AbstractIn this paper, we want to give an explicit description of identities satisfied by matrices n × n over a field k of characteristic 0, in order to be able to compute with formal matrices (“forgetting” their representations with coefficients). We introduce a universal free algebra, where all formal manipulations are made. Using classical properties of identities in an algebra with trace, we reduce our problem to the study of identities among multilinear traces. These are closely linked with the action of the algebra of the symmetric group k[Sm] on the mth tensor product of E = Kn. By proving a theorem about the kernel of this action and its effective version, we can decompose all identities of matrices in an explicit way as linear comb...
AbstractWe consider G-graded polynomial identities of the p×p matrix algebra Mp(K) over a field K of...
AbstractWe present an algorithm for computing an independent generating set for the multilinear iden...
Let m > 1 be a positive integer, F be a field, K2m( F, t) be the subspace of M2 m(F) of matrices sk...
AbstractIn this paper, we want to give an explicit description of identities satisfied by matrices n...
AbstractWe prove that a Q-algebra R with formal trace can be realized as n × n matrices if and only ...
Motivated by the fundamental lower bounds questions in proof complexity, we initiate the study of ma...
AbstractA simple criterion for trace identities of n × n matrices over a commutative ring is given, ...
grantor: University of TorontoIn this thesis we are concerned with building logical founda...
AbstractFirst we construct an algebra satisfying the polynomial identity [[x,y],[u,v]]=0, but none o...
Abstract: We look at the theory of *-polynomial identi-ties of the algebra of n X n matrices over a ...
AbstractLet n be a positive, even integer and let Kn(F) denote the subspace of skew-symmetric matric...
We look at the theory of -polynomial identities of the algebra of n X n matrices over a field. The r...
AbstractThe aim of this paper is to find an (upper) bound for the multiplicities of the cocharacters...
AbstractIn this paper we study the graded identities satisfied by the superalgebras Ma,b over the Gr...
AbstractThe algebraic relations between minors of a generic matrix are of great interest in many dom...
AbstractWe consider G-graded polynomial identities of the p×p matrix algebra Mp(K) over a field K of...
AbstractWe present an algorithm for computing an independent generating set for the multilinear iden...
Let m > 1 be a positive integer, F be a field, K2m( F, t) be the subspace of M2 m(F) of matrices sk...
AbstractIn this paper, we want to give an explicit description of identities satisfied by matrices n...
AbstractWe prove that a Q-algebra R with formal trace can be realized as n × n matrices if and only ...
Motivated by the fundamental lower bounds questions in proof complexity, we initiate the study of ma...
AbstractA simple criterion for trace identities of n × n matrices over a commutative ring is given, ...
grantor: University of TorontoIn this thesis we are concerned with building logical founda...
AbstractFirst we construct an algebra satisfying the polynomial identity [[x,y],[u,v]]=0, but none o...
Abstract: We look at the theory of *-polynomial identi-ties of the algebra of n X n matrices over a ...
AbstractLet n be a positive, even integer and let Kn(F) denote the subspace of skew-symmetric matric...
We look at the theory of -polynomial identities of the algebra of n X n matrices over a field. The r...
AbstractThe aim of this paper is to find an (upper) bound for the multiplicities of the cocharacters...
AbstractIn this paper we study the graded identities satisfied by the superalgebras Ma,b over the Gr...
AbstractThe algebraic relations between minors of a generic matrix are of great interest in many dom...
AbstractWe consider G-graded polynomial identities of the p×p matrix algebra Mp(K) over a field K of...
AbstractWe present an algorithm for computing an independent generating set for the multilinear iden...
Let m > 1 be a positive integer, F be a field, K2m( F, t) be the subspace of M2 m(F) of matrices sk...