of the Shapley value concerning quantum probabilities is employed to distribute players' payoffs after the measurement. We study how entanglement, representing the level of pre-agreement between players, affects the final utility distribution. The paper also demonstrates how the QRA and GAALOP software can automate all necessary calculations. [ABSTRACT FROM AUTHOR]

Published

2024

4. Modular structure theory on Hom-Lie algebras.

Author

Mao, Dan, Guan, Baoling, and Chen, Liangyun

Subjects

*MODULAR construction, *STRUCTURAL analysis (Engineering), *SUPERALGEBRAS, *ALGEBRA, *MATHEMATICS, *LIE superalgebras

Abstract

The aim of this paper is to transfer the restrictedness theory to Hom-Lie algebras. The concept of restricted Hom-Lie algebras, which is introduced in [S. Bouarroudj and A. Makhlouf, Hom-lie superalgebras in characteristic 2, Mathematics 11 2023, 24, Paper No. 4955], will be used in this paper. First, the existence and uniqueness of p-structures on a Hom-Lie algebra is studied. Then the definition of a restrictable Hom-Lie algebra is given and the equivalence relation between restrictable Hom-Lie algebras and restricted Hom-Lie algebras is constructed. Finally, the p-envelopes of a Hom-Lie algebra are defined and studied. [ABSTRACT FROM AUTHOR]

Published

2024

5. Arithmetic branching law and generic L-packets.

Author

Chen, Cheng, Jiang, Dihua, Liu, Dongwen, and Zhang, Lei

Subjects

*NUMBER theory, *ARITHMETIC, *ALGEBRA, *LOGICAL prediction

Abstract

Let G be a classical group defined over a local field F of characteristic zero. For any irreducible admissible representation \pi of G(F), which is of Casselman-Wallach type if F is archimedean, we extend the study of spectral decomposition of local descents by Jiang and Zhang [Algebra Number Theory 12 (2018), 1489–1535] for special orthogonal groups over non-archimedean local fields to more general classical groups over any local field F. In particular, if \pi has a generic local L-parameter, we introduce the spectral first occurrence index {\mathfrak {f}}_{\mathfrak {s}}(\pi) and the arithmetic first occurrence index {\mathfrak {f}}_{{\mathfrak {a}}}(\pi) of \pi and prove in this paper that {\mathfrak {f}}_{\mathfrak {s}}(\pi)={\mathfrak {f}}_{{\mathfrak {a}}}(\pi). Based on the theory of consecutive descents of enhanced L-parameters developed by Jiang, Liu, and Zhang [Arithmetic wavefront sets and generic L-packets, arXiv:2207.04700], we are able to show in this paper that the first descent spectrum consists of all discrete series representations, which determines explicitly the branching decomposition problem by means of the relevant arithmetic data and extends the main result (Jiang and Zhang [Algebra Number Theory 12 (2018), 1489–1535], Theorem 1.7) to broader generality. [ABSTRACT FROM AUTHOR]

Published

2024

6. Characteristic cohomology II: Matrix singularities.

Author

Damon, James

Subjects

*COMPLEX matrices, *SYMMETRIC spaces, *ALGEBRA, *SUBMANIFOLDS, *KITES, *MILNOR fibration, *COHOMOLOGY theory

Abstract

For a germ of a variety V,0⊂CN,0$\mathcal {V}, 0 \subset \mathbb {C}^N, 0$, a singularity V0$\mathcal {V}_0$ of "type V$\mathcal {V}$" is given by a germ f0:Cn,0→CN,0$f_0: \mathbb {C}^n, 0 \rightarrow \mathbb {C}^N, 0$, which is transverse to V∖{0}$\mathcal {V}\setminus \lbrace 0\rbrace$ in an appropriate sense, such that V0=f0−1(V)$\mathcal {V}_0 = f_0^{-1}(\mathcal {V})$. In part I of this paper, we introduced for such singularities the Characteristic Cohomology for the Milnor fiber (for V$\mathcal {V}$ a hypersurface), and complement and link (for the general case). It captures the cohomology of V0$\mathcal {V}_0$ inherited from V$\mathcal {V}$ and is given by subalgebras of the cohomology for V0$\mathcal {V}_0$ for the Milnor fiber and complements, and is a subgroup for the cohomology of the link. We showed these cohomologies are functorial and invariant under diffeomorphism groups of equivalences KH$\mathcal {K}_{H}$ for Milnor fibers and KV$\mathcal {K}_{\mathcal {V}}$ for complements and links. We also gave geometric criteria for detecting the nonvanishing of the characteristic cohomology. In this paper, we apply these methods in the case V$\mathcal {V}$ denotes any of the varieties of singular m×m$m \times m$ complex matrices, which may be either general, symmetric, or skew‐symmetric (with m$m$ even). For these varieties, we have shown in another paper that their Milnor fibers and complements have compact "model submanifolds" for their homotopy types, which are classical symmetric spaces in the sense of Cartan. As a result, we first give the structure of the characteristic cohomology subalgebras for the Milnor fibers and complements as images of exterior algebras (or in one case a module on two generators over an exterior algebra). For links, the characteristic cohomology group is the image of a shifted upper truncated exterior algebra. In addition, we extend these results for the complement and link to the case of general m×p$m \times p$ complex matrices. Second, we then apply the geometric detection methods introduced in Part I to detect when specific characteristic cohomology classes for the Milnor fiber or complement are nonzero. We identify an exterior subalgebra on a specific set of generators and for the link that it contains an appropriate shifted upper truncated exterior subalgebra. The detection criterion involves a special type of "kite map germ of size ℓ$\ell$" based on a given flag of subspaces. The general criterion that detects such nonvanishing characteristic cohomology is then given in terms of the defining germ f0$f_0$ containing such a kite map germ of size ℓ$\ell$. Furthermore, we use a restricted form of kite spaces to give a cohomological relation between the cohomology of local links and the global link for the varieties of singular matrices. [ABSTRACT FROM AUTHOR]

Published

2024

7. On ϕ-(weak) global dimension.

Author

El Haddaoui, Younes and Mahdou, Najib

Subjects

*NOETHERIAN rings, *COMMUTATIVE rings, *ACADEMIC libraries, *ALGEBRA, *MATHEMATICS

Abstract

In this paper, we will introduce and study the homological dimensions defined in the context of commutative rings with prime nilradical. So all rings considered in this paper are commutative with identity and with prime nilradical. We will introduce a new class of modules which are called ϕ -u-projective which generalizes the projectivity in the classical case and which is different from those introduced by the authors of [Y. Pu, M. Wang and W. Zhao, On nonnil-commutative diagrams and nonnil-projective modules, Commun. Algebra, doi:10.1080/00927872.2021.2021223; W. Zhao, On ϕ -exact sequence and ϕ -projective module, J. Korean Math. 58(6) (2021) 1513–1528]. Using the notion of ϕ -flatness introduced and studied by the authors of [G. H. Tang, F. G. Wang and W. Zhao, On ϕ -Von Neumann regular rings, J. Korean Math. Soc. 50(1) (2013) 219–229] and the nonnil-injectivity studied by the authors of [W. Qi and X. L. Zhang, Some Remarks on ϕ -Dedekind rings and ϕ -Prüfer rings, preprint (2022), arXiv:2103.08278v2 [math.AC]; X. Y. Yang, Generalized Noetherian Property of Rings and Modules (Northwest Normal University Library, Lanzhou, 2006); X. L. Zhang, Strongly ϕ -flat modules, strongly nonnil-injective modules and their homological dimensions, preprint (2022), https://arxiv.org/abs/2211.14681; X. L. Zhang and W. Zhao, On Nonnil-injective modules, J. Sichuan Normal Univ. 42(6) (2009) 808–815; W. Zhao, Homological theory over NP-rings and its applications (Sichuan Normal University, Chengdu, 2013)], we will introduce the ϕ -injective dimension, ϕ -projective dimension and ϕ -flat dimension for modules, and also the ϕ -(weak) global dimension of rings. Then, using these dimensions, we characterize several ϕ -rings (ϕ -Prüfer, ϕ -chained, ϕ -von Neumann, etc). Finally, we study the ϕ -(weak) global dimension of the trivial ring extensions defined by some conditions. [ABSTRACT FROM AUTHOR]

Published

2024

8. Corrigendum to inner Rickart and Baer Jordan algebras.

Author

Arzikulov, F. N. and Khakimov, U. I.

Subjects

*JORDAN algebras, *ALGEBRA

Abstract

In the present paper corrected versions of the statements in the paper "Description of finite-dimensional inner Rickart and Baer Jordan algebras" by F.N. Arzikulov and U.I. Khakimov are given. In particular, it is shown that for any Jordan algebra J with an idempotent p and an associative degenerate radical D such that J = F p + ̇ D , J is an inner RJ-algebra if and only if, for any nonzero a ∈ D , a 2 = 0 and p(pa) = pa. Also, other equivalent conditions when a Jordan algebra J is an inner RJ-algebra are given. As for finite-dimensional nilpotent Jordan algebras, there is not a nilpotent inner RJ-algebra (and hence inner BJ-algebra) except the finite-dimensional Jordan algebra the square of each element of which is zero. [ABSTRACT FROM AUTHOR]

Published

2024

9. The Hochschild cohomology groups under gluing arrows.

Author

Liu, Yuming, Rubio y Degrassi, Lleonard, and Wen, Can

Subjects

*GLUE, *FINITE groups, *IDEMPOTENTS, *ALGEBRA

Abstract

In a previous paper we have compared the Hochschild cohomology groups of finite dimensional monomial algebras under gluing two idempotents. In the present paper, we compare the Hochschild cohomology groups of finite dimensional monomial algebras under gluing two arrows. [ABSTRACT FROM AUTHOR]

Published

2024

10. Quantum Logics of Fuzzy Representations.

Author

Singh, Akhilesh Kumar, Singh, Rashmi, and Singh, Bhawna

Subjects

*QUANTUM information theory, *QUANTUM logic, *FUZZY logic, *FUZZY systems, *ALGEBRA

Abstract

Quantum logic (QL) and fuzzy logic (FL) have been gaining attention nowadays due to its potential to be used in quantum computing and information theory. This paper aims to provide a comprehensive overview of QL models of fuzzy representations viz. fuzzy sets (FSs), interval valued fuzzy sets (IVFSs), intuitionistic fuzzy sets (IFSs) and interval valued intuitionistic fuzzy sets (IVIFSs). These QL models can be used to analyze the behavior of quantum logical systems in a fuzzy environment, which is particularly useful for dealing with uncertainty and imprecision in quantum environment. Furthermore, this paper explores the concept of effect algebras (EAs), which are algebraic structures that provide a natural framework for studying FL. Specifically, it is shown that the family of FS, IVFS, IFS and IVIFS can be organized into an EA if the Lukasiewicz operations are considered. This result is significant because EAs can be used to model a wide range of physical and mathematical systems, including quantum systems, and provide a useful tool for analyzing the properties of FL. [ABSTRACT FROM AUTHOR]

Published

2024

11. Tensor 2-product for [formula omitted]: Extensions to the negative half.

Author

McMillan, Matthew

Subjects

*LIE algebras, *ALGEBRA

Abstract

In a recent paper, the author defined an operation of tensor product for a large class of 2-representations of U + , the positive half of the 2-category associated to sl 2. In this paper, we prove that the operation extends to give an operation of tensor product for 2-representations of the full 2-category U : when the inputs are 2-representations of the full U , the 2-product is also a 2-representation of the full U. As in the previous paper, the 2-product is given for a simple 2-representation L (1) and an abelian 2-representation V taken from the 2-category of algebras. This is the first construction of an operation of tensor product for higher representations of a full Lie algebra in the abelian setting. [ABSTRACT FROM AUTHOR]

Published

2024

12. A note on the paper 'Ultra discrete permanent and the consistency of max plus linear equations'.

Author

Wang, Hui-li and Yang, Yan

Subjects

*LINEAR equations, *LINEAR algebra, *ALGEBRA, *MATHEMATICAL equivalence, *EQUATIONS

Abstract

This work is concerned with the consistency conditions for the equations in max plus algebra. The three classes of the max plus linear equations presented in the paper Shinzawa [Ultra discrete permanent and the consistency of max plus linear equations, Linear Algebra Appl. 506 (2016) 445–477] can be equivalently converted into the corresponding system of inequalities. The equivalence relation between ultra discrete permanent and maximum cycle mean is suggested. Thus, the necessary and sufficient conditions for solvability of the equations are obtained using the maximum cycle mean in this note. [ABSTRACT FROM AUTHOR]

Published

2019

13. On Classification of the Genetic and Evolution Rock-Paper-Scissor Algebras.

Author

Ganikhodjaev, Nasir and Ftameh, Khaled

Subjects

*VOLTERRA operators, *ALGEBRA, *BIOLOGICAL evolution, *CLASSIFICATION, *ISOMORPHISM (Mathematics)

Abstract

We consider genetic and evolution algebras generated by non-ergodic Volterra operator. It is known that a zero-sum game generated by Volterra operator be a RPS game if and only if the operator is a non-ergodic transformation. We will call the genetic (evolution) algebra generated by non-ergodic Volterra operator RPS genetic (respectively RPS evolution) algebra. In this paper, we investigate the problem of isomorphism of two RPS genetic (evolutionary) algebras and establish necessary and sufficient conditions when two such algebras will be isomorphic. [ABSTRACT FROM AUTHOR]

Published

2019

14. Superpolynomial Lower Bounds Against Low-Depth Algebraic Circuits.

Author

Limaye, Nutan, Srinivasan, Srikanth, and Tavenas, Sébastien

Subjects

*ALGEBRA, *POLYNOMIALS, *CIRCUIT complexity, *ALGORITHMS, *DIRECTED acyclic graphs, *LOGIC circuits

Abstract

An Algebraic Circuit for a multivariate polynomial P is a computational model for constructing the polynomial P using only additions and multiplications. It is a syntactic model of computation, as opposed to the Boolean Circuit model, and hence lower bounds for this model are widely expected to be easier to prove than lower bounds for Boolean circuits. Despite this, we do not have superpolynomial lower bounds against general algebraic circuits of depth 3 (except over constant-sized finite fields) and depth 4 (over any field other than F2), while constant-depth Boolean circuit lower bounds have been known since the early 1980s. In this paper, we prove the first superpolynomial lower bounds against algebraic circuits of all constant depths over all fields of characteristic 0. We also observe that our super-polynomial lower bound for constant-depth circuits implies the first deterministic sub-exponential time algorithm for solving the Polynomial Identity Testing (PIT) problem for all small-depth circuits using the known connection between algebraic hardness and randomness. [ABSTRACT FROM AUTHOR]

Published

2024

15. Abelian powers in paper-folding words

Author

Holub, Štěpán

Subjects

*ABELIAN groups, *PAPER arts, *VOCABULARY, *ARBITRARY constants, *ALGEBRA, *COMBINATORICS

Abstract

Abstract: We show that paper-folding words contain arbitrarily large abelian powers. [Copyright &y& Elsevier]

Published

2013

16. Tensor product of generalized polynomial modules for the Virasoro algebra.

Author

Guo, Xiangqian, Li, Shujuan, and Zhu, Qianwen

Subjects

*MODULES (Algebra), *TENSOR algebra, *TENSOR products, *ALGEBRA, *POLYNOMIALS

Abstract

In this paper, we construct a class of modules T over the Virasoro algebra by taking tensor products of the modules N (Ω (λ , b) , V) defined in [24,19] and the irreducible modules defined in [31]. This provides a unified description of many known examples of Virasoro modules, for example, in [28,34,35,12,20,5]. We obtain the necessary and sufficient conditions for T to be irreducible and study their submodule structure when they are reducible. Then we also determine the conditions for two such modules to be isomorphic. In the last part of the paper, we compare the tensor product modules with other known Virasoro modules, concluding that they provide new simple modules in general, while admit some interesting isomorphisms with modules defined in [40] and [33]. [ABSTRACT FROM AUTHOR]

Published

2024

17. Computing Gröbner bases on the Weyl algebras over fields with valuations.

Author

Hartanto, Ari Dwi and Ohara, Katsuyoshi

Subjects

*GROBNER bases, *POLYNOMIAL rings, *COMPUTER systems, *ALGEBRA, *VALUATION

Abstract

The computational aspect of tropical Gröbner bases for a polynomial ring K [ x ] with respect to tropical term orders studied by Chan and Maclagan in 2019 is extended to the Weyl algebra D n (K) , where K is a field with a valuation. The term order in this paper is not only an extension of the tropical term order on K [ x ] by Chan and Maclagan, but also of the tropical term order on K [ x ] studied by Vaccon et al. (2021). Due to the involvement of the valuations of term coefficients, this term order is not well-ordering. Therefore, a suitable division algorithm with respect to this term order is needed. This algorithm holds only for homogeneous operators, so utilizing the homogenized Weyl algebra is required. A computation example and an implementation in Risa/Asir Computer Algebra System are also presented in this paper. [ABSTRACT FROM AUTHOR]

Published

2024

18. Periodic dimensions and some homological properties of eventually periodic algebras.

Author

Usui, Satoshi

Subjects

*MODULES (Algebra), *ALGEBRA, *HOMOLOGICAL algebra

Abstract

For an eventually periodic module, we have the degree and the period of its first periodic syzygy. This paper studies the former under the name "periodic dimension". We give a bound for the periodic dimension of an eventually periodic module with finite Gorenstein projective dimension. We also provide a method of computing the Gorenstein projective dimension of an eventually periodic module under certain conditions. Besides, motivated by recent results of Dotsenko, Gélinas and Tamaroff and of the author, we determine the bimodule periodic dimension of an eventually periodic Gorenstein algebra. Another aim of this paper is to obtain some of the basic homological properties of eventually periodic algebras. We show that a lot of homological conjectures hold for this class of algebras. As an application, we characterize eventually periodic Gorenstein algebras in terms of bimodules Gorenstein projective dimensions. [ABSTRACT FROM AUTHOR]

Published

2024

19. Kummer–Witt–Jackson algebras.

Author

Larsson, Daniel

Subjects

*BRAUER groups, *ALGEBRAIC geometry, *GROUP algebras, *ALGEBRA, *ARITHMETIC

Abstract

This paper is concerned with the construction of a small, but non-trivial, example of a polynomial identity algebra, which we call the Jackson algebra, that will be used in sequels to this paper to study non-commutative arithmetic geometry. In this paper this algebra is studied from a ring-theoretic and geometric viewpoint. Among other things it turns out that this algebra is a "non-commutative family" of central simple algebras and thus parameterizes Brauer classes over extensions of the base. [ABSTRACT FROM AUTHOR]

Published

2024

20. Instructional Supports for Representational Fluency in Solving Linear Equations with Computer Algebra Systems and Paper‐and‐Pencil.

Author

Fonger, Nicole L., Davis, Jon D., and Rohwer, Mary Lou

Subjects

*MATHEMATICS education, *LINEAR equations, *MATHEMATICS teachers, *MATHEMATICS students, *ACADEMIC achievement

Abstract

This research addresses the issue of how to support students' representational fluency—the ability to create, move within, translate across, and derive meaning from external representations of mathematical ideas. The context of solving linear equations in a combined computer algebra system (CAS) and paper‐and‐pencil classroom environment is targeted as a rich and pressing context to study this issue. We report results of a collaborative teaching experiment in which we designed for and tested a functions approach to solving equations with ninth‐grade algebra students, and link to results of semi‐structured interviews with students before and after the experiment. Results of analyzing the five‐week experiment include instructional supports for students' representational fluency in solving linear equations: (a) sequencing the use of graphs, tables, and CAS feedback prior to formal symbolic transpositions, (b) connecting solutions to equations across representations, and (c) encouraging understanding of equations as equivalence relations that are sometimes, always, or never true. While some students' change in sophistication of representational fluency helps substantiate the productive nature of these supports, other students' persistent struggles raise questions of how to address the diverse needs of learners in complex learning environments involving multiple tool‐based representations. [ABSTRACT FROM AUTHOR]

Published

2018

21. On the common slot property for symbol algebras.

Author

Sivatski, Alexander S.

Subjects

*COMMONS, *ALGEBRA, *SIGNS & symbols, *LAURENT series

Abstract

Let k be a field, let n ≥ 2 be a nonsquarefree integer not divisible by the characteristic of k. Assume that all roots of unity of degree n are contained in k. In the first part of the paper we consider pairs of symbol algebras over k with common slots D 1 ≃ (e , x) n ≃ (r , u) n , D 2 ≃ (e , y) n ≃ (r , v) n , exp D 1 = exp D 2 = n , and show that in general (e , x , y) n ≠ (r , u , v) n. As a consequence we prove that in general it is impossible to connect the pair { (e , x) n ; (e , y) n } and the pair { (r , u) n ; (r , v) n } by a chain of pairs of symbol algebras with a common slot and isomorphic to (D 1 ; D 2) in such a way that any two neighboring pairs in the chain are obtained from one another by a "natural" transformation. In the second part of the paper we prove that in contrast to the case n = 2 for any n divisible by 4 there exist symbol algebras D 1 , D 2 with deg ⁡ D 1 = deg ⁡ D 2 = n and exp D 1 = exp D 2 = n without common slot such that i D 1 + j D 2 is a symbol algebra of degree n for any i , j ∈ Z. [ABSTRACT FROM AUTHOR]

Published

2024

22. Representability of relatively free affine algebras over a Noetherian ring.

Author

Kanel-Belov, Alexei, Rowen, Louis, and Vishne, Uzi

Subjects

*NOETHERIAN rings, *ASSOCIATIVE rings, *REPRESENTATIONS of groups (Algebra), *HOMOGENEOUS polynomials, *FINITE rings, *NONASSOCIATIVE algebras, *ALGEBRA, *AFFINE algebraic groups, *GROBNER bases

Abstract

Over the years questions have arisen about T-ideals of (noncommutative) polynomials. But when evaluating a noncentral polynomial in subalgebras of matrices, one often has little control in determining the specific evaluations of the polynomial. One way of overcoming this difficulty in characteristic 0, is to reduce to multilinear polynomials and to utilize the representation theory of the symmetric group. But this technique is unavailable in characteristic p > 0. An alternative method, which succeeds, is the process of "hiking" a polynomial, in which one specializes its indeterminates in several stages, to obtain a polynomial in which Capelli polynomial is embedded, in order to get control on its evaluations. This method was utilized on homogeneous polynomials in the proof of Specht's conjecture for affine algebras over fields of positive characteristic. In this paper, we develop hiking further to nonhomogeneous polynomials, to apply to the "representability question." Kemer proved in 1988 that every affine relatively free PI algebra over an infinite field, is representable. In 2010, the first author of this paper proved more generally that every affine relatively free PI algebra over any commutative Noetherian unital ring is representable [A. Belov, Local finite basis property and local representability of varieties of associative rings, Izv. Russian Acad. Sci. (1) (2010) 3–134. English Translation Izv. Math. 74(1) (2010) 1–126]. We present a different, complete, proof, based on hiking nonhomogeneous polynomials, over finite fields. We then obtain the full result over a Noetherian commutative ring, using Noetherian induction on T-ideals. The bulk of the proof is for the case of a base field of positive characteristic. Here, whereas the usage of hiking is more direct than in proving Specht's conjecture, one must consider nonhomogeneous polynomials when the base ring is finite, which entails certain difficulties to be overcome. In Appendix A, we show how hiking can be adapted to prove the involutory versions, as well as various graded and nonassociative theorems. [ABSTRACT FROM AUTHOR]

Published

2024

23. Transposed Poisson structures on Lie incidence algebras.

Author

Kaygorodov, Ivan and Khrypchenko, Mykola

Subjects

*LIE algebras, *POISSON algebras, *COMMUTATION (Electricity), *ALGEBRA

Abstract

Let X be a finite connected poset, K a field of characteristic zero and I (X , K) the incidence algebra of X over K seen as a Lie algebra under the commutator product. In the first part of the paper we show that any 1 2 -derivation of I (X , K) decomposes into the sum of a central-valued 1 2 -derivation, an inner 1 2 -derivation and a 1 2 -derivation associated with a map σ : X < 2 → K that is constant on chains and cycles in X. In the second part of the paper we use this result to prove that any transposed Poisson structure on I (X , K) is the sum of a structure of Poisson type, a mutational structure and a structure determined by λ : X e 2 → K , where X e 2 is the set of (x , y) ∈ X 2 such that x < y is a maximal chain not contained in a cycle. [ABSTRACT FROM AUTHOR]

Published

2024

24. Derivations, extensions, and rigidity of subalgebras of the Witt algebra.

Author

Buzaglo, Lucas

Subjects

*ABSTRACT algebra, *ALGEBRA, *C*-algebras, *FINITE differences, *LIE algebras

Abstract

Let k be an algebraically closed field of characteristic 0. We study some cohomological properties of Lie subalgebras of the Witt algebra W = Der (k [ t , t − 1 ]) and the one-sided Witt algebra W ≥ − 1 = Der (k [ t ]). In the first part of the paper, we consider finite codimension subalgebras of W ≥ − 1. We compute derivations and one-dimensional extensions of such subalgebras. These correspond to Ext U (L) 1 (M , L) , where L is a subalgebra of W ≥ − 1 and M is a one-dimensional representation of L. We find that these subalgebras exhibit a kind of rigidity: their derivations and extensions are controlled by the full one-sided Witt algebra. As an application of these computations, we prove that any isomorphism between finite codimension subalgebras of W ≥ − 1 extends to an automorphism of W ≥ − 1. The second part of the paper is devoted to explaining the observed rigidity. We define a notion of "completely non-split extension" and prove that W ≥ − 1 is the universal completely non-split extension of any of its subalgebras of finite codimension. In some sense, this means that even when studying subalgebras of W ≥ − 1 as abstract Lie algebras, they remember that they are contained in W ≥ − 1. We also consider subalgebras of infinite codimension, explaining the similarities and differences between the finite and infinite codimension situations. Almost all of the results above are also true for subalgebras of the Witt algebra. We summarise results for W at the end of the paper. [ABSTRACT FROM AUTHOR]

Published

2024

25. Solution of Exponential Diophantine Equation nx + 43y = z², where n ≡ 2 (mod 129) and n + 1 is not a Perfect Square.

Author

Aggarwal, S. and Shahida, A. T.

Subjects

*DIOPHANTINE equations, *TRIGONOMETRY, *RESEARCH personnel, *ALGEBRA, *INTEGERS, *ASTROLOGY, *CATALAN numbers

Abstract

Nowadays, researchers are very interested in studying various Diophantine equations due to their importance in Cryptography, Chemistry, Knot Theory, Astronomy, Geometry, Trigonometry, Biology, Algebra, Electrical Engineering, Economics, and Astrology. The present paper is about the non-negative integer solution of the exponential Diophantine equation nx + 43y = z², where are non-negative integers, is a positive integer with nx + 43y = z², where n = 2 (mod 129) and n + 1 and is not a perfect square. The authors use the famous Catalan conjecture for this purpose. Results of the present paper indicate that 2, 3, 0, and 3 are the only required values of and respectively, that satisfy the exponential Diophantine equation, where are non-negative integers, is a positive integer with nx + 43y = z², where n = 2 (mod 129) and n + 1 and is not a perfect square. The present technique of this paper proposes a new approach to solving the Diophantine equations, which is the main scientific contribution of this study, and it is very beneficial, especially for researchers, scholars, academicians, and people interested in the same field. [ABSTRACT FROM AUTHOR]

Published

2024

26. Airy Ideals, Transvections, and W(sp2N)-Algebras.

Author

Bouchard, Vincent, Creutzig, Thomas, and Joshi, Aniket

Subjects

*IDEALS (Algebra), *ALGEBRA, *STRUCTURAL analysis (Engineering), *MATHEMATICS

Abstract

In the first part of the paper, we propose a different viewpoint on the theory of higher Airy structures (or Airy ideals), which may shed light on its origin. We define Airy ideals in the ħ -adic completion of the Rees Weyl algebra and show that Airy ideals are defined exactly such that they are always related to the canonical left ideal generated by derivatives by automorphisms of the Rees Weyl algebra of a simple type, which we call transvections. The standard existence and uniqueness result in the theory of Airy structures then follow immediately. In the second part of the paper, we construct Airy ideals generated by the nonnegative modes of the strong generators of the principal W -algebra of sp 2 N at level - N - 1 / 2 , following the approach developed in Borot et al. (Mem Am Math Soc, 2021). This provides an example of an Airy ideal in the Heisenberg algebra that requires realizing the zero modes as derivatives instead of variables, which leads to an interesting interpretation for the resulting partition function. [ABSTRACT FROM AUTHOR]

Published

2024

27. Evaluation of university scientific research ability based on the output of sci-tech papers: A D-AHP approach.

Author

Zong, Fan and Wang, Lifang

Subjects

*SCIENTIFIC ability, *PSYCHOMETRICS, *PSYCHOPHARMACOLOGY, *UNIVERSITY research

Abstract

University scientific research ability is an important indicator to express the strength of universities. In this paper, the evaluation of university scientific research ability is investigated based on the output of sci-tech papers. Four university alliances from North America, UK, Australia, and China, are selected as the case study of the university scientific research evaluation. Data coming from Thomson Reuters InCites are collected to support the evaluation. The work has contributed new framework to the issue of university scientific research ability evaluation. At first, we have established a hierarchical structure to show the factors that impact the evaluation of university scientific research ability. Then, a new MCDM method called D-AHP model is used to implement the evaluation and ranking of different university alliances, in which a data-driven approach is proposed to automatically generate the D numbers preference relations. Next, a sensitivity analysis has been given to show the impact of weights of factors and sub-factors on the evaluation result. At last, the results obtained by using different methods are compared and discussed to verify the effectiveness and reasonability of this study, and some suggestions are given to promote China’s scientific research ability. [ABSTRACT FROM AUTHOR]

Published

2017

28. Products of infinite upper triangular quadratic matrices.

Author

Bien, M.H., Tam, V.M., Tri, D.C.M., and Truong, L.Q.

Subjects

*MATRIX decomposition, *ALGEBRA, *POLYNOMIALS, *MATRICES (Mathematics)

Abstract

Let F be a field and q (x) a quadratic polynomial in F [ x ] with q (0) ≠ 0. We denote by T ∞ (F) the algebra of all infinite upper triangular matrices over the field F. A matrix A ∈ T ∞ (F) is called a quadratic matrix with respect to q (x) if q (A) = 0. In this paper, we first investigate the subgroup in T ∞ (F) generated by all quadratic matrices with respect to q (x) and then present some applications. [ABSTRACT FROM AUTHOR]

Published

2024

29. Integral closure of an affine algebra.

Author

Chang, Gyu Whan and Kang, Byung Gyun

Subjects

*PRIME ideals, *RING theory, *COMMUTATIVE rings, *ALGEBRA, *INTEGERS

Abstract

AbstractLet R be a commutative ring with identity and R′ be the integral closure of R. In this paper, we show that if R is an affine algebra over a field K, then every regular ideal of R′ is finitely generated, i.e., R′ is an r-Noetherian ring. We also study when the integral closure of an affine algebra is Noetherian. First we show that if R is a Krull ring such that R/P is a Noetherian domain for each minimal regular prime ideal P of R, then R is an r-Noetherian ring, which is a generalization of Nishimura’s result. As an application of this result, we prove that if R is an r-Noetherian ring with reg-dim R≤2 , then R′ is an r-Noetherian ring. We finally construct a couple of r-Noetherian rings, e.g., an r-Noetherian ring R that is not Noetherian and reg-dim R=∞ or reg-dim R=n≤ dim R=n+m−1 for arbitrary positive integers n, m. [ABSTRACT FROM AUTHOR]

Published

2024

30. The classification of nilpotent Bol algebras.

Author

Abdelwahab, Hani, Calderón, Antonio J., and Ouaridi, Amir Fernández

Subjects

*ALGEBRA, *NILPOTENT Lie groups, *CLASSIFICATION

Abstract

AbstractIn this paper, we generalize the classical method used to classify nilpotent low-dimensional Lie algebras to serve for nilpotent Bol algebras. The algebraic classification of the nilpotent Bol algebras up to dimension four is given. [ABSTRACT FROM AUTHOR]

Published

2024

31. Characterizations of additive local Jordan *-derivations by action at idempotents.

Author

Qi, Xiaofei, Xu, Bing, and Hou, Jinchuan

Subjects

*LINEAR operators, *IDEMPOTENTS, *ALGEBRA, *ADDITIVES

Abstract

Let H be a real or complex Hilbert space and $ {\mathcal B}(H) $ B (H) the algebra of all bounded linear operators on H. Recall that a map $ \delta :{\mathcal B}(H)\to {\mathcal B}(H) $ δ : B (H) → B (H) is called an inner Jordan $ * $ ∗ -derivation if there exists some $ T\in \mathcal B(H) $ T ∈ B (H) such that $ \delta (A)=AT-TA^* $ δ (A) = AT − T A ∗ for all $ A\in {\mathcal B}(H) $ A ∈ B (H). In this paper, it is proved that inner Jordan $ * $ ∗ -derivations are the only additive maps δ of $ {\mathcal B}(H) $ B (H) with the property that $ \delta (P)=\delta (P)P^*+P\delta (P) $ δ (P) = δ (P) P ∗ + Pδ (P) for all idempotent operators $ P\in {\mathcal B}(H) $ P ∈ B (H) if $ \dim H=\infty $ dim ⁡ H = ∞ , which is satisfied by additive local Jordan $ * $ ∗ -derivations. For the finite dimensional case, additional conditions are required for δ to be an inner Jordan $ * $ ∗ -derivation. As applications, it is shown that, for any given $ C,D\in {\mathcal B}(H) $ C , D ∈ B (H) , δ satisfies $ \delta (A)B^*+B\delta (A)+\delta (B)A^*+A\delta (B)=D $ δ (A) B ∗ + Bδ (A) + δ (B) A ∗ + Aδ (B) = D for all $ A,B\in {\mathcal B}(H) $ A , B ∈ B (H) with AB + BA = C if and only if δ is an inner Jordan $ * $ ∗ -derivation and $ D=\delta (C) $ D = δ (C). Also, several known results are generalized. [ABSTRACT FROM AUTHOR]

Published

2024

32. Lattice points on polyominoes of inversion sequences.

Author

Herrera, José L., Mansour, Toufik, and Ramírez, J.L.

Subjects

*GENERATING functions, *BIJECTIONS, *PERMUTATIONS, *ALGEBRA, *INTEGERS

Abstract

AbstractInversion sequences of length n are positive integer sequences e1 e2 …en such that 1 ≤ ei ≤ i for all 1 ≤ i ≤ n. These sequences are in bijection with the permutations of [n]. This paper focuses on the polyomino or barpgraph representation of the inversion sequences. More precisely, we study the distribution of lattice points on these polyominoes. We find the generating functions respect to the length, the number of interior vertices, corners, and vertices of a given degree. We also give simple explicit formulas for the total values of these parameters over all polyominoes of inversion sequences of length n. Throughout this work, we use symbolic computer algebra to facilitate the computations. [ABSTRACT FROM AUTHOR]

Published

2024

33. Detecting nontrivial products in the stable homotopy ring of spheres via the third Morava stabilizer algebra.

Author

Wang, Xiangjun, Wu, Jianqiu, Zhang, Yu, and Zhong, Linan

Subjects

*PRIME numbers, *ALGEBRA, *SPHERES, *FAMILIES

Abstract

Let p \geq 7 be a prime number. Let S(3) denote the third Morava stabilizer algebra. In recent years, Kato-Shimomura and Gu-Wang-Wu found several families of nontrivial products in the stable homotopy ring of spheres \pi _* (S) using H^{*,*} (S(3)). In this paper, we determine all nontrivial products in \pi _* (S) of the Greek letter family elements \alpha _s, \beta _s, \gamma _s and Cohen's elements \zeta _n which are detectable by H^{*,*} (S(3)). In particular, we show \beta _1 \gamma _s \zeta _n \neq 0 \in \pi _*(S), if n \equiv 2 mod 3, s \not \equiv 0, \pm 1 mod p. [ABSTRACT FROM AUTHOR]

Published

2024

34. Classical freeness of orthosymplectic affine vertex superalgebras.

Author

Creutzig, Thomas, Linshaw, Andrew R., and Song, Bailin

Subjects

*SUPERALGEBRAS, *MATHEMATICAL physics, *ALGEBRA, *INTEGERS, *MATHEMATICS

Abstract

The question of when a vertex algebra is a quantization of the arc space of its associated scheme has recently received a lot of attention in both the mathematics and physics literature. This property was first studied by Tomoyuki Arakawa and Anne Moreau (see their paper in the references), and was given the name \lq\lq classical freeness" by Jethro van Ekeren and Reimundo Heluani [Comm. Math. Phys. 386 (2021), no. 1, pp. 495-550] in their work on chiral homology. Later, it was extended to vertex superalgebras by Hao Li [Eur. J. Math. 7 (2021), pp. 1689–1728]. In this note, we prove the classical freeness of the simple affine vertex superalgebra L_n(\mathfrak {o}\mathfrak {s}\mathfrak {p}_{m|2r}) for all positive integers m,n,r satisfying -\frac {m}{2} + r +n+1 > 0. In particular, it holds for the rational vertex superalgebras L_n(\mathfrak {o}\mathfrak {s}\mathfrak {p}_{1|2r}) for all positive integers r,n. [ABSTRACT FROM AUTHOR]

Published

2024

35. New insights on the signature change via the Colombeau framework.

Author

Silva, J A, Carvalho, F C, and Garcia, A R G

Subjects

*EQUATIONS of state, *CONSERVATION laws (Physics), *REDSHIFT, *PHYSICAL cosmology, *ALGEBRA

Abstract

In this paper we propose a reinterpretation of the Mansouri–Nozari signature-change approach to the early Universe, in which the metric signature only occurs for t < 0 within the Euclidean regime, posing a challenge in providing coherent physical interpretations in advance. We ensure that the sign change occurs for t > 0 in the Euclidean regime. Our findings show that the energy-momentum tensor does not vanish on the signature-changing surface, even when we adopt conditions commonly used in the literature. Furthermore, we formulate a modified cosmology within the framework of signature-changing and discuss the modifications that our approach introduces to the cosmological equations. We establish a constraint relating the equation of state parameter and its singular part and we determine an effective equation of state as function of the redshift. Finally, we show that the law of conservation of matter in the modified ΛCDM model remains valid. [ABSTRACT FROM AUTHOR]

Published

2024

36. Quantum algebra of multiparameter Manin matrices.

Author

Jing, Naihuan, Liu, Yinlong, and Zhang, Jian

Subjects

*ALGEBRA, *MATRICES (Mathematics), *GENERALIZATION, *EQUATIONS, *DETERMINANTS (Mathematics)

Abstract

Multiparametric quantum semigroups M q ˆ , p ˆ (n) are generalization of the one-parameter general linear semigroups M q (n) , where q ˆ = (q i j) and p ˆ = (p i j) are 2 n 2 parameters satisfying certain conditions. In this paper, we study the algebra of multiparametric Manin matrices using the R-matrix method. The systematic approach enables us to obtain several classical identities such as Muir's identities, Newton's identities, Capelli-type identities, Cauchy-Binet's identity both for determinant and permanent as well as a rigorous proof of the MacMahon master equation for the quantum algebra of multiparametric Manin matrices. Some of the generalized identities are also lifted to multiparameter q -Yangians. [ABSTRACT FROM AUTHOR]

Published

2024

37. Representations of Smith algebras which are free over the Cartan subalgebra.

Author

Futorny, Vyacheslav, Lopes, Samuel A., and Mendonça, Eduardo M.

Subjects

*REPRESENTATIONS of algebras, *ISOMORPHISM (Mathematics), *ALGEBRA, *MULTIPLICITY (Mathematics), *POLYNOMIALS

Abstract

In this paper, we study the category of modules over the Smith algebra which are free of finite rank over the unital polynomial subalgebra generated by the Cartan element h and obtain families of such simple modules of arbitrary rank. In the case of rank one we obtain a full description of the isomorphism classes, a simplicity criterion, and an algorithm to produce all composition series. We show that all such modules have finite length and describe the composition factors and their multiplicity. [ABSTRACT FROM AUTHOR]

Published

2024

38. The [formula omitted]-symmetric down-up algebra.

Author

Terwilliger, Paul

Subjects

*QUANTUM groups, *KAC-Moody algebras, *ALGEBRA, *LIE algebras, *NONCOMMUTATIVE algebras

Abstract

In 1998, Georgia Benkart and Tom Roby introduced the down-up algebra A. The algebra A is associative, noncommutative, and infinite-dimensional. It is defined by two generators A , B and two relations called the down-up relations. In the present paper, we introduce the Z 3 -symmetric down-up algebra A. We define A by generators and relations. There are three generators A , B , C and any two of these satisfy the down-up relations. We describe how A is related to some familiar algebras in the literature, such as the Weyl algebra, the Lie algebras sl 2 and sl 3 , the sl 3 loop algebra, the Kac-Moody Lie algebra A 2 (1) , the q -Weyl algebra, the quantized enveloping algebra U q (sl 2) , and the quantized enveloping algebra U q (A 2 (1)). We give some open problems and conjectures. [ABSTRACT FROM AUTHOR]

Published

2024

39. Pentapartitioned Neutrosophic Subtraction Algebra.

Author

Das, Rakhal and Das, Suman

Subjects

*ALGEBRA

Abstract

This paper aims to define the concepts of Semi-group and Pentapartitioned Neutrosophic Subtraction Algebra. We also examine a few of their fundamental characteristics. Additionally, we provide a few appropriate instances on Pentapartitioned Neutrosophic Subtraction Algebra. [ABSTRACT FROM AUTHOR]

Published

2024

40. On The Special Gamma Function Over The Complex Two-Fold Algebras.

Author

Salman, Nabil Khuder

Subjects

*SPECIAL functions, *ALGEBRA, *MATHEMATICAL analysis, *MATHEMATICAL physics, *GAMMA functions, *COMPLEX numbers

Abstract

The concept of special functions plays an important role in mathematical analysis and physics as well. In this paper, we study some different types of the special Gamma function defined on the two-fold fuzzy complex field, where we combine the classical Gamma function with the two-fold fuzzy algebra defined on complex numbers. On the other hand, many elementary properties of this new special function will be determined in terms of theorems and proofs. [ABSTRACT FROM AUTHOR]

Published

2024

41. On The Two-Fold Fuzzy n-Refined Neutrosophic Rings For 2 ≤ n ≤ 3.

Author

Shihadeh, Abdallah, Mohammad Matarneh, Khaled Ahmad, Hatamleh, Raed, Omar Al-Qadri, Mowafaq, and Al-Husban, Abdallah

Subjects

*IDEMPOTENTS, *ALGEBRA

Abstract

The objective of this paper is to study the two-fold fuzzy algebra based on n-refined neutrosophic rings for some different special values of n, where we study some of the special elements in the case of two-fold 2-refined neutrosophic ring and 3-refined neutrosophic rings such as units, idempotents, and nilpotent elements. Also, we present the concept of two-fold ring homomorphism with its elementary properties. [ABSTRACT FROM AUTHOR]

Published

2024

42. The Terwilliger algebras of the group association schemes of three metacyclic groups.

Author

Yang, Jing, Zhang, Xiaoqian, and Feng, Lihua

Subjects

*GROUP algebras, *REPRESENTATIONS of algebras, *FINITE groups, *ALGEBRA, *PERMUTATION groups

Abstract

For any finite group G, the Terwilliger algebra T(G) of the group association scheme satisfies the following inclusions: T0(G)⊆T(G)⊆T˜(G), where T0(G) is a specific vector space and T˜(G) is the centralizer algebra of the permutation representation of G induced by the action of conjugation. The group G is said to be triply transitive if T0(G)=T˜(G). In this paper, we determine the dimensions of T0(G) and T˜(G) for G being Tn,k=〈a,b∣a2n=1,an=b2,bab−1=ak〉, Cn⋊Cp and Cp⋊Cn, and show that Tn,k,Cn⋊C2 and C3⋊C2n are triply transitive. Additionally, we give a complete characterization of the Wedderburn components of the Terwilliger algebras of Tn,k, Cn⋊Cp and Cp⋊Cn when they are triply transitive. [ABSTRACT FROM AUTHOR]

Published

2024

43. Commutative Poisson algebras from deformations of noncommutative algebras.

Author

Mikhailov, Alexander V. and Vanhaecke, Pol

Subjects

*COMMUTATIVE algebra, *POISSON algebras, *POISSON brackets, *MODULES (Algebra), *ALGEBRA, *NONCOMMUTATIVE algebras

Abstract

It is well-known that a formal deformation of a commutative algebra A leads to a Poisson bracket on A and that the classical limit of a derivation on the deformation leads to a derivation on A , which is Hamiltonian with respect to the Poisson bracket. In this paper we present a generalization of it for formal deformations of an arbitrary noncommutative algebra A . The deformation leads in this case to a Poisson algebra structure on Π (A) : = Z (A) × (A / Z (A)) and to the structure of a Π (A) -Poisson module on A . The limiting derivations are then still derivations of A , but with the Hamiltonian belong to Π (A) , rather than to A . We illustrate our construction with several cases of formal deformations, coming from known quantum algebras, such as the ones associated with the nonabelian Volterra chains, Kontsevich integrable map, the quantum plane and the quantized Grassmann algebra. [ABSTRACT FROM AUTHOR]

Published

2024

44. Characterizations of derivations on incidence algebras by local actions.

Author

Chen, Lizhen and Xiao, Zhankui

Subjects

*COMMUTATIVE rings, *LINEAR operators, *ALGEBRA

Abstract

Let (X , ≤) be a locally finite pre-ordered set and R be a commutative ring with unity. In this paper we apply the theory of zero product determined algebras to show that each linear map on the incidence algebra I (X , R) which is derivable at zero is a generalized derivation and every local derivation on I (X , R) is a derivation. [ABSTRACT FROM AUTHOR]

Published

2024

45. On the tropical two-sided discrete logarithm and a key exchange protocol based on the tropical algebra of pairs.

Author

Alhussaini, Sulaiman, Collett, Craig, and Sergeev, Sergeĭ

Subjects

*PUBLIC key cryptography, *LOGARITHMS, *ALGEBRA, *POLYNOMIALS, *GENERALIZATION

Abstract

Since the existing tropical cryptographic protocols are either susceptible to the Kotov-Ushakov attack and its generalization, or to attacks based on tropical matrix periodicity and predictive behavior, several attempts have been made to propose protocols that resist such attacks. Despite these attempts, many of the proposed protocols remain vulnerable to attacks targeting the underlying hidden problems, one of which we call the tropical two-sided discrete logarithm with shift. An illustrative case is the tropical Stickel protocol, which, when formulated with a single monomial instead of a polynomial, becomes susceptible to attacks based on solutions of the above mentioned tropical version of discrete logarithm. In this paper we will formally introduce the tropical two-sided discrete logarithm with shift, discuss how it is solved, and subsequently demonstrate an attack on a key exchange protocol based on the tropical semiring of pairs. This particular protocol is compromised due to the existence of efficient (albeit heuristic) solution of the tropical two-sided logarithm problem, and this highlights the ongoing challenges in search of a "good" key exchange protocol in tropical cryptography. [ABSTRACT FROM AUTHOR]

Published

2024

46. Whittaker modules for a subalgebra of N = 2 superconformal algebra.

Author

Jing, Naihuan, Xu, Pengfa, and Zhang, Honglian

Subjects

*MODULES (Algebra), *ALGEBRA

Abstract

In this paper, Whittaker modules are studied for a subalgebra q ϵ of the N =2 superconformal algebra. The Whittaker modules are classified by central characters. Additionally, criteria for the irreducibility of the Whittaker modules are given. [ABSTRACT FROM AUTHOR]

Published

2024

47. On superalgebras with pseudoautomorphism of polynomial codimension growth.

Author

Giordani, Ginevra

Subjects

*GROUP algebras, *ALGEBRA, *SUPERALGEBRAS, *POLYNOMIALS, *MATRICES (Mathematics)

Abstract

Let A be an associative superalgebra endowed with a pseudoautomorphism p. In this paper we generalize the Wedderburn-Malcev Theorem in this setting and we prove that the sequence of p-codimensions of A is polynomially bounded if and only if the variety generated by A does not contain the group algebra of Z 2 and the algebra of 2 × 2 upper-triangular matrices with suitable pseudoautomorphisms. [ABSTRACT FROM AUTHOR]

Published

2024

48. Noncommutative Vieta theorem in Clifford geometric algebras.

Author

Shirokov, Dmitry

Subjects

*COMPUTER vision, *COMPUTER science, *ALGEBRA, *POLYNOMIALS, *EIGENVALUES

Abstract

In this paper, we discuss a generalization of Vieta theorem (Vieta's formulas) to the case of Clifford geometric algebras. We compare the generalized Vieta formulas with the ordinary Vieta formulas for characteristic polynomial containing eigenvalues. We discuss Gelfand–Retakh noncommutative Vieta theorem and use it for the case of geometric algebras of small dimensions. We introduce the notion of a simple basis‐free formula for a determinant in geometric algebra and prove that a formula of this type exists in the case of arbitrary dimension. Using this notion, we present and prove generalized Vieta theorem in geometric algebra of arbitrary dimension. The results can be used in symbolic computation and various applications of geometric algebras in computer science, computer graphics, computer vision, physics, and engineering. [ABSTRACT FROM AUTHOR]

Published

2024

49. A Hermitian refinement of symplectic Clifford analysis.

Author

Eelbode, David and Muarem, Guner

Subjects

*DIRAC operators, *SYMPLECTIC manifolds, *SPINORS, *ALGEBRA, *POLYNOMIALS

Abstract

In this paper, we develop the Hermitian refinement of symplectic Clifford analysis, by introducing a complex structure 핁 on the canonical symplectic manifold (ℝ2n,ω0)$$ \left({\mathrm{\mathbb{R}}}^{2n},{\omega}_0\right) $$. This gives rise to two symplectic Dirac operators Ds$$ {D}_s $$ and Dt$$ {D}_t $$ (in the sense of Habermann), leading to a u(n)$$ \mathfrak{u}(n) $$‐invariant system of equations on ℝ2n$$ {\mathrm{\mathbb{R}}}^{2n} $$. We discuss the solution space for this system, culminating in a Fischer decomposition for the space of (harmonic) polynomials on ℝ2n$$ {\mathrm{\mathbb{R}}}^{2n} $$ with values in the symplectic spinors. To make this decomposition explicit, we will construct the associated embedding factors using a transvector algebra. [ABSTRACT FROM AUTHOR]

Published

2024

50. Twisted 풪-operator families on Leibniz algebras and NS-Leibniz family algebras.

Author

Liu, Linlin and Zheng, Huihui

Subjects

*SEMIGROUP algebras, *TENSOR algebra, *TENSOR products, *ALGEBRA, *FAMILIES

Abstract

In this paper, we first define twisted 풪-operator families on Leibniz algebras indexed by a semigroup Ω. Then we introduce and study NS-Leibniz family algebras as the underlying structures of twisted 풪-operator families. We show that an NS-Leibniz family algebra induces an ordinary NS-Leibniz algebra on the tensor product with the semigroup algebra. Finally, we investigate the cohomology of a twisted 풪-operator family. This cohomology can also be seen as the cohomology of a certain Ω-Leibniz algebra with coefficients in a suitable representation. As an application, we study the formal deformations of twisted 풪-operator families on Leibniz algebras. [ABSTRACT FROM AUTHOR]

Published

2024