Dependence of Solutions and Eigenvalues of Third Order Linear Measure Differential Equations on Measures

Abstract

This paper deals with a complex third order linear measure differential equation equation* id( y ) +2iq( x) y dx+y( idq( x) +dp( x) ) = λ ydx equation* on a bounded interval with boundary conditions presenting a mixed aspect of the Dirichlet and the periodic problems. The dependence of eigenvalues on the coefficients p, q is investigated. We prove that the n-th eigenvalue is continuous in p, q when the norm topology of total variation and the weak* topology are considered. Moreover, the Fr\'echet differentiability of the n-th eigenvalue in p, q with the norm topology of total variation is also considered. To deduce these conclusions, we investigate the dependence of solutions of the above equation on the coefficients p, q with different topologies and establish the counting lemma of eigenvalues according to the estimates of solutions.