Sufficent Conditions for the preservation of Path-Connectedness in an arbitrary metric space

Abstract

It is proven that if (X,d) is an arbitrary metric space and U is a path-connected subset of X with M:=\xi:\ i∈\1,2,…,k\\⊂ int(U) , then the property of path-connectedness is also preserved in the resulting set U M, provided that the boundary of each open ball of X is a non-empty and path-connected set. Moreover, under appropriate conditions we extend the above result in the case where the set M is countably infinite. As a consequence these results maintain path-connectedness for domains with holes.

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