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Regularity of quasi-linear equations with Hörmander vector fields of step two (2110.04377v4)
Published 8 Oct 2021 in math.AP
Abstract: If the smooth vector fields $X_1,\ldots,X_m$ and their commutators span the tangent space at every point in $\Omega\subseteq \mathbb{R}N$ for any fixed $m\leq N$, then we establish the full interior regularity theory of quasi-linear equations $\sum_{i=1}m X_i*A_i(X_1u, \ldots,X_mu)= 0$ with $p$-Laplacian type growth condition. In other words, we show that a weak solution of the equation is locally $C{1,\alpha}$.