After analyzing the theory and structure of fuzzy controllers, the authors propose an improved polynomial reset incremental fuzzy controller.

Permutation polynomials play an important role in communication field.

Dickson polynomials are of special source of permutation polynomials over finite fields.

With some results of polynomial theory in finite field, a criterion theorem for a permutation polynomial to be an orthormorphic permutation polynomial is presented.

By analytic viewpoint, the author gives a proof of the result that the inverse of any permutation polynomial over Z/pnZ can be represented by a polynomial and so all permutation polynomials over Z/pnZ form a group according to the operation of composite of maps and reduction mod J.

The author studies a class of singular permutation polynomials in n(n≥3) indeterminates modulo p, gives a sufficient condition for them to be permutation polynomials modulo p l(l>1).

It reframes the traceback problem as a polynomial reconstruction problem, and uses techniques from algebraic coding theory to provide robust methods of transmission and reconstruction.

The additive subgroup generated by a multilinear polynomial;

Based on the general regular simplex interest region of ( q-1 ) dimension and multilinear polynomial model,An A optimal mixture design was suggested.

With respect to the multilinear polynomial model of q-1 degree on the standard simplex Sq-1 ,this paper discusses the A-optimal design for parameter estimation and gives an algorithm of A-optimal design.