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2. Whittaker modules for the N=1 super-BMS3 algebra.
- Author
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Dilxat, Munayim, Gao, Shoulan, and Liu, Dong
- Subjects
ALGEBRA - Abstract
This paper is devoted to defining and studying Whittaker modules and high order Whittaker modules for the N = 1 super-BMS
3 algebra. We also classify the simple Whittaker modules and obtain the necessary and sufficient conditions for the irreducibility of these modules. [ABSTRACT FROM AUTHOR]- Published
- 2024
- Full Text
- View/download PDF
3. Left and right-Drazin inverses in rings and operator algebras.
- Author
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Ren, Yanxun and Jiang, Lining
- Subjects
VON Neumann algebras ,RING theory ,OPERATOR algebras ,FREDHOLM operators ,ALGEBRA - Abstract
The paper introduces the left and right versions of the large class of Drazin inverses in terms of the left and right annihilators in a ring, which are called left-Drazin and right-Drazin inverses. We characterize some basic properties of these one-sided Drazin inverses, and discuss Jacobson's lemma for them. In addition, the relation between the Drazin inverses and these two one-sided inverses is given by means of the spectrum and the operator decomposition. As an application, the left-Drazin and right-Drazin invertibilities in the Calkin algebra are investigated. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
4. Comment on: "Bi-interior ideals of semigroups".
- Author
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Kehayopulu, Niovi
- Subjects
ALGEBRA ,MATHEMATICS - Abstract
This is about the paper "Bi-interior ideals of semigroups" by M. Murali Krishna Rao in Discuss. Math. Gen. Algebra Appl. 38 (2018) 69–78. According to Theorem 3.11 (also Theorem 3.3(8)) of the paper, the intersection of a bi-interior ideal B of a semigroup M and a subsemigroup A of M is a bi-interior ideal of M. Regarding to Theorem 3.6, every bi-interior ideal of a regular semigroup is an ideal of M. We give an example that the above two results are not true for semigroups. According to the same paper, if M is a regular semigroup then, for every bi-interior ideal B , every ideal I and every left ideal L of S , we have B ∩ I ∩ L ⊆ B I L. The proof is wrong, we provide the corrected proof. In most of the results of the paper the assumption of unity is not necessary. Care should be taken about the proofs in the paper. [ABSTRACT FROM AUTHOR]
- Published
- 2022
- Full Text
- View/download PDF
5. Efficient generation of ideals over a certain monoid algebra.
- Author
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Mallick, Provanjan and Zinna, Md. Ali
- Subjects
ALGEBRA ,MONOIDS - Abstract
Let R be a ring of dimension d ≥ 1 containing ℚ and A = R [ X , Y , Z , W ] (X Y − Z W) . This paper examines the question of efficient generation of ideals in A. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
6. Reverse ∗-Jordan type maps on Jordan ∗-algebras.
- Author
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Ferreira, Ruth N., Ferreira, Bruno L. M., Costa, Bruno Tadeu, and da Silva, Andre Vanderlinde
- Subjects
ASSOCIATIVE algebras ,JORDAN algebras ,ALGEBRA - Abstract
Let and ′ be two ∗-Jordan algebras with identities I and I ′ , respectively, and e a nontrivial ∗-idempotent in . In this paper, we study the characterization of multiplicative ∗-Jordan-type maps. In particular, we provide a characterization in the case of unital prime associative algebra endowed with an involution. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
7. Representability of relatively free affine algebras over a Noetherian ring.
- Author
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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
- Full Text
- View/download PDF
8. Primitive idempotents in a semisimple ring.
- Author
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Singh, Inderjit, Kumar, Pankaj, and Sangwan, Monika
- Subjects
IDEMPOTENTS ,CYCLIC codes ,FINITE fields ,ALGEBRA - Abstract
Let p 1 , p 2 , ... , p r , q be distinct primes, q odd. Let m = ∏ i = 1 r p i , where r ≥ 2 be an integer. In this paper, it is observed that the explicit expressions of primitive idempotents from R p i are sufficient to compute the explicit expressions of primitive idempotent in semisimple ring R m = F q [ x ] / (x m − 1). It is also shown that the results obtained in [A. Sahni and P. T. Sehgal, Minimal cyclic codes of length p n q , Finite Fields Appl. 18(5) (2012) 1017–1036; P. Kumar and S. K. Arora, λ -mapping and primitive idempotents in semisimple ring ℜ m , Comm. Algebra 41(10) (2013) 3679–3694] are simple corollaries to the results obtained in the paper. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
9. A note on relative Vaserstein symbol.
- Author
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Chakraborty, Kuntal
- Subjects
INJECTIVE functions ,UNPUBLISHED materials ,SIGNS & symbols ,SYMPLECTIC groups ,ALGEBRA - Abstract
In an unpublished work of Fasel–Rao–Swan the notion of the relative Witt group W E (R , I) is defined. In this paper, we will give the details of this construction. Then we study the injectivity of the relative Vaserstein symbol V R , I : U m 3 (R , I) / E 3 (R , I) → W E (R , I). We establish injectivity of this symbol if R is a non-singular affine algebra of dimension 3 over a perfect C 1 -field and I is a local complete intersection ideal of R. It is natural to ask whether the Vaserstein symbol is injective for a singular 3-dimensional affine algebra. At the end of the paper, we will give an example of a singular 3-dimensional algebra over a perfect C 1 -field for which the Vaserstein symbol is injective. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
10. Decomposable groups with exactly two nonlinear non-faithful irreducible characters.
- Author
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Li, Yali and Meng, Qingyun
- Subjects
NILPOTENT groups ,FINITE groups ,SOLVABLE groups ,ALGEBRA ,INDECOMPOSABLE modules - Abstract
In [Finite solvable groups with exactly two nonlinear non-faithful irreducible characters, J. Algebra Appl. 18(5) (2019) 1950091], the first author studied directly indecomposable, solvable groups with exactly two nonlinear non-faithful irreducible characters. In this paper, we study the decomposable case and give a classification of decomposable groups possessing exactly two nonlinear non-faithful irreducible characters. In particular, nilpotent groups with this property are also classified. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
11. Images of ideals under derivations and ℰ-derivations of univariate polynomial algebras over a field of characteristic zero.
- Author
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Zhao, Wenhua
- Subjects
ALGEBRA ,POLYNOMIALS ,BERNOULLI numbers ,BERNOULLI polynomials ,ENDOMORPHISMS - Abstract
Let K be a field of characteristic zero and x a free variable. A K - ℰ -derivation of K [ x ] is a K -linear map of the form I , − , ϕ for some K -algebra endomorphism ϕ of K [ x ] , where I denotes the identity map of K [ x ]. In this paper, we study the image of an ideal of K [ x ] under some K -derivations and K - ℰ -derivations of K [ x ]. We show that the LFED conjecture proposed in [W. Zhao, Some open problems on locally finite or locally nilpotent derivations and ℰ -derivations, Commun. Contem. Math. 20(4) (2018) 1750056] holds for all K - ℰ -derivations and all locally finite K -derivations of K [ x ]. We also show that the LNED conjecture proposed in [W. Zhao, Some open problems on locally finite or locally nilpotent derivations and ℰ -derivations, Commun. Contem. Math. 20(4) (2018) 1750056] holds for all locally nilpotent K -derivations of K [ x ] , and also for all locally nilpotent K - ℰ -derivations of K [ x ] and the ideals u K [ x ] such that either u = 0 , or deg u ≤ 1 , or u has at least one repeated root in the algebraic closure of K. As a bi-product, the homogeneous Mathieu subspaces (Mathieu–Zhao spaces) of the univariate polynomial algebra over an arbitrary field have also been classified. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
12. On induced graded simple modules over graded Steinberg algebras with applications to Leavitt path algebras.
- Author
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Loc, Nguyen Quang and Van, Nguyen Bich
- Subjects
GROUP algebras ,ALGEBRA - Abstract
For an ample groupoid and a unit x of , Steinberg constructed the induction and restriction functors between the category of modules over the Steinberg algebra A R () and the category of modules over the isotropy group algebra R x . In this paper, we prove a graded version of these functors and give a description of spectral graded simple modules over the graded Steinberg algebra A R (). As an application, the spectral simple and graded simple modules over the Leavitt path algebra L K (E) are classified. In particular, we show that many of previously known simple and graded simple L K (E) -modules, including the Chen simple modules, are induced from (ungraded or graded) simple modules over isotropy group algebras. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
13. Scalar extension Hopf algebroids.
- Author
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Stojić, Martina
- Subjects
ALGEBROIDS ,HOPF algebras ,ALGEBRA - Abstract
Given a Hopf algebra H , Brzeziński and Militaru have shown that each braided commutative Yetter–Drinfeld H -module algebra A gives rise to an associative A -bialgebroid structure on the smash product algebra A ♯ H. They also exhibited an antipode map making A ♯ H the total algebra of a Lu's Hopf algebroid over A. However, the published proof that the antipode is an antihomomorphism covers only a special case. In this paper, a complete proof of the antihomomorphism property is exhibited. Moreover, a new generalized version of the construction is provided. Its input is a compatible pair A and A op of braided commutative Yetter–Drinfeld H -module algebras, and output is a symmetric Hopf algebroid A ♯ H ≅ H ♯ A op over A. This construction does not require that the antipode of H is invertible. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
14. Graphs on groups in terms of the order of elements: A review.
- Author
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Madhumitha, S. and Naduvath, Sudev
- Subjects
ORDERED groups ,VECTOR fields ,GRAPH theory ,VECTOR spaces ,FINITE simple groups ,ALGEBRA - Abstract
Two mathematical fields that concentrate on creating and analyzing structures are algebra and graph theory. There are numerous studies linking algebraic structures like groups, rings, fields and vector spaces with graph theory. Several algebraic graphs have been defined based on the properties of the order of the group and its elements. In this paper, we systematically review the literature on such graphs to understand the research dynamics in the field. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
15. Down closed-quasi-injectivity of partially ordered acts.
- Author
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Yavari, Mahdieh
- Subjects
PARTIALLY ordered sets ,CATEGORIES (Mathematics) ,HOMOLOGICAL algebra ,MATHEMATICIANS ,ALGEBRA - Abstract
Action of a pomonoid on partially ordered sets (S -posets) has beautiful aspects in practical subjects such as automata theory, projection algebra and theoretical computer science which makes it always capture the interest of mathematicians. On the other hand, the study of different kinds of weakly injectivity (which category theory inherited from homological and commutative algebra) is an interesting subject for mathematicians. One of the important kinds of weakly injectivity is quasi-injectivity. In this paper, we study quasi-injectivity in the category of S -posets with respect to special kind of order embeddings, namely, down-closed embeddings (dc-quasi-injectivity). [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
16. Systems of divided powers in algebras of multivariate Hurwitz series.
- Author
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Pritchard, Freya L.
- Subjects
EXPONENTS ,COMMUTATIVE rings ,COMPLEX variables ,ALGEBRA ,POWER series ,CALCULUS ,SUBSTITUTIONS (Mathematics) - Abstract
In this paper, we continue the study of Hurwitz series over a commutative unital ring that was begun in [W. Keigher, On the ring of Hurwitz series, Commun. Algebra 25 (1997) 1845–1859; W. Keigher and F. Pritchard, Hurwitz series as formal functions, J. Pure Appl. Algebra 146 (2000) 291–304]. In particular, we introduce the notion of multivariate Hurwitz series. The underlying idea is that multivariate Hurwitz series are to Hurwitz series as studied in [W. Keigher, On the ring of Hurwitz series, Commun. Algebra 25 (1997) 1845–1859; W. Keigher and F. Pritchard, Hurwitz series as formal functions, J. Pure Appl. Algebra 146 (2000) 291–304] as formal power series in several indeterminates are to formal power series in only one indeterminate. The elementary aspects of the theory follow along the lines of [W. Keigher, On the ring of Hurwitz series, Commun. Algebra 25 (1997) 1845–1859; W. Keigher and F. Pritchard, Hurwitz series as formal functions, J. Pure Appl. Algebra 146 (2000) 291–304]. The treatment of substitution and divided powers introduces special problems not encountered in [W. Keigher and F. Pritchard, Hurwitz series as formal functions, J. Pure Appl. Algebra 146 (2000) 291–304] and requires special attention to subtle details. However, we are able to establish analogous results. With substitution and divided powers in place, we construct and study the analog to the so called inner transformations of [S. Bochner and W. T. Martin, Several Complex Variables (Princeton University Press, 1948)]. Finally, we are able to establish analogs to many of the fundamental results of single and multivariate calculus. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
17. λ-TD algebras, generalized shuffle products and left counital Hopf algebras.
- Author
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Luo, Hengyi and Zheng, Shanghua
- Subjects
HOPF algebras ,ALGEBRA ,COMMUTATIVE algebra ,LINEAR operators ,MATHEMATICAL physics - Abstract
Operated algebras, that is, algebras equipped with linear operators, have important applications in mathematics and physics. Two primary instances of operated algebras are the Rota–Baxter algebra and TD-algebra. In this paper, we introduce a λ -TD algebra that includes both the Rota–Baxter algebra and the TD-algebra. The explicit construction of free commutative λ -TD algebra on a commutative algebra is obtained by a generalized shuffle product, called the λ -TD shuffle product. We then show that the free commutative λ -TD algebra possesses a left counital bialgebra structure by means of a suitable 1-cocycle condition. Furthermore, the classical result that every connected filtered bialgebra is a Hopf algebra, is extended to the context of left counital bialgebras. Given this result, we finally prove that the left counital bialgebra on the free commutative λ -TD algebra is connected and filtered, and thus is a left counital Hopf algebra. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
18. Siegel Eisenstein series of level two and its applications.
- Author
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Li, Ding and Zhou, Haigang
- Subjects
EISENSTEIN series ,DIOPHANTINE equations ,GENERATING functions ,ALGEBRA ,QUADRATIC forms ,MODULAR forms - Abstract
In this paper, we construct a holomorphic Siegel modular form of weight 2 and level 2, and compute its Fourier coefficients explicitly. Moreover, we prove that this modular form equals the generating function of the representative number ρ (n , m , r) associated with the maximal order in the quaternion algebra (− 1 , − 1) ℚ . As a corollary, we can give a new proof of the famous formula for the sums of three squares. As applications, we give an explicit formula for the numbers of solutions of two systems of Diophantine equations related with Sun's "1-3-5 conjecture". Furthermore, we show that "a perfect square" in the integral condition version of Sun's conjecture can be replaced by "a power of 4". [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
19. Strongly compact cardinals and ordinal definability.
- Author
-
Goldberg, Gabriel
- Subjects
AXIOMS ,LOGICAL prediction ,ALGEBRA - Abstract
This paper explores several topics related to Woodin's HOD conjecture. We improve the large cardinal hypothesis of Woodin's HOD dichotomy theorem from an extendible cardinal to a strongly compact cardinal. We show that assuming there is a strongly compact cardinal and the HOD hypothesis holds, there is no elementary embedding from HOD to HOD, settling a question of Woodin. We show that the HOD hypothesis is equivalent to a uniqueness property of elementary embeddings of levels of the cumulative hierarchy. We prove that the HOD hypothesis holds if and only if every regular cardinal above the first strongly compact cardinal carries an ordinal definable ω -Jónsson algebra. We show that if the HOD hypothesis holds and HOD satisfies the Ultrapower Axiom, then every supercompact cardinal is supercompact in HOD. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
20. Derivations of quantum and involution generalized Weyl algebras.
- Author
-
Kitchin, Andrew P.
- Subjects
FACTORS (Algebra) ,GROUP algebras ,ALGEBRA ,POLYNOMIAL rings ,INFINITE groups ,GENERATORS of groups ,LAURENT series - Abstract
In this paper, we classify the derivations of degree-one generalized Weyl algebras over a univariate Laurent polynomial ring. In particular, our results cover the Weyl–Hayashi algebra, a quantization of the first Weyl algebra arising as a primitive factor algebra of U q + ( 5) , and a family of algebras which localize to the group algebra of the infinite group with generators x and y , subject to the relation x y = y − 1 x. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
21. The Kauffman bracket skein module of the lens spaces via unoriented braids.
- Author
-
Diamantis, Ioannis
- Subjects
KNOT theory ,BRAID group (Knot theory) ,TORUS ,ALGEBRA ,HECKE algebras ,EQUATIONS - Abstract
In this paper, we develop a braid theoretic approach for computing the Kauffman bracket skein module of the lens spaces L (p , q) , KBSM(L (p , q)), for q ≠ 0. For doing this, we introduce a new concept, that of an unoriented braid. Unoriented braids are obtained from standard braids by ignoring the natural top-to-bottom orientation of the strands. We first define the generalized Temperley–Lieb algebra of type B, TL 1 , n , which is related to the knot theory of the solid torus ST, and we obtain the universal Kauffman bracket-type invariant, V , for knots and links in ST, via a unique Markov trace constructed on TL 1 , n . The universal invariant V is equivalent to the KBSM(ST). For passing now to the KBSM(L (p , q)), we impose on V relations coming from the band moves (or slide moves), that is, moves that reflect isotopy in L (p , q) but not in ST, and which reflect the surgery description of L (p , q) , obtaining thus, an infinite system of equations. By construction, solving this infinite system of equations is equivalent to computing KBSM(L (p , q)). We first present the solution for the case q = 1 , which corresponds to obtaining a new basis, ℬ p , for KBSM(L (p , 1)) with (⌊ p / 2 ⌋ + 1) elements. We note that the basis ℬ p is different from the one obtained by Hoste and Przytycki. For dealing with the complexity of the infinite system for the case q > 1 , we first show how the new basis ℬ p of KBSM(L (p , 1)) can be obtained using a diagrammatic approach based on unoriented braids, and we finally extend our result to the case q > 1. The advantage of the braid theoretic approach that we propose for computing skein modules of c.c.o. 3-manifolds, is that the use of braids provides more control on the isotopies of knots and links in the manifolds, and much of the diagrammatic complexity is absorbed into the proofs of the algebraic statements. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
22. Unimodular rows over affine algebras over algebraic closure of a finite field.
- Author
-
Sharma, Sampat
- Subjects
ALGEBRA ,AFFINE algebraic groups - Abstract
In this paper, we prove that if R is an affine algebra of dimension d ≥ 4 over ¯ p and 1 / (d − 1) ! ∈ R , then any unimodular row over R of length d can be mapped to a factorial row by elementary transformations. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
23. Borel subalgebras of restricted Cartan -Type Lie algebras.
- Author
-
Ou, Ke and Shu, Bin
- Subjects
LIE algebras ,WESTERN countries ,REPRESENTATION theory ,C*-algebras ,BOREL sets ,CONJUGACY classes ,ALGEBRA - Abstract
It is still an open problem to determine the conjugacy classes of Borel subalgebras of non-classical type Lie algebras. In this paper, we prove that there are at least 2 conjugacy classes of Borel subalgebras as well as maximal triangulable subalgebras of restricted Cartan type Lie algebras of type W, S and H. We are particularly interested in maximal triangulable subalgebras of W (n) under some conditions which is called B -subalgebras (Definition 3.1). We classify the conjugacy classes of B -subalgebras for W (n) and determine their representatives. This paper and its sequel [Z. Lin, K. Ou and B. Shu, Geometric Setting of Jacobson–Witt Algebras, preprint] attempt to establish both algebraic and geometric setting for geometric representation theory of W (n). [ABSTRACT FROM AUTHOR]
- Published
- 2022
- Full Text
- View/download PDF
24. A talented monoid view on Lie bracket algebras over Leavitt path algebras.
- Author
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Bock, Wolfgang, Sebandal, Alfilgen, and Vilela, Jocelyn
- Subjects
LIE algebras ,ALGEBRA ,MONOIDS - Abstract
In this paper, we study properties such as simplicity, solvability and nilpotency for Lie bracket algebras arising from Leavitt path algebras, based on the talented monoid of the underlying graph. We show that graded simplicity and simplicity of the Leavitt path algebra can be connected via the Lie bracket algebra. Moreover, we use the Gelfand–Kirillov dimension for the Leavitt path algebra for a classification of nilpotency and solvability. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
25. Zinbiel algebras are nilpotent.
- Author
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Towers, David A.
- Subjects
ALGEBRA - Abstract
In this paper, we show that every finite-dimensional Zinbiel algebra over an arbitrary field is nilpotent, extending a previous result that they are solvable by other authors. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
26. A class of irreducible modules for loop-Virasoro algebras.
- Author
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Chakraborty, Priyanshu and Batra, Punita
- Subjects
MODULES (Algebra) ,ASSOCIATIVE algebras ,ALGEBRA ,ASSOCIATIVE rings ,TENSOR products - Abstract
Tensor product of highest weight modules and intermediate modules for Virasoro algebra have been studied around 1997. Since then the irreducibility problem for tensor product of modules is open. We consider the loop-Virasoro algebra V i r ⊗ B , where Vir is the Virasoro algebra and B is a commutative associative unital algebra over ℂ. In this paper, we study the irreducibility problem for the tensor product of highest weight modules and intermediate modules for Vir ⊗ B. Finally we found out a necessary and sufficient condition for such modules to be isomorphic. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
27. Local and 2-local derivations on octonion algebras.
- Author
-
Ayupov, Shavkat, Kudaybergenov, Karimbergen, and Allambergenov, Allayar
- Subjects
CAYLEY numbers (Algebra) ,ALGEBRA ,LIE algebras ,ASSOCIATIVE rings - Abstract
This paper is devoted to study of local and 2-local derivations on octonion algebras. We shall give a general form of local derivations on the real octonion algebra ℝ . This description implies that the space of all local derivations on ℝ when equipped with Lie bracket is isomorphic to the Lie algebra 7 (ℝ) of all real skew-symmetric 7 × 7 -matrices. We also consider 2 -local derivations on an octonion algebra over an algebraically closed field of characteristic zero and prove that every 2 -local derivation on is a derivation. Further, we apply these results to similar problems for the simple seven-dimensional Malcev algebra. As a corollary, we obtain that the real octonion algebra ℝ and Malcev algebra M 7 (ℝ) are simple non-associative algebras which admit pure local derivations, that is, local derivations which are not derivation. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
28. Free weighted (modified) differential algebras, free (modified) Rota–Baxter algebras and Gröbner–Shirshov bases.
- Author
-
Zhu, Zhicheng, Zhang, Huhu, and Gao, Xing
- Subjects
DIFFERENTIAL algebra ,ALGEBRA - Abstract
In this paper, we obtain, respectively, some new linear bases of free nonunitary (modified) weighted differential algebras and free nonunitary (modified) Rota–Baxter algebras, in terms of the method of Gröbner–Shirshov bases. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
29. A note on (ψ+,ψ−)-derivations of Banach–Jordan systems with nonzero socle.
- Author
-
Marhnine, Hassan and Zarhouti, Chafika
- Subjects
WESTERN countries ,ISOMORPHISM (Mathematics) ,ALGEBRA - Abstract
The main objective of this research paper consists in introducing the concept of (ψ + , ψ −) -derivations acting on Banach–Jordan pairs and Banach–Jordan algebras and giving an automatic continuity result of the operators in question under some algebraic conditions. Concretely, we prove that (ψ + , ψ −) -derivations defined from a Banach–Jordan pair V = (V + , V −) into a strongly prime Banach–Jordan pair W = (W + , W −) are automatically continuous under the assumptions that the socle Soc (W) = (Soc (W +) , Soc (W −)) is nonzero and ψ = (ψ + , ψ −) is an isomorphism from V into W. Similar results for Banach–Jordan algebras hold to be true. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
30. The Bochner–Schoenberg–Eberlein property for amalgamated duplication of Banach algebras.
- Author
-
Ebadian, Ali and Jabbari, Ali
- Subjects
BANACH algebras ,COMMUTATIVE algebra ,IDEMPOTENTS ,COMPACT groups ,ALGEBRA - Abstract
The Bochner–Schoenberg–Eberlein (BSE)-property on commutative Banach algebras is a property related to multiplier algebras of Banach algebras. In this paper, we answer the problem (12) raised by Javanshiri and Nemati in [Amalgamated duplication of the Banach algebra along a -bimodule , J. Algebra Appl. 17(9) (2018) 1850169-1–1850169-21]. In this paper, under certain conditions, we show that the amalgamated Banach algebra ⋊ is BSE-algebra if and only if and are BSE-algebras. [ABSTRACT FROM AUTHOR]
- Published
- 2022
- Full Text
- View/download PDF
31. Pairing and duality of algebraic quantum groupoids.
- Author
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Timmermann, T., Van Daele, A., and Wang, S. H.
- Subjects
DUALITY theory (Mathematics) ,HOPF algebras ,GROUPOIDS ,ALGEBROIDS ,ALGEBRA ,MATHEMATICS - Abstract
Algebraic quantum groupoids have been developed by two of the authors of this note (AVD and SHW) in a series of papers [A. Van Daele and S. Wang, Weak multiplier Hopf algebras. Preliminaries, motivation and basic examples, Banach Center Publ. 98 (2012) 367–415; A. Van Daele and S. Wang, Weak multiplier Hopf algebras I. The main theory, J. Reine Angew. Math. 705 (2015) 155–209; A. Van Daele and S. Wang, Weak multiplier Hopf algebras II. The source and target algebras, preprint (2014), arXiv: 1403.7906v2 [math.RA]; A. Van Daele and S. Wang, Weak multiplier Hopf algebras III. Integrals and duality, preprint (2017), arXiv: 1701.04951 [math.RA]], see also [A. Van Daele, Algebraic quantum groupoids. An example, preprint (2017), arXiv: 1702.04903 [math.RA]]. By an algebraic quantum groupoid, we understand a regular weak multiplier Hopf algebra with enough integrals. Regular multiplier Hopf algebroids are obtained also by two authors of this note (TT and AVD) in [T. Timmermann and A. Van Daele, Regular multiplier Hopf algebroids. Basic theory and examples, Commun. Algebra 46 (2017) 1926–1958]. Integral theory and duality for those have been studied by one author here (TT) in [T. Timmermann, Integration on algebraic quantum groupoids, Int. J. Math. 27 (2016) 1650014, arXiv: 1507.00660 [QA]; T. Timmermann, On duality of algebraic quantum groupoids, Adv. Math. 309 (2017) 692–746, arXiv: 1605.06384 [math.QA]]. In these papers, the term algebraic quantum groupoid is used for a regular multiplier Hopf algebroid with a single faithful integral. Finally, again two authors of us (TT and AVD) have investigated the relation between weak multiplier Hopf algebras and multiplier Hopf algebroids in [T. Timmermann and A. Van Daele, Multiplier Hopf algebroids arising from weak multiplier Hopf algebras, Banach Center Publ. 106 (2015) 73–110]. In the paper, Weak multiplier Hopf algebras III. Integrals and duality [A. Van Daele and S. Wang, Weak multiplier Hopf algebras III. Integrals and duality, preprint (2017), arXiv: 1701.04951 [math.RA]], one of the main results is that the dual of an algebraic quantum groupoid, admits a dual of the same type. In the paper, On duality of algebraic quantum groupoids [T. Timmermann, On duality of algebraic quantum groupoids, Adv. Math. 309 (2017) 692–746, arXiv: 1605.06384 [math.QA]], a result of the same nature is obtained for regular multiplier Hopf algebroids with a single faithful integral. The duality of regular weak multiplier Hopf algebras with a single integral can be obtained from the duality of regular multiplier Hopf algebroids (see [T. Timmermann, On duality of algebraic quantum groupoids, Adv. Math. 309 (2017) 692–746, arXiv: 1605.06384 [math.QA]]). That is however not the obvious way to obtain this result. It is more difficult and less natural than the direct way followed in [A. Van Daele and S. Wang, Weak multiplier Hopf algebras III. Integrals and duality, preprint (2017), arXiv: 1701.04951 [math.RA]]. We will discuss this statement further in the paper. Nevertheless, it is interesting to investigate the relation between the two approaches to duality in greater detail. This is what we do in this paper. We build further on the intimate relation between weak multiplier Hopf algebras and multiplier Hopf algebroids as studied in [T. Timmermann and A. Van Daele, Multiplier Hopf algebroids arising from weak multiplier Hopf algebras, Banach Center Publ. 106 (2015) 73–110]. We now add the presence of integrals. That seems to be done best in a framework of dual pairs. It is in fact more general than the duality of these objects coming with integrals. We are convinced that the material we present in this paper will provide a deeper understanding of the duality of algebraic quantum groupoids, both within the framework of weak multiplier Hopf algebras, as well as more generally for multiplier Hopf algebroids. Finally, we feel it is also appropriate to include some historical comments on the development of these duality theories. [ABSTRACT FROM AUTHOR]
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- 2022
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32. Deforming vertex algebras by vertex bialgebras.
- Author
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Jing, Naihuan, Kong, Fei, Li, Haisheng, and Tan, Shaobin
- Subjects
ALGEBRA ,VERTEX operator algebras - Abstract
This is a continuation of a previous study initiated by the third author on nonlocal vertex bialgebras and smash product nonlocal vertex algebras. In this paper, we study a notion of right H -comodule nonlocal vertex algebra for a nonlocal vertex bialgebra H and give a construction of deformations of vertex algebras with a right H -comodule nonlocal vertex algebra structure and a compatible H -module nonlocal vertex algebra structure. We also give a construction of ϕ -coordinated quasi modules for smash product nonlocal vertex algebras. As an example, we give a family of quantum vertex algebras by deforming the vertex algebras associated to non-degenerate even lattices. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
33. On generators and defining relations of quantum affine superalgebra Uq(̂m|n).
- Author
-
Lin, Hongda, Yamane, Hiroyuki, and Zhang, Honglian
- Subjects
AFFINE algebraic groups ,ISOMORPHISM (Mathematics) ,SUPERALGEBRAS ,ALGEBRA ,LIE superalgebras ,MATHEMATICS - Abstract
Two presentations of quantum affine superalgebras were introduced by Yamane in [On defining relations of affine Lie superalgebras and affine quantized universal enveloping superalgebras, Publ. Res. Inst. Math. Sci. 35 (1999) 321–390], which were called Drinfeld–Jimbo realization and Drinfeld realization. Drinfeld realization contains infinite sequences of generators and relations. In this paper, we consider the Drinfeld realization of quantum affine superalgebra q ( ̂ m | n) associated to type m | n and define a simple algebra 0 ( ̂ m | n) generated by only a finite part of these sequences of quantum affine superalgebra q ( ̂ m | n). We show that the algebra 0 ( ̂ m | n) is isomorphic to the quantum affine superalgebra q ( ̂ m | n). Using the above isomorphism, we prove there exists an isomorphism between the two realizations. [ABSTRACT FROM AUTHOR]
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- 2024
- Full Text
- View/download PDF
34. A Modeling and Verification Method of Cyber-Physical Systems Based on AADL and Process Algebra.
- Author
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Li, Zhen, Cao, Zining, Wang, Fujun, and Xing, Chao
- Subjects
CYBER physical systems ,ARTIFICIAL intelligence ,ALGEBRA ,ARCHITECTURAL design ,TELECOMMUNICATION systems ,PROBABILISTIC number theory - Abstract
Cyber-Physical Systems (CPS) are the next generation of intelligent systems that integrate information control devices with physical resources. With increasingly close connections between CPS components and frequent interactions, potential defects grow exponentially, rendering the operating environment of CPS unreliable. Therefore, research on methods and theories to ensure the correctness, safety and reliability of CPS is not only an important research topic but also an inevitable challenge. In this paper, we propose a CPS modeling and verification method based on Architecture Analysis & Design Language (AADL) and process algebra to address this challenge. Due to the continuous, time-constrained, stochastic, uncertain and concurrent characteristics of CPS, this paper considers both flexibility and rigor in the modeling process. We first extend the ability of AADL to describe the multiple characteristics of CPS and propose Hybrid Probability-AADL (HP-AADL). Second, this paper introduces conditional execution, conditional interruption and probability operators into Temporal Calculus of Communication Systems (TCCS) and designs a new formal modeling language Hybrid Probability-Temporal Calculus of Communication Systems (HP-TCCS). However, HP-AADL is a semi-formal modeling language that cannot be directly used for formal verification, it cannot strictly guarantee the quality of the established CPS models, including its functional correctness and safety. Therefore, this paper proposes transformation rules from HP-AADL to HP-TCCS, which enables model checking of CPS models described in HP-AADL within HP-TCCS. Additionally, this paper designs a new formal specification language HPAT-Spatial Temporal Logic (HPAT-STL) based on Probabilistic Computation Tree Logic (PCTL) and Spatial Logic, which characterizes the temporal, probabilistic and spatial properties of CPS model. To achieve formal verification of HP-TCCS model and HPAT-STL formulas, this paper proposes a model checking algorithm HPAT-Model Checking Algorithm (HPAT-MCA). Finally, we discuss a typical CPS example to demonstrate the effectiveness of our proposed method in ensuring correct, safe and reliable CPS. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
35. Directed Ramsey and anti-Ramsey schemes and the Flexible Atom Conjecture.
- Author
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Alm, Jeremy F. and Levet, Michael
- Subjects
- *
RELATION algebras , *LOGICAL prediction , *FLEXIBLE structures , *ATOMS , *ALGEBRA , *DIRECTED graphs , *RAMSEY numbers - Abstract
In this paper, we shed new light on the Flexible Atom Conjecture. We first give finite representation results for relation algebras 3 3 3 7 , 3 5 3 7 , 7 7 8 3 , 7 8 8 3 , 8 0 8 3 , 8 2 8 3 , 8 3 8 3 , 1 3 1 0 1 3 1 6 , 1 3 1 3 1 3 1 6 , 1 3 1 5 1 3 1 6 and 1 3 1 6 1 3 1 6 . Prior to our paper, only 8 3 8 3 and 1 3 1 6 1 3 1 6 were known to be finitely representable. We accomplish this by generalizing the notion of a relation algebra generated by a Ramsey scheme to the directed (antisymmetric) setting, and then showing that each of these algebras embeds into a finite directed anti-Ramsey scheme. The notion of a directed anti-Ramsey scheme may be of independent interest. We complement our upper bounds with some lower bounds. Namely, we show that any square representation of 3 1 3 7 requires at least 14 points, any square representation of 3 3 3 7 requires at least 11 points, and any square representation of 3 5 3 7 requires at least 12 points. Our technique adapts previous work of Alm et al. [Algebra Univ. (2022)], in that we examine the combinatorial structure induced by the flexible atom. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
36. 2-Nil submodules of modules over commutative rings.
- Author
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Mahdou, Najib, Moutui, Moutu Abdou Salam, and Yetkin Celikel, Ece
- Subjects
ALGEBRA - Abstract
In this paper, we extend the notion of 2-nil ideal introduced by Yetkin Celikel in [E. Yetkin Celikel, 2-nil ideals of commutative rings, Bulletin of the Belgian Mathematical Society Simon Stevin 28 (3) (2021).] to 2-nil submodule which is a subclass of 2-absorbing primary submodules. Let M be an R -module and N be a proper submodule of M. We say that N is a 2-nil submodule of M if whenever a , b ∈ R , m ∈ M and a b m ∈ N , then a b ∈ Nil (M) or a m ∈ N or b m ∈ N. We study the properties of this concept and establish several characterizations. We also investigate the 2-nil ideals of amalgamation. The obtained results yield new original families of examples of 2-nil ideals. [ABSTRACT FROM AUTHOR]
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- 2023
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- View/download PDF
37. Ring theoretic properties of partial skew groupoid rings with applications to Leavitt path algebras.
- Author
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Bagio, Dirceu, Marín, Víctor, and Pinedo, Héctor
- Subjects
ALGEBRA ,GROUPOIDS - Abstract
Let α = (A g , α g) g ∈ be a group-type partial action of a connected groupoid on a ring A = ⊕ z ∈ 0 A z and B : = A ⋆ α be the corresponding partial skew groupoid ring. In the first part of this paper, we investigate the relation of several ring theoretic properties between A and B. For the second part, using that every Leavitt path algebra is isomorphic to a partial skew groupoid ring obtained from a partial groupoid action λ , we characterize when λ is group-type. In such a case, we obtain ring theoretic properties of Leavitt path algebras from the results on general partial skew groupoid rings. Several examples that illustrate the results on Leavitt path algebras are presented. [ABSTRACT FROM AUTHOR]
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- 2023
- Full Text
- View/download PDF
38. On properties of some nilpotent evolution algebras and their enveloping algebras.
- Author
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Alarafeen, Ahmad, Ahmad, Azhana, and Qaralleh, Izzat
- Subjects
ALGEBRA ,NILPOTENT Lie groups - Abstract
In this paper, we consider n -dimensional nilpotent finite-dimensional evolution algebras with non-maximal index of nilpotency. We give complete invariants of these algebras in order to classify them. Then, we describe their associative enveloping algebras. We also give a positive answer to the question whether a derivation of this nilpotent evolution algebra is possible to be extended to its enveloping algebra. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
39. Unique decompositions into w-ideals for strong Mori domains.
- Author
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Ay Saylam, Başak, Gürbüz, Ezgi, and Hamdi, Haleh
- Subjects
INTEGRAL domains ,COMMUTATIVE rings ,INDECOMPOSABLE modules ,ISOMORPHISM (Mathematics) ,ALGEBRA - Abstract
A commutative ring R has the unique decomposition into ideals (UDI) property if, for any R -module that decomposes into a finite direct sum of indecomposable ideals, this decomposition is unique up to the order and isomorphism classes of the indecomposable ideals. In [P. Goeters and B. Olberding, Unique decomposition into ideals for Noetherian domains, J. Pure Appl. Algebra 165 (2001) 169–182], the UDI property has been characterized for Noetherian integral domains. In this paper, we aim to study the UDI-like property for strong Mori domains; domains satisfying the ascending chain condition on w -ideals. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
40. Multipliers and unicentral diassociative algebras.
- Author
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Mainellis, Erik
- Subjects
ALGEBRA ,GROUP theory - Abstract
This paper details the diassociative analogue of results concerning the Schur multiplier and other extension-theoretic concepts that originate in group theory. We first prove that covers of diassociative algebras are unique. Second, we show that the multiplier of a diassociative algebra is characterized by the second cohomology group with coefficients in the field. Third, we establish criteria for when the center of a cover maps onto the center of the algebra. Along the way, we obtain a collection of exact sequences, characterizations, and a brief theory of unicentral diassociative algebras and stem extensions. This paper is part of an ongoing project to advance extension theory in the context of several Loday algebras. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
41. 2-Local derivations on the planar Galilean conformal algebra.
- Author
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Chen, Qiu-Fan and He, Yan
- Subjects
ALGEBRA - Abstract
This paper is devoted to studying 2-local derivations on the planar Galilean conformal algebra. We prove that every 2-local derivation on the planar Galilean conformal algebra is a derivation. [ABSTRACT FROM AUTHOR]
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- 2023
- Full Text
- View/download PDF
42. Diamond distances in Nottingham algebras.
- Author
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Avitabile, M. and Mattarei, S.
- Subjects
LIE algebras ,ALGEBRA ,DIAMONDS - Abstract
Nottingham algebras are a class of just-infinite-dimensional, modular, ℕ -graded Lie algebras, which includes the graded Lie algebra associated to the Nottingham group with respect to its lower central series. Homogeneous components of a Nottingham algebra have dimension one or two, and in the latter case they are called diamonds. The first diamond occurs in degree 1 , and the second occurs in degree q , a power of the characteristic. Many examples of Nottingham algebras are known, in which each diamond past the first can be assigned a type, either belonging to the underlying field or equal to ∞. A prospective classification of Nottingham algebras requires describing all possible diamond patterns. In this paper, we establish some crucial contributions towards that goal. One is showing that all diamonds, past the first, of an arbitrary Nottingham algebra L can be assigned a type, in such a way that the degrees and types of the diamonds completely describe L. At the same time we prove that the difference in degrees of any two consecutive diamonds in any Nottingham algebra equals q − 1. As a side-product of our investigation, we classify the Nottingham algebras where all diamonds have type ∞. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
43. Artin–Schelter regular algebras of dimension five with three generators.
- Subjects
ALGEBRA ,ARTIN algebras ,HYPOTHESIS - Abstract
In this paper, we investigate Artin–Schelter regular algebras of dimension 5 with three generators in degree 1 under the hypothesis that GKdim ≥ 4 , in which the degree types of the relations for the number of the generating relations less than five can be determined. We prove that the only possible degree type of three generating relations is (2, 2, 3) and the only possible degree type of four generating relations is (2, 2, 3, 4). [ABSTRACT FROM AUTHOR]
- Published
- 2022
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- View/download PDF
44. Random hypergraphs, random simplicial complexes and their Künneth-type formulae.
- Author
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Ren, Shiquan, Wu, Chengyuan, and Wu, Jie
- Subjects
- *
HYPERGRAPHS , *ALGEBRA - Abstract
Random hypergraphs and random simplicial complexes on finite vertices were studied by [M. Farber, L. Mead and T. Nowik, Random simplicial complexes, duality and the critical dimension, J. Topol. Anal.41(1) (2022) 1–32]. The map algebra on random sub-hypergraphs of a fixed simplicial complex, which detects relations between random sub-hypergraphs and random simplicial sub-complexes, was studied by the authors of this paper. In this paper, we study the map algebra on random sub-hypergraphs of a fixed hypergraph. We give some algorithms generating random hypergraphs and random simplicial complexes by considering the actions of the map algebra on the space of probability distributions. We prove some Künneth-type formulae for random hypergraphs and random simplicial complexes on finite vertices. [ABSTRACT FROM AUTHOR]
- Published
- 2023
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- View/download PDF
45. Grothendieck groups of purely infinite simple Leavitt path algebras for punctured power graphs of finite groups.
- Author
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Das, Sumanta, Sen, M. K., and Maity, S. K.
- Subjects
INFINITE groups ,EXPONENTS ,GROTHENDIECK groups ,ALGEBRA ,DIRECTED graphs - Abstract
In [S. Das, M. K. Sen and S. K. Maity, Leavitt path algebras for power graphs of finite groups, J. Algebra Appl., doi:10.1142/S0219498822502097], we studied several algebraic properties of Leavitt path algebra of the directed power graph ⃗ (G) and also of the directed punctured power graph ⃗ * (G) of a finite group G. In this paper, we compute the Grothendieck group of purely infinite simple Leavitt path algebra of the directed punctured power graph of a finite group. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
46. Levi-type Schur–Sergeev duality for general linear super groups.
- Author
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Wang, Di
- Subjects
HECKE algebras ,TENSOR products ,ALGEBRA ,SUPERALGEBRAS ,VECTOR spaces - Abstract
In this paper, we investigate a kind of double centralizer property for general linear supergroups. For the super space V = m | n over an algebraically closed field whose characteristic is not equal to 2 , we consider its ℤ 2 -homogeneous one-dimensional extension V ̲ = V ⊕ v , and the natural action of the supergroup G ̃ : = GL (V) × G m on V ̲. Then we have the tensor product supermodule ( V ̲ ⊗ r , ρ r ) of G ̃. We present a kind of generalized Schur–Sergeev duality which is said that the Schur superalgebras S ′ (m | , n , r) of G ̃ and the so-called weak degenerate double Hecke algebra ℋ ̲ r are double centralizers. The weak degenerate double Hecke algebra is an infinite-dimensional algebra, which has a natural representation on the tensor product space. This notion comes from [B. Shu, Y. Xue and Y. Yao, On enhanced reductive groups (I): Parabolic Schur algebras and the dualities related to degenerate double Hecke algebras, preprint (2013), arXiv:2005.13152 [Math. RT]], with a little modification. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
47. Quantum immanants, double Young–Capelli bitableaux and Schur shifted symmetric functions.
- Author
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Brini, A. and Teolis, A.
- Subjects
ISOMORPHISM (Mathematics) ,ALGEBRA ,POLYNOMIALS ,REPRESENTATION theory ,EIGENVALUES ,VERTEX operator algebras ,SYMMETRIC functions - Abstract
In this paper, we introduced two classes of elements in the enveloping algebra U (g l (n)) : the double Young–Capelli bitableaux [ S | T ] and the central Schur elements S λ (n) , that act in a remarkable way on the highest weight vectors of irreducible Schur modules. Any element S λ (n) is the sum of all double Young–Capelli bitableaux [ S | S ] , S row (strictly) increasing Young tableaux of shape λ ̃. The Schur elements S λ (n) are proved to be the preimages — with respect to the Harish-Chandra isomorphism — of the shifted Schur polynomials s λ | n ∗ ∈ Λ ∗ (n). Hence, the Schur elements are the same as the Okounkov quantum immanants, recently described by the present authors as linear combinations of Capelli immanants. This new presentation of Schur elements/quantum immanants does not involve the irreducible characters of symmetric groups. The Capelli elements H k (n) are column Schur elements and the Nazarov elements I k (n) are row Schur elements. The duality in ζ (n) follows from a combinatorial description of the eigenvalues of the H k (n) on irreducible modules that is dual (in the sense of shapes/partitions) to the combinatorial description of the eigenvalues of the I k (n). The passage n → ∞ for the algebras ζ (n) is obtained both as direct and inverse limit in the category of filtered algebras, via the Olshanski decomposition/projection. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
48. On power-associative modules.
- Author
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Fernandez, J. C. Gutierrez, Grishkov, A., and Vanegas, E. O. Quintero
- Subjects
VARIETIES (Universal algebra) ,ALGEBRAIC varieties ,ALGEBRA ,NILPOTENT Lie groups ,ASSOCIATIVE rings - Abstract
The aim of this paper is to study the structure of irreducible modules in the variety ℳ of commutative power-associative nilalgebras of nilindex ≤ 4. If A ∈ ℳ with dimension at most 5, then we prove that A 2 is contained in the annihilator of every irreducible A -module in the variety ℳ. Also, we consider the enveloping algebra of an algebra A in the variety ℳ and we obtain a new example of a commutative power-associative non-nilpotent nilalgebra of dimension 9. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
49. On strongly closed and Hall s-semiembedded subgroups of finite groups.
- Author
-
Yu, Haoran, Xu, Xiaowei, and Zhang, Guanghao
- Subjects
FINITE groups ,SUBGROUP growth ,ALGEBRA - Abstract
Let H ≤ K be subgroups of a finite group G , then H is called strongly closed in K with respect to G if H g ∩ K ≤ H for every g ∈ G , and in particular, H is simply called strongly closed in G if H is strongly closed in N G (H) with respect to G. Let H be a subgroup of a finite group G , then H is called Hall s -semiembedded in G if H is a Hall subgroup of 〈 H , P 〉 for every P ∈ Syl p (G) , where (| H | , p) = 1. In this paper, we obtain some criteria for p -nilpotency of a finite group and extend some known results concerning strongly closed and Hall s -semiembedded subgroups. In particular, we generalize some main results of Guo and Li [Hall s -semiembedded subgroups and p -nilpotency of finite groups, Southeast Asian Bull. Math. 42(3) (2018) 367–374] and Kong [New characterizations of p -nilpotency of finite groups, J. Algebra Appl. 20(11) (2021) Article ID: 2150215, 6 pp.]. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
50. On radical ideals of non-commutative rings.
- Author
-
Groenewald, Nico
- Subjects
NONCOMMUTATIVE rings ,JACOBSON radical ,ALGEBRA ,COMMUTATIVE rings - Abstract
Let J (R) denote the Jacobson radical of a commutative ring R. In [H. A. Khashan and A. B. Bani-Ata, J -ideals of commutative rings, Int. Electron. J. Algebra 29 (2021) 148–164], the notion of J-ideals was introduced. If N (R) denotes the prime radical of a commutative ring then in [U. Tekir, S. Koc and K. H. Oral, n -Ideals of commutative rings, Filomat 31(10) (2017) 2933–2941], the notion of an N ideal of a commutative ring was introduced and studied. In this note, we show that these results are special cases of a more general situation. We define ρ -ideals for a special radical ρ and prove that most of the results of the above-mentioned papers are satisfied for non-commutative rings as a special case. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
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