Banach space and Milman–Pettis theorem

Shortcuts: Differences, Similarities, Jaccard Similarity Coefficient, References.

Difference between Banach space and Milman–Pettis theorem

Banach space vs. Milman–Pettis theorem

In mathematics, more specifically in functional analysis, a Banach space (pronounced) is a complete normed vector space. In mathematics, the Milman–Pettis theorem states that every uniformly convex Banach space is reflexive.

Similarities between Banach space and Milman–Pettis theorem

Banach space and Milman–Pettis theorem have 3 things in common (in Unionpedia): Mathematics, Reflexive space, Uniformly convex space.

Mathematics

Mathematics (from Greek μάθημα máthēma, "knowledge, study, learning") is the study of such topics as quantity, structure, space, and change.

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Reflexive space

In the area of mathematics known as functional analysis, a reflexive space is a Banach space (or more generally a locally convex topological vector space) that coincides with the continuous dual of its continuous dual space, both as linear space and as topological space.

Banach space and Reflexive space · Milman–Pettis theorem and Reflexive space · See more »

Uniformly convex space

In mathematics, uniformly convex spaces (or uniformly rotund spaces) are common examples of reflexive Banach spaces.

Banach space and Uniformly convex space · Milman–Pettis theorem and Uniformly convex space · See more »

The list above answers the following questions

What Banach space and Milman–Pettis theorem have in common
What are the similarities between Banach space and Milman–Pettis theorem

Banach space and Milman–Pettis theorem Comparison

Banach space has 158 relations, while Milman–Pettis theorem has 7. As they have in common 3, the Jaccard index is 1.82% = 3 / (158 + 7).

References

This article shows the relationship between Banach space and Milman–Pettis theorem. To access each article from which the information was extracted, please visit:

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