Optimal discrete measures for Riesz potentials
Abstract
For s≥slant d, we obtain the leading term as N ∞ of the maximal weighted N-point Riesz s-polarization (or Chebyshev constant) for a certain class of d-rectifiable compact subsets of Rp. This class includes compact subsets of d-dimensional C1 manifolds whose boundary relative to the manifold has Hd-measure zero, as well as finite unions of such sets when their pairwise intersections have Hd-measure zero. We also explicitly find the weak* limit distribution of asymptotically optimal N-point polarization configurations as N ∞.
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