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Polynomial Functions on a Central Relation
University of Toronto, Toronto, Canada May 19-May 22
DOI Bookmark: http://doi.ieeecomputersociety.org/10.1109/ISMVL.2004.131994834th International Symposium on Multi ...
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Dietmar Schweigert, "Polynomial Functions on a Central Relation," Multiple-Valued Logic, IEEE International Symposium on, pp. 242-244, 34th International Symposium on Multiple-Valued Logic (ISMVL'04), 2004.
 
 
BibTex
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@article{ 10.1109/ISMVL.2004.1319948,
author = {Dietmar Schweigert},
title = {Polynomial Functions on a Central Relation},
journal ={Multiple-Valued Logic, IEEE International Symposium on},
volume = {0},
year = {2004},
issn = {0195-623X},
pages = {242-244},
doi = {http://doi.ieeecomputersociety.org/10.1109/ISMVL.2004.1319948},
publisher = {IEEE Computer Society},
address = {Los Alamitos, CA, USA},
}
 
 
RefWorks Procite/RefMan/Endnote
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TY - CONF
JO - Multiple-Valued Logic, IEEE International Symposium on
TI - Polynomial Functions on a Central Relation
SN - 0195-623X
SP242
EP244
A1 - Dietmar Schweigert,
PY - 2004
KW - null
VL - 0
JA - Multiple-Valued Logic, IEEE International Symposium on
ER -
 
Dietmar Schweigert, University of Kaiserslautern
We Show that the algebra R = (R; \wedge ,\underline \vee ,0,\overline {f_i } (x)(i \in I)) is central polynomially complete. Every central polynomially complete algebra is finite. The clones on a set can be found of any finite and infinite cardinality.
Citation:
Dietmar Schweigert, "Polynomial Functions on a Central Relation," ismvl, pp.242-244, 34th International Symposium on Multiple-Valued Logic (ISMVL'04), 2004
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