The concept of essential minimality for closed sets of multiple-valued logical functions is introduced and studied. Principal results include: (1) any essentially minimal closed set can be generated by a single function and (2) the number of essentially minimal closed sets is finite.
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Hajime MACHIDA, "Essentially Minimal Closed Sets in Multiple-Valued Logic" in IEICE TRANSACTIONS on transactions,
vol. E64-E, no. 4, pp. 243-245, April 1981, doi: .
Abstract: The concept of essential minimality for closed sets of multiple-valued logical functions is introduced and studied. Principal results include: (1) any essentially minimal closed set can be generated by a single function and (2) the number of essentially minimal closed sets is finite.
URL: https://global.ieice.org/en_transactions/transactions/10.1587/e64-e_4_243/_p
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@ARTICLE{e64-e_4_243,
author={Hajime MACHIDA, },
journal={IEICE TRANSACTIONS on transactions},
title={Essentially Minimal Closed Sets in Multiple-Valued Logic},
year={1981},
volume={E64-E},
number={4},
pages={243-245},
abstract={The concept of essential minimality for closed sets of multiple-valued logical functions is introduced and studied. Principal results include: (1) any essentially minimal closed set can be generated by a single function and (2) the number of essentially minimal closed sets is finite.},
keywords={},
doi={},
ISSN={},
month={April},}
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TY - JOUR
TI - Essentially Minimal Closed Sets in Multiple-Valued Logic
T2 - IEICE TRANSACTIONS on transactions
SP - 243
EP - 245
AU - Hajime MACHIDA
PY - 1981
DO -
JO - IEICE TRANSACTIONS on transactions
SN -
VL - E64-E
IS - 4
JA - IEICE TRANSACTIONS on transactions
Y1 - April 1981
AB - The concept of essential minimality for closed sets of multiple-valued logical functions is introduced and studied. Principal results include: (1) any essentially minimal closed set can be generated by a single function and (2) the number of essentially minimal closed sets is finite.
ER -