粗糙系数常微分方程与Ambrosio的重整化定理[源自Ambrosio, DiPerna, Lions]

IF 1 4区数学 Q1 MATHEMATICS

Asterisque Pub Date : 2008-01-01 DOI:10.5167/UZH-21441

Camillo De Lellis

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引用次数: 12

摘要

在近20年前的一篇开创性论文中，R.J.迪珀纳和p.l。狮子开创了重整化解理论，以研究具有不连续系数的常微分方程和输运方程的适定性。在最近的工作中，L. Ambrosio解决了将该理论扩展到BV系数的长期开放问题，BV系数是具有跳跃不连续的经典函数的最常见的泛函解析闭包。安布罗西奥定理除了其固有的兴趣外，还被用于解决偏微分方程中的相关问题，并为一系列新问题开辟了道路。

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Ordinary differential equations with rough coefficients and the renormalization theorem of Ambrosio [after Ambrosio, DiPerna, Lions]

In a seminal paper of almost 20 years ago, R.J. DiPerna and P.-L. Lions initiated the theory of renormalized solutions to study the well-posedness of Ordinary Differential Equations and Transport Equations with discontinuous coefficients. In a recent work L. Ambrosio solved the long-standing open problem of extending this theory to BV coefficients, the most common functional-analytic closure of classical functions with jump discontinuities. Besides its intrinsic interest, Ambrosio's Theorem has been used to solve relevant problems in Partial Differential Equations and it opened the way to a series of new questions.

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来源期刊

Asterisque MATHEMATICS-

CiteScore

2.90

自引率

0.00%

发文量

审稿时长

>12 weeks

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