We study minimum-energy frames with compact supports which correspond to some refinable functions with compact supports, and we give a precise existence criterion for minimum-energy frames in terms of an inequality condition on the Laurent polynomial symbols of the refinable functions.

We considered the nonexistence of Laurent polynomial first integrals for periodic system.

This paper constructs a class of infinite simple Lie triple systems from the derivation of Laurent-polynomial algebra F[t, t-1].

In this paper we deal with the Symbolic computing in the general used of WU s Method and mathematical computing, To save the input Symbolic polynomial, we designed a data structure to show the rational coefficient polynomial.