A new optimal transport distance on the space of finite Radon measures

The Wasserstein-Fisher-Rao Metric for Waveform Based Earthquake Location ⋮ A superposition principle for the inhomogeneous continuity equation with Hellinger–Kantorovich-regular coefficients ⋮ Optimal transportation, modelling and numerical simulation ⋮ A new transportation distance with bulk/interface interactions and flux penalization ⋮ A fitness-driven cross-diffusion system from population dynamics as a gradient flow ⋮ The square root normal field distance and unbalanced optimal transport ⋮ A Framework for Wasserstein-1-Type Metrics ⋮ Scaling algorithms for unbalanced optimal transport problems ⋮ Sparse optimization on measures with over-parameterized gradient descent ⋮ When optimal transport meets information geometry ⋮ Unbalanced optimal total variation transport problems and generalized Wasserstein barycenters ⋮ Lower bound for the coarse Ricci curvature of continuous-time pure-jump processes ⋮ Birth–death dynamics for sampling: global convergence, approximations and their asymptotics ⋮ A generalized conditional gradient method for dynamic inverse problems with optimal transport regularization ⋮ Hellinger–Kantorovich barycenter between Dirac measures ⋮ An unbalanced optimal transport splitting scheme for general advection-reaction-diffusion problems ⋮ Dynamic models of Wasserstein-1-type unbalanced transport ⋮ On the Convergence of Continuous and Discrete Unbalanced Optimal Transport Models for 1-Wasserstein Distance ⋮ Square Root Normal Fields for Lipschitz Surfaces and the Wasserstein Fisher Rao Metric ⋮ Toward a mathematical theory of trajectory inference ⋮ Dynamic Optimal Transport on Networks ⋮ Fine properties of geodesics and geodesic \(\lambda\)-convexity for the Hellinger-Kantorovich distance ⋮ A machine learning framework for geodesics under spherical Wasserstein-Fisher-Rao metric and its application for weighted sample generation ⋮ Optimal entropy-transport problems and a new Hellinger-Kantorovich distance between positive measures ⋮ A note on the differentiability of the Hellinger-Kantorovich distances ⋮ A transportation \(L^p\) distance for signal analysis ⋮ An interpolating distance between optimal transport and Fisher-Rao metrics ⋮ On Optimal Transport of Matrix-Valued Measures ⋮ Unbalanced optimal transport: dynamic and Kantorovich formulations ⋮ Unnormalized optimal transport ⋮ The Schrödinger problem on the non-commutative Fisher-Rao space ⋮ Barycenters in the Hellinger-Kantorovich space ⋮ Geometric properties of cones with applications on the Hellinger-Kantorovich space, and a new distance on the space of probability measures ⋮ Optimal transport: discretization and algorithms ⋮ Understanding the topology and the geometry of the space of persistence diagrams via optimal partial transport ⋮ The Camassa-Holm equation as an incompressible Euler equation: a geometric point of view ⋮ A new multicomponent Poincaré-Beckner inequality ⋮ A Newton Algorithm for Semidiscrete Optimal Transport with Storage Fees ⋮ Contraction and regularizing properties of heat flows in metric measure spaces ⋮ \{Euclidean, metric, and Wasserstein\} gradient flows: an overview ⋮ A JKO Splitting Scheme for Kantorovich--Fisher--Rao Gradient Flows ⋮ Nonlinear Fokker-Planck equations with reaction as gradient flows of the free energy ⋮ Gradient flows and evolution variational inequalities in metric spaces. I: structural properties ⋮ Convex Sobolev inequalities related to unbalanced optimal transport ⋮ Interpolation of matrices and matrix-valued densities: The unbalanced case ⋮ Multi-species optimal transportation ⋮ Optimal Transport in Competition with Reaction: The Hellinger--Kantorovich Distance and Geodesic Curves ⋮ Leader formation with mean-field birth and death models ⋮ Barycenters for the Hellinger--Kantorovich Distance Over $\mathbb{R}^d$ ⋮ Nonlocal balance equations with parameters in the space of signed measures ⋮ Stabilized Sparse Scaling Algorithms for Entropy Regularized Transport Problems ⋮ Spherical Hellinger--Kantorovich Gradient Flows ⋮ Heat flow with Dirichlet boundary conditions via optimal transport and gluing of metric measure spaces ⋮ An optimal transport approach for solving dynamic inverse problems in spaces of measures ⋮ Quantum entropic regularization of matrix-valued optimal transport ⋮ A minimizing Movement approach to a class of scalar reaction–diffusion equations ⋮ Uniformly compressing mean curvature flow ⋮ Entropy-transport distances between unbalanced metric measure spaces ⋮ A tumor growth model of Hele-Shaw type as a gradient flow ⋮ On the extremal points of the ball of the Benamou–Brenier energy ⋮ Obstructions to extension of Wasserstein distances for variable masses ⋮ The Linearized Hellinger--Kantorovich Distance ⋮ Partial differential equations with quadratic nonlinearities viewed as matrix-valued optimal ballistic transport problems