THE HOMOTOPY PROBLEM FOR THE COMPONENTS IN THE SPACE OF MAPS ON THE n-SPHERE
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Publication:4054382
DOI10.1093/qmath/25.1.313zbMath0299.55009OpenAlexW1993434811WikidataQ113646423 ScholiaQ113646423MaRDI QIDQ4054382
Publication date: 1974
Published in: The Quarterly Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1093/qmath/25.1.313
Related Items (12)
On the mod 2 cohomology of spaces of sphere and projective bundle sections ⋮ Topology of twists, extremising twist paths and multiple solutions to the nonlinear system in variation \(\mathscr{L}[u = \nabla \mathscr{P}\)] ⋮ Symmetries of degenerate center singularities of plane vector fields ⋮ Evaluation fibrations and path-components of the mapping space \(M(\mathbb{S}^{n+k},\mathbb{S}^n)\) for \(8\leq k\leq 13\) ⋮ Self-closeness numbers of rational mapping spaces ⋮ Criteria for components of a function space to be homotopy equivalent ⋮ Birman-Hilden bundles. II ⋮ The interplay between two Euler-Lagrange operators relating to the nonlinear elliptic system \(\Sigma [(u, {\mathscr{P}}), \varOmega\)] ⋮ On path-components of the mapping spaces \(M(\mathbb {S}^m,\mathbb {F}P^n)\) ⋮ Local minimizers and quasiconvexity -- the impact of topology ⋮ Homotopy classes of self-maps of annuli, generalised twists and spin degree ⋮ On the existence and multiplicity of topologically twisting incompressible $H$-harmonic maps and a structural H-condition
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