Uniqueness for an inverse coefficient problem of a weakly coupled parabolic system

Abstract

This paper considers the weakly coupled parabolic system ∂t u-∂2xu +P(x)u=0 with the homogeneous Neumann boundary condition, where \(P(x)\) is a \(2×2\) symmetric real-valued function matrix. Under the assumption that the initial value \(a(x)\) is a generating element (i.e., it has a nonzero inner product with every eigenfunction), we prove that the coefficient matrix P(x) is uniquely determined by the boundary observation u(0, t), u(1, t), 0 < t < T. The proof relies on the eigenfunction expansion of the solution to the initial-boundary value problem and an extension of the Gel'fand-Levitan theory to the parabolic system.