AbstractLet Zn be the cyclic group of order n. For a sequence S of elements in Zn, we use f(S) to denote the number of subsequences of S that the sum of whose terms is zero. In this paper, we determine all sequences S of elements, in Zn for which 516<f(S)/|S|⩽12
AbstractWe continue the discussion of the numbers c(G) and r(G) defined in [1]. The following result...
AbstractLet Z denote the ring of integers and for a prime p and positive integers r and d, let fr(P,...
AbstractRecently the following theorem in combinatorial group theory has been proved: LetGbe a finit...
AbstractLet Zn be the cyclic group of order n. For a sequence S of elements in Zn, we use fn(S) to d...
AbstractThe following theorem is proved. Let 2 ⩽ k ⩽ [n4] + 1, and let S be a sequence of 2n − k ele...
AbstractLet Zn be the cyclic group of order n. For a sequence S of elements in Zn, we use f(S) to de...
AbstractLet G be a finite abelian group of order n and S a sequence of 2n − 1 elements in G. For eve...
AbstractLet p be a prime number and ℓ be any positive integer. Let G be the cyclic group of order pℓ...
AbstractLetGbe a finite abelian group with exponente, letr(G) be the minimal integertwith the proper...
AbstractA sequence in the additive group Zn of integers modulo n is called n-zero-free if it does no...
AbstractLet n be a natural number. Erdös, Ginzburg and Ziv proved that every sequence of elements of...
AbstractA prototype of zero-sum theorems, the well-known theorem of Erdős, Ginzburg and Ziv says tha...
AbstractIn this paper, we explore the interplay of four different conjectures on certain zero-sum pr...
AbstractA well-known theorem of Erdös and Fuchs states that we cannot have too good an asymptotic fo...
AbstractA sequence in an additively written abelian group is called zero-freeif each of its nonempty...
AbstractWe continue the discussion of the numbers c(G) and r(G) defined in [1]. The following result...
AbstractLet Z denote the ring of integers and for a prime p and positive integers r and d, let fr(P,...
AbstractRecently the following theorem in combinatorial group theory has been proved: LetGbe a finit...
AbstractLet Zn be the cyclic group of order n. For a sequence S of elements in Zn, we use fn(S) to d...
AbstractThe following theorem is proved. Let 2 ⩽ k ⩽ [n4] + 1, and let S be a sequence of 2n − k ele...
AbstractLet Zn be the cyclic group of order n. For a sequence S of elements in Zn, we use f(S) to de...
AbstractLet G be a finite abelian group of order n and S a sequence of 2n − 1 elements in G. For eve...
AbstractLet p be a prime number and ℓ be any positive integer. Let G be the cyclic group of order pℓ...
AbstractLetGbe a finite abelian group with exponente, letr(G) be the minimal integertwith the proper...
AbstractA sequence in the additive group Zn of integers modulo n is called n-zero-free if it does no...
AbstractLet n be a natural number. Erdös, Ginzburg and Ziv proved that every sequence of elements of...
AbstractA prototype of zero-sum theorems, the well-known theorem of Erdős, Ginzburg and Ziv says tha...
AbstractIn this paper, we explore the interplay of four different conjectures on certain zero-sum pr...
AbstractA well-known theorem of Erdös and Fuchs states that we cannot have too good an asymptotic fo...
AbstractA sequence in an additively written abelian group is called zero-freeif each of its nonempty...
AbstractWe continue the discussion of the numbers c(G) and r(G) defined in [1]. The following result...
AbstractLet Z denote the ring of integers and for a prime p and positive integers r and d, let fr(P,...
AbstractRecently the following theorem in combinatorial group theory has been proved: LetGbe a finit...
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