This paper deals with a non-self-adjoint eigenvalue problem @@@ {a(x) y '' (x) + b(x) y' (x) = lambda y (x), @@@ y(0) = integral(1)(0) y(x)dv(0)(x), y(1) = integral(1)(0) y(x)dv(1)(x), @@@ which is associated with the generator of one dimensional diffusions with random jumps from the boundary. We focus on the dependence of spectral gap, eigenvalues and eigenfunctions on the coefficients a, b and the probability distributions v(0), v(1). To prove this, we show that all the eigenvalues are confined to a parabolic neighborhood of the real axis. Moreover, we also prove that zero is an algebraically simple eigenvalue of the problem.

• 出版日期2019-4-15
• 单位天津大学