A Study of the Relationship between Convex Sets and Connected Sets

Authors

  • Khem Raj Malla Mewar University, Rajasthan

DOI:

https://doi.org/10.3126/jaar.v6i1.35311

Keywords:

Connectedness, Convex sets, Function

Abstract

 The principal objective of this research article is to explore the relationship between convex sets and connected sets. All convex sets are connected but in all cases connected sets are not convex. In the Maly theorem,let X be a Banach space, and let f:X → R be a (Fr´echet-)differentiable function. Then, for any closed convex subset C of X with nonempty interior,the image Df(C) of C by the differential Df of f is a connected subset of X∗ , where X∗ stands for thetopological dual space of X.The result does not hold true if C has an empty interior. There are counterexamples even with functions f of two variables. This article concludes that convexity cannot be replaced with the connectedness of C.

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Author Biography

Khem Raj Malla, Mewar University, Rajasthan

PhD Scholar

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Published

2019-02-28

How to Cite

Malla, K. R. (2019). A Study of the Relationship between Convex Sets and Connected Sets. Journal of Advanced Academic Research, 6(1), 18–28. https://doi.org/10.3126/jaar.v6i1.35311

Issue

Vol. 6 No. 1 (2019)

Section

Articles

License

Copyright © Centre of Excellence for PhD Studies (PhD Centre)

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