Mal'tsev and retral spaces

A space X is Mal&apos;tsev if there exists a continuous map M: X3 → X such that M(x, y, y) = x = M(y, y, x). A space X is retral if it is a retract of a topological group. Every retral...

Full description

Bibliographic Details
Main Authors:	Gartside, P, Reznichenko, E, Sipacheva, O
Format:	Journal article
Language:	English
Published:	Elsevier 1997
Subjects:	Algebraic topology

Mal'tsev and retral spaces

Similar Items