Flat Chains Over a Finite Coefficient Group

Subdividing three-dimensional Riemannian disks, A multi-material transport problem with arbitrary marginals, Coefficient groups inducing nonbranched optimal transport, Minimal sphere bundles in Euclidean spheres, On boundary regularity for Plateau's problem, The blow up method for brakke flows: networks near triple junctions, Measure theoretic geometry and elliptic variational problems, How Riemannian Manifolds Converge, Ancient asymptotically cylindrical flows and applications, General transport problems with branched minimizers as functionals of 1-currents with prescribed boundary, Existence of solutions to a general geometric elliptic variational problem, Sur le volume minimal de ${R}\sp 2$, General methods of elliptic minimization, Existence of least-energy configurations of immiscible fluids, Filling and surfaces of revolution., Examples of Unoriented Area-Minimizing Surfaces, On the existence of mass minimizing rectifiable \(G\) chains in finite dimensional normed spaces, The weak convergence of varifolds generated by rectifiable flat G$G$‐chains, Extremal Length and Conformal Capacity, On the equality between the infima obtained by solving various Plateau's problems, Morse inequalities for the area functional, The regularity theory for the area functional (in geometric measure theory), Mass concentration in rescaled first order integral functionals, Early developments in geometric measure theory, Minimizing properties of networks via global and local calibrations, On the triple junction problem without symmetry hypotheses, Flat chains of finite size in metric spaces, On the phase connectedness of the volume-constrained area minimizing partitioning problem, Morse index of multiplicity one min-max minimal hypersurfaces, Rectifiability of metric flat chains and fractional masses, A Variational Approach to Single Crystals with Dislocations, Soap film solutions to Plateau's problem, Cartan's magic formula and soap film structures, Unnamed Item, Some basic theorems on flat \(G\) chains, Topological singular set of vector-valued maps. I: Applications to manifold-constrained Sobolev and BV spaces, Flat chains in Banach spaces, Improved partial regularity for manifold-constrained minimisers of subquadratic energies, Operator calculus of differential chains and differential forms, Homology of Normal Chains and Cohomology of Charges, Rectifiability of flat chains in Banach spaces with coefficients in \(\mathbb Z_p\), On Plateau's problem for soap films with a bound on energy, Abundance of minimal surfaces, On the thread problem for minimal surfaces, Topological singular set of vector-valued maps. II: \( \varGamma \)-convergence for Ginzburg-Landau type functionals, Strong approximation in \(h\)-mass of rectifiable currents under homological constraint, On different notions of calibrations for minimal partitions and minimal networks in \(\mathbb{R}^2\), Morse theory for the area functional, Topological singularities for vector-valued Sobolev maps and applications, Estimates by gap potentials of free homotopy decompositions of critical Sobolev maps, Modeling of dislocations and relaxation of functionals on 1-currents with discrete multiplicity, A mass reducing flow for real-valued flat chains with applications to transport networks, Sur la régularité du profil isopérimétrique des surfaces riemanniennes compactes. (The regularity of the isoperimetric profile of Riemann surfaces), Currents and flat chains associated to varifolds, with an application to mean curvature flow, Minimal cones and the spherical Bernstein problem. III, A Multimaterial Transport Problem and its Convex Relaxation via Rectifiable $G$-currents, Rigidity of the 1-Bakry-Émery inequality and sets of finite Perimeter in RCD spaces, Approximation of rectifiable 1-currents and weak-\(\ast\) relaxation of the \(h\)-mass, Compactness of special functions of bounded higher variation, Unnamed Item, Wulff clusters in \(\mathbb{R}^2\), Regularity of the singular sets of two-dimensional area-minimizing flat chains modulo 3 in R\(^3\), Minimal cones and the spherical Bernstein problem. II, The relaxed Dirichlet energy of mappings into a manifold, On topological singular set of maps with finite 3-energy into \(S^3\), The deformation theorem for flat chains, Existence and regularity of solutions to elliptic calculus of variations problems among surfaces of varying topological type and singularity structure, Semicontinuity of multiple integrals of the calculus of variations in parametric form

• Normal and integral currents
• Integral Currents Mod 2
• The (φ, k) Rectifiable Subsets of n Space
• A general form of the covering principle and relative differentiation of additive functions
• Unnamed Item