On Polynomial Identities in Associative and Jordan Pairs

It is proved that Jordan pairs P(n, m) = (Mn. m, Mm,. ) of n X m matrices over a field k are distinguished up to embedding by means of polynomial identities. Also, a basis of identities of P(1, n), where n can be infinite and the characteristic of k is equal to zero, is found. © Elsevier Science Inc

We determine the identities of degree F 9 satisfied by the new ternary opera-Ž . tions abc q bca q cab q acb q bac q cba symmetric sum , abc q bca q cab y Ž . Ž . acb y bac y cba alternating sum , and abc q bca q cab cyclic sum on every Ž . Ž . triple system satisfying the total associativity identi

We use operational identities to introduce multivariable Laguerre polynomials. We explore the wealth of di erential equations they satisfy. We analyze their properties and the link with Legendre-type polynomials.

Let A be a finitely generated superalgebra over a field F of characteristic 0. To the graded polynomial identities of A one associates a numerical sequence {c sup n (A)} n 1 called the sequence of graded codimensions of A. In case A satisfies an ordinary polynomial identity, such sequence is exponen