On a variety of commutative multiplicatively idempotent semirings
classification
🧮 math.RA
keywords
semiringscommutativeidempotentmultiplicativelyvarietyalthoughdescribefinite
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We prove that the variety V of commutative multiplicatively idempotent semirings satisfying x + y + xyz = x + y is generated by single semirings. Moreover, we describe a normal form system for terms in V and we show that the word problem in V is solvable. Although V is locally finite, it is residually big.
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