Regularity of quasi-linear equations with H\"ormander vector fields of step two

Abstract

If the smooth vector fields X1,…,Xm and their commutators span the tangent space at every point in ⊂eq RN for any fixed m≤ N, then we establish the full interior regularity theory of quasi-linear equations Σi=1m Xi*Ai(X1u, …,Xmu)= 0 with p-Laplacian type growth condition. In other words, we show that a weak solution of the equation is locally C1,α.

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