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Higher Hopf formulae for homology via Galois Theory, preprint math.AT/0701815
, 2007
"... and Ellis’s higher Hopf formulae for homology of groups to arbitrary semiabelian monadic categories. Given such a category A and a chosen Birkhoff subcategory B of A, thus we describe the BarrBeck derived functors of the reflector of A onto B in terms of centralization of higher extensions. In case ..."
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Cited by 10 (3 self)
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and Ellis’s higher Hopf formulae for homology of groups to arbitrary semiabelian monadic categories. Given such a category A and a chosen Birkhoff subcategory B of A, thus we describe the BarrBeck derived functors of the reflector of A onto B in terms of centralization of higher extensions. In case A
Higher central extensions and Hopf formulae
, 902
"... Higher extensions and higher central extensions, which are of importance to nonabelian homological algebra, are studied, and some fundamental properties are proven. As an application, a direct proof of the invariance of the higher Hopf formulae is obtained. 0 ..."
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Cited by 3 (1 self)
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Higher extensions and higher central extensions, which are of importance to nonabelian homological algebra, are studied, and some fundamental properties are proven. As an application, a direct proof of the invariance of the higher Hopf formulae is obtained. 0
Intersection of subgroups in free groups and homotopy groups, preprint
"... Abstract. We show that the intersection of three subgroups in a free group is related to the computation of the third homotopy group π3. This generalizes a result of GutierrezRatcliffe who relate the intersection of two subgroups with the computation of π2. Let K be a twodimensional CWcomplex with ..."
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Cited by 2 (2 self)
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Abstract. We show that the intersection of three subgroups in a free group is related to the computation of the third homotopy group π3. This generalizes a result of GutierrezRatcliffe who relate the intersection of two subgroups with the computation of π2. Let K be a twodimensional CWcomplex with subcomplexes K1, K2, K3 such that K = K1 ∪ K2 ∪ K3 and K1 ∩ K2 ∩ K3 is the 1skeleton K1 of K. We construct a natural homomorphism of π1(K)modules
HIGHER CENTRAL EXTENSIONS VIA COMMUTATORS
"... Abstract. We prove that all semiabelian categories with the the Smith is Huq property satisfy the Commutator Condition (CC): higher central extensions may be characterised in terms of binary (Huq or Smith) commutators. In fact, even Higgins commutators suffice. As a consequence, in the presence of ..."
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Abstract. We prove that all semiabelian categories with the the Smith is Huq property satisfy the Commutator Condition (CC): higher central extensions may be characterised in terms of binary (Huq or Smith) commutators. In fact, even Higgins commutators suffice. As a consequence, in the presence of enough projectives we obtain explicit Hopf formulae for homology with coefficients in the abelianisation functor, and an interpretation of cohomology with coefficients in an abelian object in terms of equivalence classes of higher central extensions. We also give a counterexample against (CC) in the semiabelian category of (commutative) loops.