Measure Differential Equations

A new type of differential equations for probability measures on Euclidean spaces, called measure differential equations (briefly MDEs), is introduced. MDEs correspond to probability vector fields, which map measures on an Euclidean space to measures on its tangent bundle. Solutions are intended in weak sense and existence, uniqueness and continuous dependence results are proved under suitable conditions. The latter are expressed in terms of the Wasserstein metric on the base and fiber of the tangent bundle. MDEs represent a natural measure-theoretic generalization of ordinary differential equations via a monoid morphism mapping sums of vector fields to fiber convolution of the corresponding probability vector Fields. Various examples, including finite-speed diffusion and concentration, are shown, together with relationships to partial differential equations. Finally, MDEs are also natural mean-field limits of multi-particle systems, with convergence results extending the classical Dobrushin approach.

[1]  P. Lions,et al.  On the Cauchy problem for Boltzmann equations: global existence and weak stability , 1989 .

[2]  Michel Rascle,et al.  Measure solutions to the linear multi-dimensional transport equation with non-smooth coefficients , 1997 .

[3]  Robert H. Martin,et al.  Nonlinear operators and differential equations in Banach spaces , 1976 .

[4]  François Golse,et al.  The mean-field limit for the dynamics of large particle systems , 2003 .

[5]  M. Bardi,et al.  Optimal Control and Viscosity Solutions of Hamilton-Jacobi-Bellman Equations , 1997 .

[6]  C. Villani Topics in Optimal Transportation , 2003 .

[7]  J. Carrillo,et al.  Equivalence of gradient flows and entropy solutions for singular nonlocal interaction equations in 1D , 2013, 1310.4110.

[8]  Jesús Rosado,et al.  Asymptotic Flocking Dynamics for the Kinetic Cucker-Smale Model , 2010, SIAM J. Math. Anal..

[9]  C. Chou The Vlasov equations , 1965 .

[10]  Benedetto Piccoli,et al.  Modeling self-organization in pedestrians and animal groups from macroscopic and microscopic viewpoints , 2009, 0906.4702.

[11]  Benedetto Piccoli,et al.  Optimal synchronization problem for a multi-agent system , 2017, Networks Heterog. Media.

[12]  A. Bressan Hyperbolic Systems of Conservation Laws , 1999 .

[13]  S. Shreve,et al.  Stochastic differential equations , 1955, Mathematical Proceedings of the Cambridge Philosophical Society.

[14]  T. Laurent,et al.  Lp theory for the multidimensional aggregation equation , 2011 .

[15]  L. Ambrosio,et al.  Gradient Flows: In Metric Spaces and in the Space of Probability Measures , 2005 .

[16]  Gershon Wolansky,et al.  Optimal Transport , 2021 .

[17]  Filippo Santambrogio,et al.  Optimal Transport for Applied Mathematicians , 2015 .

[18]  Kellen Petersen August Real Analysis , 2009 .