THE FUNDAMENTAL GROUP OF TWO SPACES WITH A COMMON POINT
From MaRDI portal
Publication:5828498
DOI10.1093/qmath/5.1.175zbMath0056.16301OpenAlexW1977233769MaRDI QIDQ5828498
Publication date: 1954
Published in: The Quarterly Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1093/qmath/5.1.175
Related Items (27)
On continua with homotopically fixed boundary ⋮ Fundamental groups of James reduced products ⋮ INFINITARY COMMUTATIVITY AND ABELIANIZATION IN FUNDAMENTAL GROUPS ⋮ On the discontinuity of the \(\pi_1\)-action ⋮ Cotorsion and wild homology ⋮ The word problem for some uncountable groups given by countable words ⋮ Homotopical smallness and closeness ⋮ An uncountable homology group, where each element is an infinite product of commutators ⋮ On the homology of the harmonic archipelago ⋮ The Griffiths double cone group is isomorphic to the triple ⋮ Simplicial Topological Coding and Homology of Spin Networks ⋮ Low-thrust out-of-plane orbital station-keeping maneuvers for satellites ⋮ Thin loop groups ⋮ On the Abelianization of Certain Topologist’s Products ⋮ Free \(\sigma\)-products and noncommutatively slender groups ⋮ Construction of an infinitely generated group that is not a free product of surface groups and abelian groups, but which acts freely on an ℝ-tree ⋮ On the topological fundamental groups of quotient spaces ⋮ Atomic property of the fundamental groups of the Hawaiian earring and wild locally path-connected spaces ⋮ A Locally Simply Connected Space and Fundamental Groups of One Point Unions of Cones ⋮ First Countability and Local Simple Connectivity of One Point Unions ⋮ A nonaspherical cell-like 2-dimensional simply connected continuum and related constructions ⋮ The non-Abelian Specker-group is free ⋮ Small loop spaces ⋮ The fundamental groups of one-dimensional spaces ⋮ Algebraic topology of Peano continua ⋮ Free and non-free subgroups of the fundamental group of the Hawaiian earrings. ⋮ The fundamental groups of subsets of closed surfaces inject into their first shape groups
This page was built for publication: THE FUNDAMENTAL GROUP OF TWO SPACES WITH A COMMON POINT
