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Cartan's lemma (potential theory)

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In potential theory, a branch of mathematics, Cartan's lemma, named after Henri Cartan, is a bound on the measure and complexity of the set on which a logarithmic Newtonian potential is small.

Statement of the lemma

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The following statement can be found in Levin's book.[1]

Let μ be a finite positive Borel measure on the complex plane C with μ(C) = n. Let u(z) be the logarithmic potential of μ:

Given H ∈ (0, 1), there exist discs of radii ri such that

and

for all z outside the union of these discs.

Notes

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  1. ^ B.Ya. Levin, Lectures on Entire Functions