logarithmically convexの例文

例文

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  1. An important example of a logarithmically convex function is the gamma function on the positive reals ( see also the Bohr Mollerup theorem ).
  2. The intersection of logarithmically convex Reinhardt domains is still a logarithmically convex Reinhardt domain, so for every Reinhardt domain, there is a smallest logarithmically convex Reinhardt domain which contains it.
  3. The intersection of logarithmically convex Reinhardt domains is still a logarithmically convex Reinhardt domain, so for every Reinhardt domain, there is a smallest logarithmically convex Reinhardt domain which contains it.
  4. The intersection of logarithmically convex Reinhardt domains is still a logarithmically convex Reinhardt domain, so for every Reinhardt domain, there is a smallest logarithmically convex Reinhardt domain which contains it.
  5. The Bohr Mollerup theorem proves that these properties, together with the assumption that be logarithmically convex ( or " super-convex " ), uniquely determine for positive, real inputs.

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