For a controllable linear time-varying (LTV) pair (Aₜ, Bₜ) and Qₓ positive semidefinite, we derive the Markov kernel for the It\^o diffusion dxₓ=Aₓxₜ d t + 2Bₓdwₓ with an accompanying killing of probability mass at rate 12x^Qₓx. This Markov kernel is the Green's function for an associated linear reaction-advection-diffusion partial differential equation. Our result generalizes the recently derived kernel for the special case (Aₜ, Bₜ) = (0, I), and depends on the solution of an associated Riccati matrix ODE. A consequence of this result is that the linear quadratic non-Gaussian Schr\"odinger bridge is exactly solvable. This means that the problem of steering a controlled LTV diffusion from a given non-Gaussian distribution to another over a fixed deadline while minimizing an expected quadratic cost can be solved using dynamic Sinkhorn recursions performed with the derived kernel. Our derivation for the (Aₜ, Bₜ, Qₜ) -parametrized kernel pursues a new idea that relies on finding a state-time dependent distance-like functional given by the solution of a deterministic optimal control problem. This technique breaks away from existing methods, such as generalizing Hermite polynomials or Weyl calculus, which have seen limited success in the reaction-diffusion context. Our technique uncovers a new connection between Markov kernels, distances, and optimal control. This connection is of interest beyond its immediate application in solving the linear quadratic Schr\"odinger bridge problem.
Teter et al. (Tue,) studied this question.
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