Gradient estimates for the insulated conductivity problem: the case of m-convex inclusions
Abstract
We consider an insulated conductivity model with two neighboring inclusions of m-convex shapes in Rd when m≥2 and d≥3. We establish the pointwise gradient estimates for the insulated conductivity problem and capture the gradient blow-up rate of order -1/m+β with β=[-(d+m-3)+(d+m-3)2+4(d-2)]/(2m)∈(0,1/m), as the distance between these two insulators tends to zero. In particular, the optimality of the blow-up rate is also demonstrated for a class of axisymmetric m-convex inclusions.
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