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Optimal Shape of a Blob

Mathematical Physics 2009-11-13 v1 math.MP

Abstract

This paper presents the solution to the following optimization problem: What is the shape of the two-dimensional region that minimizes the average L_p distance between all pairs of points if the area of this region is held fixed? [The L_p distance between two points x=(x1,x2){\bf x}=(x_1,x_2) and y=(y1,y2){\bf y}=(y_1,y_2) in 2\Re^2 is (x1y1p+x2y2p)1/p(|x_1-y_1|^p+|x_2-y_2|^p)^{1/p}.] Variational techniques are used to show that the boundary curve of the optimal region satisfies a nonlinear integral equation. The special case p=2 is elementary and for this case the integral equation reduces to a differential equation whose solution is a circle. Two nontrivial special cases, p=1 and p=\infty, have already been examined in the literature. For these two cases the integral equation reduces to nonlinear second-order differential equations, one of which contains a quadratic nonlinearity and the other a cubic nonlinearity.

Cite

@article{arxiv.math-ph/0703025,
  title  = {Optimal Shape of a Blob},
  author = {Carl M. Bender and Michael A. Bender},
  journal= {arXiv preprint arXiv:math-ph/0703025},
  year   = {2009}
}

Comments

10 pages, 1 figure