Permanental Polynomial Identities on Matrix Rings

In the present paper we study generalized functional identities involving multiadditive functions. Our results simultaneously generalize Martindale's theorem on prime rings with generalized polynomial identities and Bresar's results on general-ǐzed functional identities of degree two.

Let A be a prime ring with involution ), let S be the symmetric elements, let K be the skew elements, let Q be the maximal left ring of quotients, x , . . . , x m l 1 m

We study G-gradings of the matrix ring M k , k a field, and give a complete n description of the gradings where all the elements e are homogeneous, called i, j good gradings. Among these, we determine the ones that are strong gradings or < < crossed products. If G is a finite cyclic group and k cont

We give a matrix generalization of the family of exponential polynomials in one variable , k (x). Our generalization consists of a matrix of polynomials 8 k (X)= (8 (k) i, j (X)) n i, j=1 depending on a matrix of variables X=(x i, j ) n i, j=1 . We prove some identities of the matrix exponential pol