Maximum modulus principle plays an important role in the complex analytics, and it is a powerful tool in studying the analytic function.
摘要最大模原理在复变函数论中占有重要的地位,是研究解析函数的有力工具。
This paper uses several methods of complex functions theorey to prove fundamental theorem of algebra by argument principle, maximum modulus principle and minimum modulus principle.
从复变函数理论出发,利用辐角原理、最大模原理、最小模原理给出代数学基本定理的几种新的证明方法。
This paper offers a direct verification of the maximum modulus principle. The method is simple and thus we might discuss the situation of the modulus change at any point of the region.
本文给出解析函数最大模原理一个较为直接的证明,方法简便,并可由此讨论区域内任一点处各方向上解析函数模的变化情况。
Based on the principle of modulus maximum, a new approach using scalogram of wavelet transform for transient signal, under noise free condition or noise condition separately, is described.
利用小波变换模极大值原理,提出了用小波变换尺度谱检测瞬态信号波至点的新方法,研究了其检测无噪声和有噪声条件下的瞬态信号的能力。
Based on the principle of modulus maximum, a new approach using scalogram of wavelet transform for transient signal, under noise free condition or noise condition separately, is described.
利用小波变换模极大值原理,提出了用小波变换尺度谱检测瞬态信号波至点的新方法,研究了其检测无噪声和有噪声条件下的瞬态信号的能力。
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