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locally confluent

A mapping

from a space

onto a space

is locally confluent if, for each point

of

, there is an open set

containing

such that $f^{-1}(\, \overline {U} \,)$$ is confluent.

Next: local homeomorphism Up: Definitions Previous: locally

Janusz J. Charatonik, Pawel Krupski and Pavel Pyrih
2001-11-30