Let $u \in BV(\Omega \subset \mathbb R^N, \mathbb{R}^N)$. Is it true that there exists a function $f$ in the weak $L^1$ space such that $$|u(y)-u(x)| \le |x-y|\big|f(y) - f(x)\big|$$ holds for a.e. $x,y$?
This question is motivated by Convergence of the difference quotient of a BV function.
A result of this kind can be found in [1] (Lemma A.3):
If $u\in BV(\mathbb R^N)$ then there exists a Lebesgue negligible set $F \subset \mathbb R^N$ such that $$ |u(x) - u(y)| \le c_N |x-y| (M_R Du(x) + M_R Du(y)) $$ for $x,y\in \mathbb R^N \setminus F$ with $|x-y|\le R$.
Here $$ M_R Du(x) = \sup_{r\in(0,R)} \frac{|Du|(B_r(x))}{|B_r(x)|}, $$ where $|B_r(x)|$ denotes the Lebesgue measure of $B_r(x)$.
From Lemma A.2 (which is stated for $L^1$ functions but holds for measures as well) if follows that $x\mapsto M_R Du(x)$ belongs to the weak $L^1$ space.
[1] De Lellis C., Crippa G. Estimates And Regularity Results For The Diperna–Lions Flow. J. Reine Angew. Math. 616 (2008), 15–46.
