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Pu's inequality

 Home Mathematics Fields of mathematics Geometry Theorems in geometry Geometric inequalities
 0 By others on same topic  0 Discussions  1970-01-01  See my version
Pu's inequality is a result in the field of real analysis, particularly concerning measures and integration. It is associated with the properties of measurable functions and the way in which their integrals behave relative to their suprema. Specifically, Pu's inequality provides a bound on the integral of a non-negative measurable function.

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  1. Geometric inequalities
  2. Theorems in geometry
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