Your search keyword '"Feldvoss, J"' showing total 17 results

1. Existence of solutions of the classical yang- baxter equation for a real lie Algebra

Author

Feldvoss, J.

Published

2001

2. Injective Modules and Prime Ideals of Universal Enveloping Algebras

Author

Feldvoss, Jörg, primary

Published

2006

3. On Leibniz cohomology

Author

Feldvoss, J��rg and Wagemann, Friedrich

Subjects

Mathematics::K-Theory and Homology, Rings and Algebras (math.RA), Mathematics::History and Overview, Mathematics::Rings and Algebras, FOS: Mathematics, Algebraic Topology (math.AT), Mathematics::Algebraic Topology

Abstract

In this paper we prove the Leibniz analogue of Whitehead's vanishing theorem for the Chevalley-Eilenberg cohomology of Lie algebras. As a consequence, we obtain the second Whitehead lemma for Leibniz algebras. Moreover, we compute the cohomology of several Leibniz algebras with adjoint or irreducible coefficients. Our main tool is a Leibniz analogue of the Hochschild-Serre spectral sequence, which is an extension of (the dual of) a spectral sequence of Pirashvili for Leibniz homology from symmetric bimodules to arbitrary bimodules., We correct here an error in an earlier version

Published

2019

4. Some Problems in the Representation Theory of Simple Modular Lie Algebras

Author

Benkart, Georgia and Feldvoss, J��rg

Subjects

17B50, 17B10, 17B20, 17B05, FOS: Mathematics, Representation Theory (math.RT)

Abstract

The finite-dimensional restricted simple Lie algebras of characteristic p > 5 are classical or of Cartan type. The classical algebras are analogues of the simple complex Lie algebras and have a well-advanced representation theory with important connections to Kazhdan-Lusztig theory, quantum groups at roots of unity, and the representation theory of algebraic groups. We survey progress that has been made towards developing a representation theory for the restricted simple Cartan-type Lie algebras, discuss comparable results in the classical case, formulate a couple of conjectures, and pose a dozen open problems for further study., References updated; a few minor changes made in this version

Published

2015

5. Restricted Lie algebras with maximal 0-PIM

Author

Feldvoss, J, Siciliano, S, Weigel, T, WEIGEL, THOMAS STEFAN, Feldvoss, J, Siciliano, S, Weigel, T, and WEIGEL, THOMAS STEFAN

Abstract

In this paper it is shown that the projective cover of the trivial irreducible module of a finite-dimensional solvable restricted Lie algebra is induced from the one dimensional trivial module of a maximal torus. As a consequence, the number of the isomorphism classes of irreducible modules with a fixed p-character for a finite-dimensional solvable restricted Lie algebra L is bounded above by pMT(L), where MT(L) denotes the maximal dimension of a torus in L. Finally, it is proved that in characteristic p > 3 the projective cover of the trivial irreducible L-module is induced from the one-dimensional trivial module of a torus of maximal dimension, only if L is solvable.

Published

2016

6. Grading Switching for Modular Non-Associative Algebras

Author

Avitabile, M, Feldvoss, J, Weigel, T, Mattarei, S, Avitabile, M, Feldvoss, J, Weigel, T, and Mattarei, S

Abstract

We describe a grading switching for arbitrary non-associative algebras of prime characteristic p, aimed at producing a new grading of an algebra from a given one. This is inspired by a fundamental tool in the classification theory of modular Lie algebras known as toral switching, which relies on a delicate adaptation of the exponential of a derivation. We trace the development of grading switching, from an early version based on taking the Artin-Hasse exponential of a nilpotent derivation, to a more general version which uses certain generalized Laguerre polynomials playing the role of generalized exponentials. Both versions depend on the existence of appropriate analogues of the functional equation e(x) . e(y) = e(x+y) for the classical exponential.

Published

2015

7. Split Strongly abelian p-chief factors and first degree restricted cohomology

Author

Feldvoss, J, Siciliano, S, Weigel, T, WEIGEL, THOMAS STEFAN, Feldvoss, J, Siciliano, S, Weigel, T, and WEIGEL, THOMAS STEFAN

Abstract

In this paper we investigate the relation between the multiplicities of split strongly abelian p-chief factors of finite-dimensional restricted Lie algebras and first degree restricted cohomology. As an application we obtain a characterization of solvable restricted Lie algebras in terms of the multiplicities of split strongly abelian p-chief factors. Moreover, we derive some results in the representation theory of restricted Lie algebras related to the principal block and the projective cover of the trivial irreducible module of a finite-dimensional restricted Lie algebra. In particular, we obtain a characterization of finite-dimensional solvable restricted Lie algebras in terms of the second Loewy layer of the projective cover of the trivial irreducible module. The analogues of these results are well known in the modular representation theory of finite groups. © 2014 Heldermann Verlag.

Published

2014

8. Outer restricted derivations of nilpotent restricted Lie algebras

Author

Feldvoss, J, Siciliano, S, Weigel, T, Feldvoss, J, Siciliano, S, and Weigel, T

Abstract

In this paper we prove that every finite-dimensional nilpotent restricted Lie algebra over a field of prime characteristic has an outer restricted derivation whose square is zero unless the restricted Lie algebra is a torus or it is one-dimensional or it is isomorphic to the three-dimensional Heisenberg algebra in characteristic two as an ordinary Lie algebra. This result is the restricted analogue of a result of Togo on the existence of nilpotent outer derivations of ordinary nilpotent Lie algebras in arbitrary characteristic and the Lie-theoretic analogue of a classical group-theoretic result of Gaschuetz on the existence of p-power automorphisms of p-groups. As a consequence we obtain that every finite-dimensional non-toral nilpotent restricted Lie algebra has an outer restricted derivation

Published

2013

9. Split abelian chief factors and first degree cohomology for Lie algebras

Author

Feldvoss, J, Siciliano, S, Weigel, T, WEIGEL, THOMAS STEFAN, Feldvoss, J, Siciliano, S, Weigel, T, and WEIGEL, THOMAS STEFAN

Abstract

In this paper we investigate the relation between the multiplicities of split abelian chief factors of finite-dimensional Lie algebras and first degree cohomology. In particular, we obtain a characterisation of modular solvable Lie algebras in terms of the vanishing of first degree cohomology or in terms of the multiplicities of split abelian chief factors. The analogues of these results are well known in the modular representation theory of finite groups. An important tool in the proof of these results is a refinement of a non-vanishing theorem of Seligman for the first degree cohomology of non-solvable finite-dimensional Lie algebras in prime characteristic. As an application we derive several results in the representation theory of restricted Lie algebras related to the principal block and the projective cover of the trivial irreducible module of a finite-dimensional restricted Lie algebra. In particular, we obtain a characterisation of solvable restricted Lie algebras in terms of the second Loewy layer of the projective cover of the trivial irreducible module.

Published

2013

10. Blocks and projective modules for reduced universal enveloping algebras of a nilpotent restricted Lie algebra

Author

Feldvoss, J�rg, primary

Published

1995

11. Existence of triangular Lie bialgebra structures

Author

Feldvoss, J.

Published

1999

12. The Structure of Hopf Algebras Acting on Dihedral Extensions

Author

Timothy Kohl, Alan Koch, Paul J. Truman, Robert Underwood, Feldvoss, J, Grimley, L, Lewis, D, Pavelescu, A, and Pillen, C

Subjects

Pure mathematics, Field extension, Mathematics::Quantum Algebra, Mathematics::Rings and Algebras, Structure (category theory), Isomorphism, Dihedral angle, Hopf algebra, Dihedral group, Prime (order theory), Separable space, Mathematics

Abstract

We discuss isomorphism questions concerning the Hopf algebras that yield Hopf–Galois structures for a fixed separable field extension L/K. We study in detail the case where L/K is Galois with dihedral group \(D_p\), \(p\ge 3\) prime and give explicit descriptions of the Hopf algebras which act on L/K. We also determine when two such Hopf algebras are isomorphic, either as Hopf algebras or as algebras. For the case \(p=3\) and a chosen L/K, we give the Wedderburn–Artin decompositions of the Hopf algebras.

Published

2019

13. Grading Switching for Modular Non-Associative Algebras

Author

Marina Avitabile, Sandro Mattarei, Avitabile, M, Feldvoss, J, Weigel, T, and Mattarei, S

Subjects

toral switching, Pure mathematics, Primary 17A36, secondary 33C52, 17B50, 17B65, Trace (linear algebra), Non-associative algebra, derivation, grading, Mathematics - Rings and Algebras, MAT/02 - ALGEBRA, Exponential function, Algebra, Nilpotent, Development (topology), Laguerre polynomial, Rings and Algebras (math.RA), Functional equation, Lie algebra, FOS: Mathematics, Laguerre polynomials, Artin-Hasse exponential, Associative property, restricted Lie algebra, Mathematics

Abstract

We describe a grading switching for arbitrary non-associative algebras of prime characteristic p, aimed at producing a new grading of an algebra from a given one. This is inspired by a fundamental tool in the classification theory of modular Lie algebras known as toral switching, which relies on a delicate adaptation of the exponential of a derivation. We trace the development of grading switching, from an early version based on taking the Artin-Hasse exponential of a nilpotent derivation, to a more general version which uses certain generalized Laguerre polynomials playing the role of generalized exponentials. Both versions depend on the existence of appropriate analogues of the functional equation exp(x).exp(y)=exp(x+y) for the classical exponential., Comment: 14 pages. arXiv admin note: text overlap with arXiv:1211.4432

Published

2015

14. Restricted Lie algebras with maximal 0-PIM

Author

Salvatore Siciliano, Jörg Feldvoss, Thomas Weigel, Feldvoss, Jorg, Siciliano, Salvatore, Weigel, Thomas, Feldvoss, J, Siciliano, S, and Weigel, T

Subjects

Restricted Lie algebras, p-character, reduced universal enveloping algebra, projective cover, projective indecomposable module, induced module, maximal 0-PIM, torus, solvable Lie algebra, number of irreducible modules, 010103 numerical & computational mathematics, (g,K)-module, 01 natural sciences, Combinatorics, Restricted Lie algebra, Lie algebra, Trivial representation, Projective cover, FOS: Mathematics, Isomorphism class, 0101 mathematics, Representation Theory (math.RT), 17B05, 17B30, 17B50, Mathematics, Discrete mathematics, Algebra and Number Theory, Restricted Lie algebra, projective cover, irreducible module, 010102 general mathematics, Torus, Mathematics - Rings and Algebras, MAT/02 - ALGEBRA, Rings and Algebras (math.RA), Maximal torus, Geometry and Topology, Mathematics - Representation Theory

Abstract

In this paper we show that the projective cover of the trivial irreducible module of a finite-dimensional solvable restricted Lie algebra is induced from the one-dimensional trivial module of a maximal torus. As a consequence, we obtain that the number of the isomorphism classes of irreducible modules with a fixed p-character for a finite-dimensional solvable restricted Lie algebra L is bounded above by p^MT(L), where MT(L) denotes the largest dimension of a torus in L. Finally, we prove that in characteristic p>3 the projective cover of the trivial irreducible L-module is only induced from the one-dimensional trivial module of a torus of maximal dimension if L is solvable., 18 pages

Published

2014

15. Split strongly abelian p-chief factors and first degree restricted cohomology

Author

Joerg FELDVOSS, T.h. WEIGEL, SICILIANO, Salvatore, Feldvoss, J, Siciliano, S, Weigel, T, Joerg, Feldvo, Siciliano, Salvatore, and Weigel, T. h.

Subjects

Restricted Lie algebra, 17B05, 17B30, 17B50, 17B55, 17B56, Multiplicity of a split strongly abelian p-chief factor, Transgression, Algebra and Number Theory, Irreducible module, Loewy layer, P-chief factor, cohomology of restricted Lie algebra, Mathematics - Rings and Algebras, Principal block, Split p-chief factor, MAT/02 - ALGEBRA, chief factor, Rings and Algebras (math.RA), Restricted cohomology, FOS: Mathematics, Projective indecomposable module, Strongly abelian p-chief factor, Representation Theory (math.RT), Solvable restricted lie algebra, Mathematics - Representation Theory

Abstract

In this paper we investigate the relation between the multiplicities of split strongly abelian p-chief factors of finite-dimensional restricted Lie algebras and first degree restricted cohomology. As an application we obtain a characterization of solvable restricted Lie algebras in terms of the multiplicities of split strongly abelian p-chief factors. Moreover, we derive some results in the representation theory of restricted Lie algebras related to the principal block and the projective cover of the trivial irreducible module of a finite-dimensional restricted Lie algebra. In particular, we obtain a characterization of finite-dimensional solvable restricted Lie algebras in terms of the second Loewy layer of the projective cover of the trivial irreducible module. The analogues of these results are well known in the modular representation theory of finite groups., Comment: 10 pages. arXiv admin note: substantial text overlap with arXiv:1206.3669

Published

2013

16. Split abelian chief factors and first degree cohomology for Lie algebras

Author

Jörg Feldvoss, Thomas Weigel, Salvatore Siciliano, Joerg, Feldvo, Siciliano, Salvatore, Thomas, Weigel, Feldvoss, J, Siciliano, S, and Weigel, T

Subjects

Solvable Lie algebra, 17B05, 17B30, 17B50, 17B55, 17B56, Pure mathematics, Algebra and Number Theory, Mathematics - Rings and Algebras, Killing form, MAT/02 - ALGEBRA, Representation theory, Affine Lie algebra, Lie conformal algebra, Algebra, Adjoint representation of a Lie algebra, Representation of a Lie group, cohomology of Lie algebras, chief factor, Rings and Algebras (math.RA), Fundamental representation, FOS: Mathematics, first degree cohomology for Lie algebras, Loewy series, projective cover of a module, Representation Theory (math.RT), Mathematics - Representation Theory, Mathematics

Abstract

In this paper we investigate the relation between the multiplicities of split abelian chief factors of finite-dimensional Lie algebras and first degree cohomology. In particular, we obtain a characterization of modular solvable Lie algebras in terms of the vanishing of first degree cohomology or in terms of the multiplicities of split abelian chief factors. The analogues of these results are well known in the modular representation theory of finite groups. An important tool in the proof of these results is a refinement of a non-vanishing theorem of Seligman for the first degree cohomology of non-solvable finite-dimensional Lie algebras in prime characteristic. As applications we derive several results in the representation theory of restricted Lie algebras related to the principal block and the projective cover of the trivial irreducible module of a finite-dimensional restricted Lie algebra. In particular, we obtain a characterization of solvable restricted Lie algebras in terms of the second Loewy layer of the projective cover of the trivial irreducible module., 12 pages; minor revisions

Published

2012

17. Outer restricted derivations of nilpotent restricted Lie algebras

Author

Thomas Weigel, Jörg Feldvoss, Salvatore Siciliano, Joerg, Feldvo, Siciliano, Salvatore, Thomas, Weigel, Feldvoss, J, Siciliano, S, and Weigel, T

Subjects

Restricted Lie algebra, Discrete mathematics, outer restricted derivation, Pure mathematics, Applied Mathematics, General Mathematics, restricted derivations, restricted Lie algebras, Universal enveloping algebra, Mathematics - Rings and Algebras, MAT/02 - ALGEBRA, nilpotent Lie algebra, Affine Lie algebra, Graded Lie algebra, Lie conformal algebra, Nilpotent Lie algebra, Adjoint representation of a Lie algebra, Rings and Algebras (math.RA), FOS: Mathematics, Nilpotent group, Mathematics, 17B05, 17B30, 17B40, 17B50, 17B55, 17B56

Abstract

In this paper we prove that every finite-dimensional nilpotent restricted Lie algebra over a field of prime characteristic has an outer restricted derivation whose square is zero unless the restricted Lie algebra is a torus or it is one-dimensional or it is isomorphic to the three-dimensional Heisenberg algebra in characteristic two as an ordinary Lie algebra. This result is the restricted analogue of a result of T\^og\^o on the existence of nilpotent outer derivations of ordinary nilpotent Lie algebras in arbitrary characteristic and the Lie-theoretic analogue of a classical group-theoretic result of Gasch\"utz on the existence of $p$-power automorphisms of $p$-groups. As a consequence we obtain that every finite-dimensional non-toral nilpotent restricted Lie algebra has an outer restricted derivation., Comment: 9 pages, minor revisions, to appear in Proc. Amer. Math. Soc

Published

2011