Boundary Control for Transport Equations

This paper considers two types of boundary control problems for linear transport equations. The first one shows that transport solutions on a subdomain of a domain X can be controlled exactly from incoming boundary conditions for X under appropriate convexity assumptions. This is in contrast with the only approximate control one typically obtains for elliptic equations by an application of a unique continuation property, a property which we prove does not hold for transport equations. We also consider the control of an outgoing solution from incoming conditions, a transport notion similar to the Dirichlet-to-Neumann map for elliptic equations. We show that for well-chosen coefficients in the transport equation, this control may not be possible. In such situations and by (Fredholm) duality, we obtain the existence of non-trivial incoming conditions that are compatible with vanishing outgoing conditions.

[1]  Pierre-Louis Lions,et al.  Regularity of the moments of the solution of a Transport Equation , 1988 .

[2]  R. Dautray,et al.  Théorèmes de trace Lp pour des espaces de fonctions de la neutronique , 1984 .

[3]  Plamen Stefanov,et al.  Uniqueness and non-uniqueness in inverse radiative transfer , 2008, 0809.2570.

[4]  Kristian Kirsch,et al.  Methods Of Modern Mathematical Physics , 2016 .

[5]  M. Reed Methods of Modern Mathematical Physics. I: Functional Analysis , 1972 .

[6]  Guillaume Bal,et al.  Generalized stability estimates in inverse transport theory , 2017, 1703.00691.

[7]  Guillaume Bal,et al.  Reconstruction of Coefficients in Scalar Second‐Order Elliptic Equations from Knowledge of Their Solutions , 2011, 1111.5051.

[8]  Eugene P. Wigner,et al.  Formulas and Theorems for the Special Functions of Mathematical Physics , 1966 .

[9]  Yves Capdeboscq,et al.  Lectures on Elliptic Methods for Hybrid Inverse Problems , 2018 .

[10]  M Mokhtar-Kharroubi,et al.  Mathematical Topics in Neutron Transport Theory: New Aspects , 1997 .

[11]  C. DeWitt-Morette,et al.  Mathematical Analysis and Numerical Methods for Science and Technology , 1990 .

[12]  G. Johnson The Schrödinger equation , 1998 .

[13]  J. H. Albert,et al.  Genericity of simple eigenvalues for elliptic PDE’s , 1975 .

[14]  H. Egger,et al.  An Lp theory for stationary radiative transfer , 2013, 1304.6504.

[15]  John C. Schotland,et al.  Ultrasound Modulated Bioluminescence Tomography and Controllability of the Radiative Transport Equation , 2016, SIAM J. Math. Anal..

[16]  Franz Rellich,et al.  Perturbation Theory of Eigenvalue Problems , 1969 .

[17]  GUILLAUME BAL,et al.  Reconstruction of a Fully Anisotropic Elasticity Tensor from Knowledge of Displacement Fields , 2015, SIAM J. Appl. Math..

[18]  F. Natterer The Mathematics of Computerized Tomography , 1986 .

[19]  J. Keller,et al.  Asymptotic solution of neutron transport problems for small mean free paths , 1974 .

[20]  G. Eskin Lectures on Linear Partial Differential Equations , 2011 .