AbstractUsing elementary methods, a positive answer is given to a question of A. D. Sands concerning factorizations of abelian groups. We then indicate how our approach to Sands's question has its roots in a result on the ergodic theory of infinite measure preserving transformations due to Eigen, Hajian and Ito
AbstractHajós theorem asserts that if a finite abelian group is expressed as a direct product of cyc...
Suppose N is a nice subgroup of the primary abelian group G and A = G/N. The paper discusses various...
AbstractLet S=(α1, …, α2p−1) be a sequence of 2p−1 elements of an Abelian group G of type (p, p). Th...
Abstract. Using elementary methods, a positive answer is given to a question of A. D. Sands concerni...
AbstractUsing elementary methods, a positive answer is given to a question of A. D. Sands concerning...
Abstract. Suppose G is an infinite Abelian group that factorizes as the direct sum G = A⊕B: i.e., th...
summary:It is proved that if a finite abelian group is factored into a direct product of lacunary cy...
summary:It is proved that if a finite abelian group is factored into a direct product of lacunary cy...
AbstractIn this paper we investigate the set of all sums over subsequences of a sequence a1,…, as of...
AbstractFactoring a finite abelian group by its subsets is a direct product of these subsets giving ...
AbstractHajós theorem asserts that if a finite abelian group is expressed as a direct product of cyc...
In mathematics, the Seifert-van Kampen theorem of Algebraic topology, sometimes it is called as van ...
AbstractThe following theorems are proved:o(1)Let A⊕B=A∪B∪(A+B). If G is a finite Abelian group and ...
A famous conjecture of Minkowski, concerning the columnation of space-filling lattices, was first pr...
Suppose N is a nice subgroup of the primary abelian group G and A = G/N. The paper discusses various...
AbstractHajós theorem asserts that if a finite abelian group is expressed as a direct product of cyc...
Suppose N is a nice subgroup of the primary abelian group G and A = G/N. The paper discusses various...
AbstractLet S=(α1, …, α2p−1) be a sequence of 2p−1 elements of an Abelian group G of type (p, p). Th...
Abstract. Using elementary methods, a positive answer is given to a question of A. D. Sands concerni...
AbstractUsing elementary methods, a positive answer is given to a question of A. D. Sands concerning...
Abstract. Suppose G is an infinite Abelian group that factorizes as the direct sum G = A⊕B: i.e., th...
summary:It is proved that if a finite abelian group is factored into a direct product of lacunary cy...
summary:It is proved that if a finite abelian group is factored into a direct product of lacunary cy...
AbstractIn this paper we investigate the set of all sums over subsequences of a sequence a1,…, as of...
AbstractFactoring a finite abelian group by its subsets is a direct product of these subsets giving ...
AbstractHajós theorem asserts that if a finite abelian group is expressed as a direct product of cyc...
In mathematics, the Seifert-van Kampen theorem of Algebraic topology, sometimes it is called as van ...
AbstractThe following theorems are proved:o(1)Let A⊕B=A∪B∪(A+B). If G is a finite Abelian group and ...
A famous conjecture of Minkowski, concerning the columnation of space-filling lattices, was first pr...
Suppose N is a nice subgroup of the primary abelian group G and A = G/N. The paper discusses various...
AbstractHajós theorem asserts that if a finite abelian group is expressed as a direct product of cyc...
Suppose N is a nice subgroup of the primary abelian group G and A = G/N. The paper discusses various...
AbstractLet S=(α1, …, α2p−1) be a sequence of 2p−1 elements of an Abelian group G of type (p, p). Th...
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