Topology and Sobolev spaces

On global singularities of Sobolev mappings, Computational aspects of the mechanics of complex materials, Topology of Sobolev mappings. II., The interplay between analysis and topology in some nonlinear PDE problems, Sobolev bundles with Abelian structure groups, THE PONTRJAGIN–HOPF INVARIANTS FOR SOBOLEV MAPS, Minimizing sequences for conformally invariant integrals of higher order, Geodesics on \(\mathrm{SO}(n)\) and a class of spherically symmetric maps as solutions to a nonlinear generalised harmonic map problem, Density of bounded maps in Sobolev spaces into complete manifolds, A class of extremising sphere-valued maps with inherent maximal tori symmetries in \(\mathbf{SO}(n)\), Minimal Ws,ns$W^{s,\frac{n}{s}}$‐harmonic maps in homotopy classes, Distances between classes in \(W^{1,1}(\Omega ;{\mathbb {S}}^{1})\), Weak approximation by bounded Sobolev maps with values into complete manifolds, Analytic formulas for the topological degree of non-smooth mappings: The odd-dimensional case, Uniform boundedness principles for Sobolev maps into manifolds, Path and quasi-homotopy for Sobolev maps between manifolds, Unnamed Item, A REMARK ON THE CONTINUITY OF THE HEAT FLOW FOR MINIMAL SURFACE WITH PLATEAU BOUNDARY CONDITION, Fractional Sobolev spaces and topology, Sobolev mappings, degree, homotopy classes and rational homology spheres, On the distance between homotopy classes of maps between spheres, Obstruction theory for the approximation and the deformation problems for Sobolev mappings, Local minimizers and quasiconvexity -- the impact of topology, Geometry of interactions in complex bodies, Density in \(W^{s, p}(\operatorname{\Omega}; N)\), Density of Lipschitz mappings in the class of Sobolev mappings between metric spaces, Estimates by gap potentials of free homotopy decompositions of critical Sobolev maps, Topological and analytical properties of Sobolev bundles. I: The critical case, Quantitative characterization of traces of Sobolev maps

• Boundary regularity and the Dirichlet problem for harmonic maps
• Infima of energy functionals in homotopy classes of mappings
• Homotopy classes in Sobolev spaces and the existence of energy minimizing maps
• Density of smooth functions between two manifolds in Sobolev spaces
• The approximation problem for Sobolev maps between two manifolds
• Lifting in Sobolev spaces
• Degree theory of BMO. I: Compact manifolds without boundaries
• Homotopy classification of minimizers of the Ginzburg-Landau energy and the existence of permanent currents
• Degree and Sobolev spaces
• H = W
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