AbstractIn this paper we find a necessary and sufficient condition for a Peirce grading of a Jordan algebra J to come from a Peirce decomposition with respect to an idempotent of a Jordan algebra J˜ containing J as a subalgebra. We also show that the above condition holds automatically when J is nondegenerate
Let V be a Jordan-Hilbert algebra (JH-algebra for short). By this we mean (1) V is a real Hilbert sp...
Estudamos a estrutura de álgebras de potências associativas que são álgebras train. Primeiramente, m...
Every tripotent e of a generalized Jordan triple system of second order uniquely defines a decomposi...
In attempting to investigate infinite-dimensional simple Jordan algebras / having rich supplies of i...
AbstractWe consider Jordan derivations of a unital algebra A having a nontrivial idempotent. It turn...
AbstractWe show that every finite Z-grading of a simple associative algebra A comes from a Peirce de...
A classification of idempotents in Clifford algebras Cp,q is presented. It is shown that using isomo...
AbstractA subspaceJof an anisotropic Jordan*-tripleAis said to be aninner idealif the subspace {JAJ}...
Introduction. It is well known that if A is an associative or alternative ring with an idempotent el...
AbstractIn this paper we work with a general Peirce decomposition. This decomposition generalizes th...
In 1981, Laffey described subalgebras of associative algebras generated by two idempotents, and show...
An element x of an associative algebra A is called diagonable provided A has a basis of characterist...
We study commutative algebras A over fields of characteristic ≠2, 3 which satisfy the identity β{x(y...
AbstractFor complex square matrices, the Levy–Desplanques theorem asserts that a strictly diagonally...
Let J be a Jordan algebra with 1. A subalgebra B of J is said to be full if 1 Î B and for any b in B...
Let V be a Jordan-Hilbert algebra (JH-algebra for short). By this we mean (1) V is a real Hilbert sp...
Estudamos a estrutura de álgebras de potências associativas que são álgebras train. Primeiramente, m...
Every tripotent e of a generalized Jordan triple system of second order uniquely defines a decomposi...
In attempting to investigate infinite-dimensional simple Jordan algebras / having rich supplies of i...
AbstractWe consider Jordan derivations of a unital algebra A having a nontrivial idempotent. It turn...
AbstractWe show that every finite Z-grading of a simple associative algebra A comes from a Peirce de...
A classification of idempotents in Clifford algebras Cp,q is presented. It is shown that using isomo...
AbstractA subspaceJof an anisotropic Jordan*-tripleAis said to be aninner idealif the subspace {JAJ}...
Introduction. It is well known that if A is an associative or alternative ring with an idempotent el...
AbstractIn this paper we work with a general Peirce decomposition. This decomposition generalizes th...
In 1981, Laffey described subalgebras of associative algebras generated by two idempotents, and show...
An element x of an associative algebra A is called diagonable provided A has a basis of characterist...
We study commutative algebras A over fields of characteristic ≠2, 3 which satisfy the identity β{x(y...
AbstractFor complex square matrices, the Levy–Desplanques theorem asserts that a strictly diagonally...
Let J be a Jordan algebra with 1. A subalgebra B of J is said to be full if 1 Î B and for any b in B...
Let V be a Jordan-Hilbert algebra (JH-algebra for short). By this we mean (1) V is a real Hilbert sp...
Estudamos a estrutura de álgebras de potências associativas que são álgebras train. Primeiramente, m...
Every tripotent e of a generalized Jordan triple system of second order uniquely defines a decomposi...
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