Showing total 15 results

1. Complex submanifolds of indefinite complex space forms.

Author

Cheng, Xiaoliang, Hao, Yihong, Yuan, Yuan, and Zhang, Xu

Subjects

*HYPERBOLIC spaces, *PROJECTIVE spaces, *ALGEBRA, *SUBMANIFOLDS

Abstract

In this short paper, we derive a new result on Umehara algebra. As a consequence, we prove that an indefinite complex hyperbolic space and an indefinite complex projective space do not share a common complex submanifold with induced metrics, answering a question raised in Cheng et al. [ABSTRACT FROM AUTHOR]

Published

2024

2. Pairs of continuous linear bijective maps preserving fixed products of operators.

Author

Costara, Constantin

Subjects

*BANACH spaces, *LINEAR operators, *ALGEBRA

Abstract

Let X be a complex Banach space, and denote by \mathcal {B}(X) the algebra of all bounded linear operators on X. Let C,D\in \mathcal {B} \left (X\right) be fixed operators. In this paper, we characterize linear, continuous and bijective maps \varphi and \psi on \mathcal {B}\left (X\right) for which there exist invertible operators T_0, W_0 \in \mathcal { B}(X) such that \varphi (T_0), \psi (W_0) \in \mathcal {B}(X) are both invertible, having the property that \varphi \left (A\right) \psi \left (B\right) =D in \mathcal {B}(X) whenever AB=C in \mathcal {B}(X). As a corollary, we deduce the form of linear, bijective and continuous maps \varphi on \mathcal {B}(X) having the property that \varphi \left (A\right) \varphi \left (B\right) =D in \mathcal {B}(X) whenever AB=C. [ABSTRACT FROM AUTHOR]

Published

2024

3. Specialization of integral closure of ideals by general elements.

Author

Hill, Lindsey and Lynn, Rachel

Subjects

*POLYNOMIAL rings, *INTEGRALS, *ALGEBRA

Abstract

In this paper, we prove a result similar to results of Itoh [J. Algebra 150 (1992), pp. 101–117] and Hong-Ulrich [J. Lond. Math. Soc. (2) 90 (2014), pp. 861–878], proving that integral closure of an ideal is compatible with specialization by a general element of that ideal for ideals of height at least two in a large class of rings. Moreover, we show integral closure of sufficiently large powers of the ideal is compatible with specialization by a general element of the original ideal. In a polynomial ring over an infinite field, we give a class of squarefree monomial ideals for which the integral closure is compatible with specialization by a general linear form. [ABSTRACT FROM AUTHOR]

Published

2024

4. On p_g-ideals in positive characteristic.

Author

Puthenpurakal, Tony J.

Subjects

*COHEN-Macaulay rings, *ALGEBRA

Abstract

Let (A,\mathfrak {m}) be an excellent normal domain of dimension two containing a field k \cong A/\mathfrak {m}. An \mathfrak {m}-primary ideal I is a p_g-ideal if the Rees algebra A[It] is a Cohen-Macaulay normal domain. If k is algebraically closed then Okuma, Watanabe and Yoshida proved that A has p_g-ideals and furthermore product of two p_g-ideals is a p_g ideal. Previously we showed that if k has characteristic zero then A has p_g-ideals. In this paper we prove that if k is perfect field of positive characteristic then also A has p_g ideals. [ABSTRACT FROM AUTHOR]

Published

2024

5. Socle degrees for local cohomology modules of thickenings of maximal minors and sub-maximal Pfaffians.

Author

Li, Jiamin and Perlman, Michael

Subjects

*REPRESENTATION theory, *MINORS, *SYMMETRIC matrices, *ALGEBRA, *POLYNOMIAL rings, *MATHEMATICS

Abstract

Let S be the polynomial ring on the space of non-square generic matrices or the space of odd-sized skew-symmetric matrices, and let I be the determinantal ideal of maximal minors or Pf the ideal of sub-maximal Pfaffians, respectively. Using desingularizations and representation theory of the general linear group we expand upon work of Raicu–Weyman–Witt [Adv. Math. 250 (2014), pp. 596–610] to determine the S-module structures of Ext^j_S(S/I^t, S) and Ext^j_S(S/Pf^t, S), from which we get the degrees of generators of these Ext modules. As a consequence, via graded local duality we answer a question of Wenliang Zhang [J. Pure Appl. Algebra 225 (2021), Paper No. 106789] on the socle degrees of local cohomology modules of the form H^j_\mathfrak {m}(S/I^t). [ABSTRACT FROM AUTHOR]

Published

2024

6. Isomorphism problems and groups of automorphisms for Ore extensions K[x][y; \delta] (zero characteristic).

Author

Bavula, V. V.

Subjects

*ISOMORPHISM (Mathematics), *GROUP algebras, *AUTOMORPHISM groups, *ORES, *AUTOMORPHISMS, *ALGEBRA, *POLYNOMIALS

Abstract

Let \Lambda (f) = K[x][y; f\frac {d}{dx} ] be an Ore extension of a polynomial algebra K[x] over a field K of characteristic zero where f\in K[x]. For a given polynomial f, the automorphism group of the algebra \Lambda (f) is explicitly described. The polynomial case \Lambda (0) = K[x,y] and the case of the Weyl algebra A_1= K[x][y; \frac {d}{dx} ] were done by Jung [J. Reine Angew. Math. 184 (1942), pp. 161–174] and van der Kulk [Nieuw Arch. Wisk. (3) 1 (1953), pp. 33–41], and Dixmier [Bul. Soc. Math. France 96 (1968), pp. 209–242], respectively. Alev and Dumas [Comm. Algebra 25 (1997), pp. 1655–1672] proved that the algebras \Lambda (f) and \Lambda (g) are isomorphic iff g(x) = \lambda f(\alpha x+\beta) for some \lambda, \alpha \in K\backslash \{ 0\} and \beta \in K. Benkart, Lopes and Ondrus [Trans. Amer. Math. Soc. 367 (2015), pp. 1993–2021] gave a complete description of the set of automorphism groups of algebras \Lambda (f). In this paper we complete the picture, i.e. given the polynomial f we have the explicit description of the automorphism group of \Lambda (f). The key concepts in finding the automorphism groups are the eigenform, the eigenroot and the eigengroup of a polynomial (introduced in the paper; they are of independent interest). [ABSTRACT FROM AUTHOR]

Published

2023

7. Gradings on block-triangular matrix algebras.

Author

Diniz, Diogo, Silva, José Lucas Galdino da, and Koshlukov, Plamen

Subjects

*MATRICES (Mathematics), *LINEAR algebra, *JACOBSON radical, *RING theory, *ALGEBRA

Abstract

Upper triangular, and more generally, block-triangular matrices, are rather important in Linear Algebra, and also in Ring theory, namely in the theory of PI algebras (algebras that satisfy polynomial identities). The group gradings on such algebras have been extensively studied during the last decades. In this paper we prove that for any group grading on a block-triangular matrix algebra, over an arbitrary field, the Jacobson radical is a graded (homogeneous) ideal. As noted by F. Yasumura [Arch. Math. (Basel) 110 (2018), pp. 327–332] this yields the classification of the group gradings on these algebras and confirms a conjecture made by A. Valenti and M. Zaicev [Arch. Math. (Basel) 89 (2007), pp. 33–40]. [ABSTRACT FROM AUTHOR]

Published

2024

8. On the image of the mean transform.

Author

Chabbabi, Fadil and Ostermann, Maëva

Subjects

*POSITIVE operators, *HILBERT space, *ALGEBRA

Abstract

Let \mathcal {B}(H) be the algebra of all bounded operators on a Hilbert space H. Let T=V|T| be the polar decomposition of an operator T\in \mathcal {B}(H). The mean transform of T is defined by M(T)=\frac {T+|T|V}{2}. In this paper, we discuss several properties related to the spectrum, the kernel, the image, and the polar decomposition of mean transform. Moreover, we investigate the image and preimage by the mean transform of some class of operators such as positive, normal, unitary, hyponormal, and co-hyponormal operators. [ABSTRACT FROM AUTHOR]

Published

2023

9. Heat-smoothing for holomorphic subalgebras of free group von Neumann algebras.

Author

Zhang, Haonan

Subjects

*FREE groups, *HOLOMORPHIC functions, *FUNCTION spaces, *VON Neumann algebras, *GAUSSIAN function, *ALGEBRA, *HYPERCUBES

Abstract

The heat semigroup on discrete hypercubes is well-known to be contractive over L_p-spaces for 1

Published

2023

10. A new class of finitely generated polynomial subalgebras without finite SAGBI bases.

Author

Kuroda, Shigeru

Subjects

*GROBNER bases, *RING theory, *POLYNOMIALS, *POLYNOMIAL rings, *FINITE, The, *ALGEBRA, *CHEBYSHEV polynomials

Abstract

The notion of initial ideal for an ideal of a polynomial ring appears in the theory of Gröbner basis. Similarly to the initial ideals, we can define the initial algebra for a subalgebra of a polynomial ring, or more generally of a Laurent polynomial ring, which is used in the theory of SAGBI (Subalgebra Analogue to Gröbner Bases for Ideals) basis. The initial algebra of a finitely generated subalgebra is not always finitely generated, and no general criterion for finite generation is known. The aim of this paper is to present a new class of finitely generated subalgebras having non-finitely generated initial algebras. The class contains a subalgebra for which the set of initial algebras is uncountable, as well as a subalgebra with finitely many distinct initial algebras. [ABSTRACT FROM AUTHOR]

Published

2023

11. From algebra to analysis: New proofs of theorems by Ritt and Seidenberg.

Author

Pavlov, D., Pogudin, G., and Razmyslov, Yu. P.

Subjects

*ALGEBRA, *SET theory, *EXISTENCE theorems, *DIFFERENTIAL algebra

Abstract

Ritt's theorem of zeroes and Siedenberg's embedding theorem are classical results in differential algebra allowing to connect algebraic and model-theoretic results on nonlinear PDEs to the realm of analysis. However, the existing proofs of these results use sophisticated tools from constructive algebra (characteristic set theory) and analysis (Riquier's existence theorem). In this paper, we give new short proofs for both theorems relying only on basic facts from differential algebra and the classical Cauchy-Kovalevskaya theorem for PDEs. [ABSTRACT FROM AUTHOR]

Published

2022

12. A \tau-tilting approach to the first Brauer-Thrall conjecture.

Author

Schroll, Sibylle and Treffinger, Hipolito

Subjects

*MODULES (Algebra), *DIVISION algebras, *DIVISION rings, *ENDOMORPHISMS, *LOGICAL prediction, *ALGEBRA

Abstract

In this paper we study the behaviour of modules over finite dimensional algebras whose endomorphism algebra is a division ring. We show that there are finitely many such modules in the module category of an algebra if and only if the length of all such modules is bounded. [ABSTRACT FROM AUTHOR]

Published

2022

13. Fell algebras, groupoids, and projections.

Author

Deeley, Robin J., Goffeng, Magnus, and Yashinski, Allan

Subjects

*ALGEBRA, *DYNAMICAL systems, *SOLENOIDS, *GROUPOIDS

Abstract

Examples of Fell algebras with compact spectrum and trivial Dixmier-Douady invariant are constructed to illustrate differences with the case of continuous-trace C^*-algebras. At the level of the spectrum, this translates to only assuming the spectrum is locally Hausdorff (rather than Hausdorff). The existence of (full) projections is the fundamental question considered. The class of Fell algebras studied here arises naturally in the study of Wieler solenoids and applications to dynamical systems will be discussed in a separate paper. [ABSTRACT FROM AUTHOR]

Published

2022

14. On the Jacobian ideal of an almost generic hyperplane arrangement.

Author

Burity, Ricardo, Simis, Aron, and Tohǎneanu, Ştefan O.

Subjects

*LOGICAL prediction, *ALGEBRA, *POLYNOMIALS, *ROSES, *HYPERSURFACES, *HYPERPLANES

Abstract

Let \mathcal {A} denote a central hyperplane arrangement of rank n in affine space \mathbb {K}^n over a field \mathbb {K} of characteristic zero and let l_1,\ldots, l_m\in R≔\mathbb {K}[x_1,\ldots,x_n] denote the linear forms defining the corresponding hyperplanes, along with the corresponding defining polynomial f≔l_1\cdots l_m\in R. The focus of the paper is on the ideal J_f\subset R generated by the partial derivatives of f. We conjecture that J_f is a minimal reduction of the ideal \mathbb {I}\subset R generated by the (m-1)-fold products of distinct forms among l_1,\ldots, l_m. We prove this conjecture for an almost generic \mathcal {A} (i.e., any n-1 among the defining linear forms are linearly independent). In this case we obtain a stronger version of a result by Dimca and Papadima, and we confirm the conjecture unconditionally for n=3. We also conjecture that J_f is an ideal of linear type (i.e., the respective symmetric and Rees algebras coincide). We prove this conjecture for n=3. In the sequel we explain the tight relationship between the two ideals J_f, \mathbb {I}\subset R; in particular, we show that in the generic case (J_f)^{\text {sat}}=\mathbb I. As a consequence, we can provide a simpler proof of a conjectured result of Yuzvinsky, proved by Rose and Terao, on the vanishing of the depth of R/J_f. [ABSTRACT FROM AUTHOR]

Published

2022

15. Regular evolution algebras are universally finite.

Author

Costoya, Cristina, Ligouras, Panagiote, Tocino, Alicia, and Viruel, Antonio

Subjects

*AFFINE algebraic groups, *ALGEBRA, *FINITE, The, *CHARTS, diagrams, etc., *FINITE groups

Abstract

In this paper we show that evolution algebras over any given field \Bbbk are universally finite. In other words, given any finite group G, there exist infinitely many regular evolution algebras X such that Aut(X)\cong G. The proof is built upon the construction of a covariant faithful functor from the category of finite simple (non oriented) graphs to the category of (finite dimensional) regular evolution algebras. Finally, we show that any constant finite algebraic affine group scheme \mathbf {G} over \Bbbk is isomorphic to the algebraic affine group scheme of automorphisms of a regular evolution algebra. [ABSTRACT FROM AUTHOR]

Published

2022