Partial regularity for an exponential PDE in crystal surface models
Abstract
We study the regularity properties of a weak solution to the boundary value problem for the equation - +a u=f in a bounded domain ⊂ RN, where =e-div(|∇ u|p-2∇ u+β0|∇ u|-1∇ u). This problem is derived from the mathematical modeling of crystal surfaces. It is known that the exponent term can exhibit singularity. In this paper we obtain a partial regularity result for the weak solution. It asserts that there exists an open subset 0⊂ such that |0|=0 and the exponent term is locally bounded in 0. Furthermore, if x0∈ 0, then vanishes of N+2- order at x0 for each ∈(0,2). Our results reveal that the exponent term behaves well if it stays away from negative infinity.
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