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Pure Mathematics 2020

Banach空间中变分包含组问题的强收敛性
A Strong Convergence Theorem for a General System of Variational Inclusions in Banach Spaces

DOI: 10.12677/PM.2020.107077, PP. 638-647

朱玪艳

Keywords: 向前–向后分裂方法，变分包含组，q-一致光滑的Banach空间，λ-强伪压缩
Forward-Backward Spliting Method, General Systems of Variational Inclusions, q-Uniformly Smooth Banach Spaces, λ-Strict Pseudocontraction

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Abstract:

本文主要介绍了Banach空间中的变分包含组问题，同时构造了用于就解决逆强增生映像的变分包含组问题和λ-强伪压缩映射的公共不动点问题解的迭代方法。在一定的条件下，当空间为一致凸且q-一致光滑的Banach空间时，结合经典的向前向后分裂方法，完成了问题解的强收敛性的证明。
In this paper, a general system of variational inclusion in Banach spaces is introduced. An iterative method for finding solutions of a general system of variational inclusions with inverse-strongly ac-cretive mapping and common set of fixed points for a λ-strict pseudocontraction is established. Under the suitable conditions, by forward-backward splitting method, it is proved that there is strong convergence theorem for the problem in uniformly convex and q-uniformly smooth Banach spaces.

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Banach空间中变分包含组问题的强收敛性A Strong Convergence Theorem for a General System of Variational Inclusions in Banach Spaces

Banach空间中变分包含组问题的强收敛性
A Strong Convergence Theorem for a General System of Variational Inclusions in Banach Spaces