The algebra AQ is called a quantum polynomial algebra.
代数AQ叫做量子多项式代数。
It runs on a variety of computer systems and is especially good at arithmetic involving arbitrary-length integers and fractions, graphics, and matrix and polynomial algebra.
它在各种各样的计算机系统上运行,尤其擅长于涉及任意长度整数和小数、图、矩阵和多项式代数的算术。
The Macaulay computer algebra system is useful for polynomial computations with emphasis on Grobner basis calculations.
Macaulay计算机代数系统对于多项式计算非常有用,并重点强调grobner基计算。
Polynomial modulo reduction algorithms are one of the fundamental issues of computer algebra, and widely used in coding algorithms and cryptographic system design.
多项式模归约算法是计算机代数中的基本问题之一,在编码算法和密码体制设计中有着广泛应用。
In the textbook of higher algebra, it is familiar to us that the remainder in the division operation of polynomial is on the basis of residue theorem and operated through division algorithm.
在高等代数教课书中,关于多项式的除法运算中余项的确定是以余式定理为依据且利用带余除法进行的,这是大家所熟悉的。
So in this paper, a new algorithm for the equivalence verification of high-level data paths based on polynomial symbolic algebra is proposed.
由此,以多项式符号代数为理论基础,提出了一个高层次数据通路的等价验证算法。
This research paper of proposition logic algebra in the said, on the basis of the solution of equations by polynomial, propositional formula for equivalent conversion and deductive reasoning.
在对命题逻辑代数化表示的基础上,通过解多项式方程组,对命题公式进行等价转换、演绎推理。
Also some concepts as moment invariants polynomial and moment invariants polynomial space were discussed so as to characterize its algebra structure.
不变矩多项式和不变矩多项式空间概念的引入,可以赋予不变矩多项式空间代数结构特征。
Also some concepts as moment invariants polynomial and moment invariants polynomial space were discussed so as to characterize its algebra structure.
不变矩多项式和不变矩多项式空间概念的引入,可以赋予不变矩多项式空间代数结构特征。
应用推荐