导出了便于VLSI实现的多项式感知器的格型实现算法,进行了计算机模拟,并给出了相应的数值结果。
A new lattice polynomial perceptron (LPP) model is derived, which is very suitable for VLSI implementation. Computer simulations have been carried out and the experimental results are given.
提出在机群系统并行环境下的构造拉格朗日插值多项式的一种并行算法。
This paper presents a parallel algorithm for Lagrange's polynomial interpolation which is based on cluster parallel environment.
当位移和动量的拉格朗日多项式近似阶数满足一定条件时,可以自然导出保辛算法的不动点格式。
A fixed point iteration formula can be derived when the order of the approximate polynomials of displacements and momentum satisfy some certain conditions.
本文将车贝雪夫多项式推广到不规则格点上。
In this -paper Chebyshev polynomial is generalized into irregular grids.
但是,随着插值多项式次数的提高,计算误差会增大,出现龙格现象和不稳定。
But with the increasing of the order of interpolation polynomials, serious oscillation phenomena will appear, which will increase the computational error and affect instabilities of computations.
本文确定了任意格上一元多项式和二元多项式的结构,并给出了三元多项式的几个结果。
The structure of unary and binary polynomials over a lattice is determined in this paper.
在离散对数困难问题的条件下,利用不经意多项式估值协议和拉格朗日插值多项式来解密s2(方案2)。
Under the condition of a discrete logarithm problem, S2 is decrypted by the OPE (Oblivious Polynomial Evaluation) protocol and Lagrange Interpolation Polynomial (scheme 2).
本文确定了任意格上一元多项式和二元多项式的结构,并给出了三元多项式的几个结果。
The structure of unary and binary polynomials over a lattice is determined in this paper. Moreover, some remarks on trinary polynomials are offered.
本文确定了任意格上一元多项式和二元多项式的结构,并给出了三元多项式的几个结果。
The structure of unary and binary polynomials over a lattice is determined in this paper. Moreover, some remarks on trinary polynomials are offered.
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