AbstractIf G is a finite Abelian group, for what number s is it true that an arbitrary sequence of length s of group elements has a subsequence whose product is 1? This question is answered for p-groups
AbstractIf G is any finite Abelian group defineγ(G)=∑i(ei−1)where ei are the canonic invariants of G...
AbstractIn this paper we investigate the set of all sums over subsequences of a sequence a1,…, as of...
The small Davenport constant ${\mathsf{d}}(G)$ of a finite group $G$ is defined to be the maximal le...
AbstractThis paper continues the discussion of the number s(G) defined, for a finite Abelian group G...
AbstractIf G is a finite Abelian group, for what number s is it true that an arbitrary sequence of l...
AbstractLet G be a finite abelian group of order n and S a sequence of 2n − 1 elements in G. For eve...
AbstractLet G be a finite group of order n, and let S=(a1,…,ak) be a sequence of elements in G. We c...
AbstractThis paper continues the discussion of the number s(G) defined, for a finite Abelian group G...
AbstractFor a finite abelian group G, we investigate the length of a sequence of elements of G that ...
AbstractLet G be a finite group of order n, and let S=(a1,…,ak) be a sequence of elements in G. We c...
13 pages, submittedInternational audienceIn this paper, we study the minimal number of elements of m...
13 pages, submittedInternational audienceIn this paper, we study the minimal number of elements of m...
Let G ≅ Cn1 ⊕ ⋯ ⊕ Cnr be a finite and nontrivial abelian group with n1|n2| ⋯ |nr. A conjecture of Ha...
AbstractLet G be a non-cyclic finite solvable group of order n, and let S=(g1,…,gk) be a sequence of...
AbstractA conjecture of Gao and Leader, recently proved by Sun, states that if X=(xi)i=1n is a seque...
AbstractIf G is any finite Abelian group defineγ(G)=∑i(ei−1)where ei are the canonic invariants of G...
AbstractIn this paper we investigate the set of all sums over subsequences of a sequence a1,…, as of...
The small Davenport constant ${\mathsf{d}}(G)$ of a finite group $G$ is defined to be the maximal le...
AbstractThis paper continues the discussion of the number s(G) defined, for a finite Abelian group G...
AbstractIf G is a finite Abelian group, for what number s is it true that an arbitrary sequence of l...
AbstractLet G be a finite abelian group of order n and S a sequence of 2n − 1 elements in G. For eve...
AbstractLet G be a finite group of order n, and let S=(a1,…,ak) be a sequence of elements in G. We c...
AbstractThis paper continues the discussion of the number s(G) defined, for a finite Abelian group G...
AbstractFor a finite abelian group G, we investigate the length of a sequence of elements of G that ...
AbstractLet G be a finite group of order n, and let S=(a1,…,ak) be a sequence of elements in G. We c...
13 pages, submittedInternational audienceIn this paper, we study the minimal number of elements of m...
13 pages, submittedInternational audienceIn this paper, we study the minimal number of elements of m...
Let G ≅ Cn1 ⊕ ⋯ ⊕ Cnr be a finite and nontrivial abelian group with n1|n2| ⋯ |nr. A conjecture of Ha...
AbstractLet G be a non-cyclic finite solvable group of order n, and let S=(g1,…,gk) be a sequence of...
AbstractA conjecture of Gao and Leader, recently proved by Sun, states that if X=(xi)i=1n is a seque...
AbstractIf G is any finite Abelian group defineγ(G)=∑i(ei−1)where ei are the canonic invariants of G...
AbstractIn this paper we investigate the set of all sums over subsequences of a sequence a1,…, as of...
The small Davenport constant ${\mathsf{d}}(G)$ of a finite group $G$ is defined to be the maximal le...
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