scientific article; zbMATH DE number 3328869
From MaRDI portal
Publication:5607104
zbMath0206.52403MaRDI QIDQ5607104
Charles B. Thomas, Charles Terence Clegg Wall
Publication date: 1971
Full work available at URL: http://www.numdam.org/item?id=CM_1971__23_1_101_0
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Related Items (14)
Minimal Euler characteristics for even-dimensional manifolds with finite fundamental group ⋮ On smooth manifolds with the homotopy type of a homology sphere ⋮ Homotopy trees for periodic groups ⋮ Free involutions on \(S ^{1} \times S ^{n }\) ⋮ The Borsuk-Ulam theorem for homotopy spherical space forms ⋮ Semifree topological actions of finite groups of spheres ⋮ Groups with infinite virtual cohomological dimension which act freely on \(\mathbb{R}{}^ m\times{} S^{n-1}\) ⋮ Spherical space forms--Homotopy types and self-equivalences for the groups \(\mathbb Z/a \rtimes \mathbb Z/b\) and \(\mathbb Z/a \rtimes(\mathbb Z/b \times \mathbb Q_{2^i})\) ⋮ Homotopy classification of \((\pi,m)\)-complexes ⋮ On Poincaré 3-complexes with binary polyhedral fundamental group ⋮ Odd dimensional manifolds with highly connected covers ⋮ Spherical space forms -- homotopy self-equivalences and homotopy types, the case of the groups \(\mathbb Z/a\rtimes (\mathbb Z/b \times TL_2(\mathbb F_p))\) ⋮ On the Structure of Finite Groups with Periodic Cohomology ⋮ Free finite group actions on $S^3$
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- The \(p\)-period of a finite group
- Periodic resolutions for finite groups
- Artin exponent of finite groups
- A new method in fixed point theory
- Finiteness conditions for CW-complexes. I, II.
- Poincaré complexes. I
- Algebraic \(K\)-theory and its geometric applications
- Spaces satisfying Poincaré duality
- Groups Which Act on S n Without Fixed Point
- The Oriented Homotopy Type of Compact 3-Manifolds
- On the triangulation of manifolds and the Hauptvermutung
- On Detecting Open Collars
- Free piecewise linear involutions on spheres
This page was built for publication:
