Optimal gradient estimates of solutions to the insulated conductivity problem in dimension greater than two
Hongjie Dong, Yanyan Li, Zhuolun Yang
Abstract
We study the insulated conductivity problem with inclusions embedded in a bounded domain in \mathbb{R}^{n} . The gradient of solutions may blow up as \varepsilon , the distance between inclusions, approaches to 0 . It was known that the optimal blow-up rate in dimension n = 2 is of order \varepsilon^{-1/2} . It has recently been proved that in dimensions n \ge 3 , an upper bound of the gradient is of order \varepsilon^{-1/2 + \beta} for some \beta > 0 . On the other hand, optimal values of \beta have not been identified. In this paper, we prove that when the inclusions are balls, the optimal value of \beta is [-(n-1)+\sqrt{(n-1)^{2}+4(n-2)}]/4 \in (0,1/2) in dimensions n \ge 3 .
Topics & Concepts
MathematicsDimension (graph theory)Mathematical analysisApplied mathematicsConductivityMathematical optimizationCombinatoricsPhysical chemistryChemistryAdvanced Mathematical Modeling in EngineeringNumerical methods in inverse problemsNonlinear Partial Differential Equations