Theorem on the residue of a pseudoresolvent

It is well known that if a,, . , a, are residues module n and m an then some sum ai, + . . .+q,, iI<...<&, is 0 (mod n). In recent related work, Sydney Bulman-Fleming and Edward T.H. Wang have studied what they call n-divisible subsequences of a finite sequence u, and made a number of conjectures. W

## Let be a locally Noetherian scheme and φ: → be a morphism of finite type, whose fibers have bounded dimensions. Given a residual complex • on with Cousin data, a residual complex φ ! • on with Cousin data has been constructed. In this article, transitivity of residual complexes is clarified and

## Abstract The residue __R__ of a simple graph __G__ of degree sequence __S__: __d__~1~ ⩾ __d__~2~ ⩾ …︁ ⩾ __d__~__n__~ is the number of zeros obtained by the iterative process consisting of deleting the first term __d__~1~ of __S__, subtracting 1 from the __d__~1~ following ones, and sorting down

It is well known that continuous residual implications are conjugate with the Lukasiewicz implication. This fact was ÿrst obtained by Smets and Magrez (Internat. J. Approx. Reason. 1 (1987) 327). In this paper we show that the assumption of the monotonicity in this theorem can be omitted. We are als