Hölder Estimates for the Gradient
Chapter
Abstract
In this chapter we derive interior and global Hölder estimates for the derivatives of solutions of quasilinear elliptic equations of the form
in a bounded domain Ω. From the global results we shall see that Step IV of the existence procedure described in Chapter 10 can be carried out if, in addition to the hypotheses of Theorem 10.4, we assume that either the coefficients a ij are in \(C^1(\bar{\Omega}\times {\rm R} \times {\rm R}^n)\) or that Q is of divergence form or that n = 2. The estimates of this chapter will be established through a reduction to the results of Chapter 8, in particular to Theorems 8.18, 8.24, 8.26 and 8.29.
$$
Qu = a^{ij} \left( {x,u,Du} \right)D_{ij} u + b\left( {x,u,Du} \right) = 0
$$
(12.1)
Keywords
Dirichlet Problem Divergence Form Quasilinear Elliptic Equation Boundary Estimate Interior Estimate
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© Springer-Verlag Berlin Heidelberg 1977