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The problem is trickier than I initially thought, but with the corrected condition it can be done. I need to assume that $\sum c_n \delta_n$ is conditionally but not absolutely convergent, $0 < \delta …

Since Pietro Majer definitely was right about the structure of the set but hasn't supplied a proof let me jump in with an elementary one. I think the problem is to specific to find a reference, but it …

I assume that by maximal you mean with respect to inclusion. Then the answer is no. Consider the following counterexample on the real line: Let $\mathcal{B}_\epsilon := \epsilon\mathbb{Z}$ and $\widet …

If I am not missing something then the corrected statements look equivalent to me on the level of sets, no need for smoothness. Fix $\tau > 0$ and assume that 1. holds. For any $t\geq \tau$ and $y \in …

Related to Nate River's answer, I personally prefer to think of Young measures as single measures $\nu$ on $U \times \mathbb{R}^m$, which have the condition that their projection on the first componen …

In Evans & Gariepy's "Measure theory and fine properties of functions", Sec. 5.3., they construct the trace operator on a bounded Lipschitz domain $\Omega$ for BV-functions (and thus by inclusion for …

This is not a full answer, since I do not know the counterexample Lin refers to, but I can offer some explanations and guesses which are too long for a comment: You can define a first variation for cu …