摘 要函数序列的一致收敛性理论是数学分析的一个重要内容。在众多数学分析讲义中给出了函数序列一致收敛的一些判别方法,但是这些方法仍不够全面,并不能解决大多数函数序列的一致收敛问题。因此,文章简要地阐述了函数序列一致收敛的研究背景以及研究意义,归纳总结了比较实用的六种函数序列一致收敛的判别方法,并对它们的应用做了相应的说明与举例,以便于读者更好的理解这些判别方法,为今后处理函数序列一致收敛的判别提供便利。同时文章提出MATLAB在函数序列一致收敛判别上的应用,给出解题的程序代码步骤,并通过几个例子说明,实现了信息技术在数学分析中的有效融合,并得到实验的验证。这对于研究函数序列一致收敛及其收敛区间具有较大的作用。关 键 词 : 函数序列;一致收敛;MATLAB编程AbstractThe theory of uniform convergence of function sequence is an important content of mathematical analysis. In many lecture notes of mathematical analysis, some methods to judge the uniform convergence of function sequences are given, but these methods are still not comprehensive enough to solve the problem of uniform convergence of most function sequences. Consequently, the research background and significance of uniform convergence of function sequences are briefly described in this paper, summarizes six practical methods for judging the uniform convergence of function sequences, and gives corresponding explanations and examples for their applications, so as to facilitate the readers to better understand these methods and provide convenience for dealing with the uniform convergence of function sequences in the future. At the same time, the paper puts forward the application of MATLAB in the judgment of uniform convergence of function sequence, gives the procedure code steps of solving problems, and through several examples, realizes the effective integration of information technology in mathematical analysis, and is verified by experiments. It is imp...
