Abstract
For a free module of finite rank over a commutative (local) ring, the group of projectivities of the associated projective space is shown to be isomorphic to the group of geometric semi-isomorphisms of the associated geometric space of orbits. (author). 7 refs.
Citation Formats
Bhattarai, H N.
Orbit spaces over commutative rings and projectives as semi-isomorphisms.
IAEA: N. p.,
1992.
Web.
Bhattarai, H N.
Orbit spaces over commutative rings and projectives as semi-isomorphisms.
IAEA.
Bhattarai, H N.
1992.
"Orbit spaces over commutative rings and projectives as semi-isomorphisms."
IAEA.
@misc{etde_10126151,
title = {Orbit spaces over commutative rings and projectives as semi-isomorphisms}
author = {Bhattarai, H N}
abstractNote = {For a free module of finite rank over a commutative (local) ring, the group of projectivities of the associated projective space is shown to be isomorphic to the group of geometric semi-isomorphisms of the associated geometric space of orbits. (author). 7 refs.}
place = {IAEA}
year = {1992}
month = {Nov}
}
title = {Orbit spaces over commutative rings and projectives as semi-isomorphisms}
author = {Bhattarai, H N}
abstractNote = {For a free module of finite rank over a commutative (local) ring, the group of projectivities of the associated projective space is shown to be isomorphic to the group of geometric semi-isomorphisms of the associated geometric space of orbits. (author). 7 refs.}
place = {IAEA}
year = {1992}
month = {Nov}
}