Strong de Morgan's law and the spectrum of a commutative ring

function q : U -+AS with q(u) = a, q(b) = 0, q(c) = c. Then q = a + 0 + c -a0 -ac be + abc = a + c. Corollary 2.9. If K = R a' s a field of chrircccteristl'c 0 and S is nny finite semilcctiice. each element of Qd(S) may be realized i i i IT(&').

By JAMES A. RATE and JOHN K . LUEDEMAN of Clemson (I7.S.A.) (Eingegangen am 22. 11. 1979) REES matrix semigroups &I= (S, ,I, -1, P) over a semigroup correspond loosely to the n X n matrix rings over it ring R. It is well known that &(R,)x .=(&(R)),,. Moreover, when S is it finite BRANDT semigroup, S

The theory of rings of quotients of a given ring has been developed by many authors including Asmo [ l ] , JOHNSON [6], UTUMI [ l l ] , and STENSTEOM [lo]. A corresponding theory of semigroups of quotients has been studied by BERTHUUME [3], MOMORRIS [8], and &KLE [6]. LUEDEMAN [7] has begun the deve

Gilmer and Heinzer proved that given a reduced ring R, a polynomial f divides a monic polynomial in R[X] if and only if there exists a direct sum decomposition of R = R0 ⊕ . . . ⊕ Rm (m ≤ deg f ), associated to a fundamental system of idempotents e0, . . . , em, such that the component of f in each