ACTA MATHEMATICA UNIVERSITATIS COMENIANAE
Vol. LXXV, 1 (2006)
p. 137 - 146
Regular additively inverse semirings
M. K. Sen and S. K. Maity
Abstract.
In this paper we show that in a regular additively inverse semiring (S, +, ×)
with 1 satisfying the conditions
(A) a(a + a') = a + a';
(B) a(b + b') = (b + b')a,
and (C) a + a(b + b') = a,
for all a, b Î S, the sum of two principal left ideals is again a principal left ideal.
Also, we decompose S as a direct sum of two
mutually inverse ideals.
Keywords:
Additive inverse semiring, regular semiring, mutually inverse ideals.
AMS Subject classification:16A78, 20M10, 20M07.
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