For a Nonclosing Field, Every Algebraic Variety is a Hypersurface, or All of Space. (Short Communication).

Theodore S. Motzkin

For a Nonclosing Field, Every Algebraic Variety is a Hypersurface, or All of Space. (Short Communication).

Theodore S. Motzkin

Aequationes mathematicae (1970)

Volume: 5, page 335-335
ISSN: 0001-9054; 1420-8903/e

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Motzkin, Theodore S.. "For a Nonclosing Field, Every Algebraic Variety is a Hypersurface, or All of Space. (Short Communication).." Aequationes mathematicae 5 (1970): 335-335. <http://eudml.org/doc/182363>.

@article{Motzkin1970,
author = {Motzkin, Theodore S.},
journal = {Aequationes mathematicae},
pages = {335-335},
title = {For a Nonclosing Field, Every Algebraic Variety is a Hypersurface, or All of Space. (Short Communication).},
url = {http://eudml.org/doc/182363},
volume = {5},
year = {1970},
}

TY - JOUR
AU - Motzkin, Theodore S.
TI - For a Nonclosing Field, Every Algebraic Variety is a Hypersurface, or All of Space. (Short Communication).
JO - Aequationes mathematicae
PY - 1970
VL - 5
SP - 335
EP - 335
UR - http://eudml.org/doc/182363
ER -

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