依赖历史的操作符和准规则清扫过程

Fixed Point Theory and Applications Pub Date : 2022-02-14 DOI:10.1186/s13663-022-00715-w

Nacry, Florent, Sofonea, Mircea

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引用次数: 0

摘要

我们考虑了实数Hilbert空间中的抽象包含，该空间由一个几乎依赖历史的算子和一个具有准正则值的依赖时间的多映射控制。在适当的数据假设下，我们建立了包含的唯一可解性。该证明基于单调性、不动点和准正则性的论证。然后，我们使用我们的结果来推导出一些直接的结果，包括一类与准正则集相关的扫描过程的存在性和唯一性结果。最后，我们提供了一个受固体力学流变模型启发的有限维情况的例子。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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History-dependent operators and prox-regular sweeping processes

We consider an abstract inclusion in a real Hilbert space, governed by an almost history-dependent operator and a time-dependent multimapping with prox-regular values. We establish the unique solvability of the inclusion under appropriate assumptions on the data. The proof is based on the arguments of monotonicity, fixed point, and prox-regularity. We then use our result in order to deduce some direct consequences, including an existence and uniqueness result for a class of sweeping processes associated with prox-regular sets. Finally, we provide an example in a finite dimensional case inspired by a rheological model in solid mechanics.

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Fixed Point Theory and Applications MATHEMATICS, APPLIED-MATHEMATICS

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期刊介绍： In a wide range of mathematical, computational, economical, modeling and engineering problems, the existence of a solution to a theoretical or real world problem is equivalent to the existence of a fixed point for a suitable map or operator. Fixed points are therefore of paramount importance in many areas of mathematics, sciences and engineering. The theory itself is a beautiful mixture of analysis (pure and applied), topology and geometry. Over the last 60 years or so, the theory of fixed points has been revealed as a very powerful and important tool in the study of nonlinear phenomena. In particular, fixed point techniques have been applied in such diverse fields as biology, chemistry, physics, engineering, game theory and economics. In numerous cases finding the exact solution is not possible; hence it is necessary to develop appropriate algorithms to approximate the requested result. This is strongly related to control and optimization problems arising in the different sciences and in engineering problems. Many situations in the study of nonlinear equations, calculus of variations, partial differential equations, optimal control and inverse problems can be formulated in terms of fixed point problems or optimization.