有界域中时空分式方程的奇异解

Hardy Chan, David Gómez-Castro, Juan Luis Vázquez
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引用次数: 0

摘要

本文致力于描述在有界域中提出的涉及分数-时间导数和自交积分-微分空间算子的线性扩散问题。本文的一个主要关注点是处理奇异边界数据,这是空间分数扩散算子的典型特征;另一个关注点是统一考虑分数-时间卡普托导数和黎曼-刘维尔导数。我们首先利用谱理论构建问题的经典解,并讨论相应的分数-时间常微分方程。我们利用这些分数-时间导数之间的对偶性,引入了加权可积分数据的弱对偶解概念。作为本文的主要结果,我们证明了初值和边界值问题在此意义上的好求解性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Singular solutions for space-time fractional equations in a bounded domain

Singular solutions for space-time fractional equations in a bounded domain

This paper is devoted to describing a linear diffusion problem involving fractional-in-time derivatives and self-adjoint integro-differential space operators posed in bounded domains. One main concern of our paper is to deal with singular boundary data which are typical of fractional diffusion operators in space, and the other one is the consideration of the fractional-in-time Caputo and Riemann–Liouville derivatives in a unified way. We first construct classical solutions of our problems using the spectral theory and discussing the corresponding fractional-in-time ordinary differential equations. We take advantage of the duality between these fractional-in-time derivatives to introduce the notion of weak-dual solution for weighted-integrable data. As the main result of the paper, we prove the well-posedness of the initial and boundary-value problems in this sense.

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