前向解结及其在连续性方程唯一性问题中的应用

S. Bianchini, P. Bonicatto
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引用次数: 1

摘要

我们引入了测量收敛向量ρ(1, b)的前向解纠缠拉格朗日表示的概念,其中ρ∈M+(Rd+1)和b: Rd+1→Rd是一个ρ可积的向量场,其中divt,x(ρ(1, b)) = μ∈M(R × Rd):前向解纠缠形式化了拉格朗日表示语言中的前向唯一性概念。我们确定了拉格朗日表示向前解缠的局部条件,并展示了如何从这些局部假设中推导出全局向前解缠。然后,我们展示了如何减少PDE分割,x(ρ(1, b)) = μ上的分割,得到了连接由拉格朗日表示的曲线。作为一个应用,我们恢复了单调向量场的流动和相关的连续性方程的已知的完备性结果。
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Forward untangling and applications to the uniqueness problem for the continuity equation
We introduce the notion of forward untangled Lagrangian representation of a measuredivergence vector-measure ρ(1, b), where ρ ∈ M+(Rd+1) and b : Rd+1 → Rd is a ρ-integrable vector field with divt,x(ρ(1, b)) = μ ∈ M(R × Rd): forward untangling formalizes the notion of forward uniqueness in the language of Lagrangian representations. We identify local conditions for a Lagrangian representation to be forward untangled, and we show how to derive global forward untangling from such local assumptions. We then show how to reduce the PDE divt,x(ρ(1, b)) = μ on a partition of R+ × Rd obtained concatenating the curves seen by the Lagrangian representation. As an application, we recover known well posedeness results for the flow of monotone vector fields and for the associated continuity equation.
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