有膜介质中的扩散和一些非局部抛物问题

Pub Date : 2024-04-20 DOI:10.1007/s11253-024-02285-z
Bohdan Kopytko, Mykhailo Osypchuk, Roman Shevchuk
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引用次数: 0

摘要

我们建立了一维(关于空间变量)科尔莫哥罗夫反向方程的某个共轭问题的经典可解性,该方程具有不连续系数和在所考虑的曲线域的非光滑边界上给出的某些版本的一般非局部费勒-文采尔边界条件。此外,我们还证明,由该问题的解定义的双参数费勒半群描述了实线给定区域内具有移动膜的某些非均质扩散过程。我们还展示了所构建的过程与 M. I. Portenko 意义上的广义扩散之间的关系。
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Diffusion in Media with Membranes and Some Nonlocal Parabolic Problems

We establish the classical solvability of a certain conjugation problem for one-dimensional (with respect to a spatial variable) Kolmogorov backward equation with discontinuous coefficients and some versions of the general nonlocal Feller–Wentzell boundary condition given on nonsmooth boundaries of the considered curvilinear domains. In addition, we prove, that the two-parameter Feller semigroup defined by the solution of this problem describes some inhomogeneous diffusion process with moving membranes on the given region of the real line. We also show the relationship between the constructed process and the generalized diffusion in a sense of M. I. Portenko.

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