Zero Sum, Book One, Kotov Syndrome

In this chillingly plausible scenario of a military/industrial/financial complex manipulating American companies for profit, Zero Sum pits entrepreneur turned investor Dr. Steven Archer against prominent Wall Street predator Nicholas Griffen in a conflict that raises troubling questions about our ma

Recently the following theorem in combinatorial group theory has been proved: Let G be a finite abelian group and let A be a sequence of members of G such that |A| |G| +D(G)&1, where D(G) is the Davenport constant of G. Then A contains a subsequence B such that |B|= |G| and b # B b=0. We shall prese

Let G be a finite abelian group with exponent e, let r(G) be the minimal integer t with the property that any sequence of t elements in G contains an e-term subsequence with sum zero. In this paper we show that if r(C 2 n )=4n&3 and if n ((3m&4)(m&1) m 2 +3)Â4m, then r(C 2 nm )=4nm&3. In particular,

## Abstract We prove the following generalization of earlier results of Bialostocki and Dierker [3] and Caro [7]. Theorem. Let __t__ ⩾ __k__ ⩾ 2 be positive integers such that __k__ | __t__, and let __c :E__(K) → ℤ~__k__~ be a mapping of all the __r__‐subsets of an __rt__ + __k__ −1 element set in

## Abstract As a consequence of our main result, a theorem of Schrijver and Seymour that determines the zero sum Ramsey numbers for the family of all __r__‐hypertrees on __m__ edges and a theorem of Bialostocki and Dierker that determines the zero sum Ramsey numbers for __r__‐hypermatchings are com