Homotopy-equivalent topological spaces: Difference between revisions

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Two topological spaces are said to be homotopy-equivalent if there exists a homotopy equivalence of topological spaces between them.

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	==Definition==		==Definition==

	Two [[topological space]]s are said to be '''homotopy-equivalent''' if there exists a [[homotopy equivalence of topological spaces]] between them.		Two [[topological space]]s are said to be '''homotopy-equivalent''' if there exists a [[defining ingredient::homotopy equivalence of topological spaces]] between them.