The spectral theory for a pencil of skewsymmetrical differential operators of the third order

## Abstract We investigate the spectral theory of a general third order formally symmetric differential expression of the form acting in the Hilbert space ℒ︁^2^~__w__~ (__a__ ,∞). A Kummer–Liouville transformation is introduced which produces a differential operator unitarily equivalent to __L__

In this second paper of a four-part series, we construct the characteristic determinant of a two-point differential operator \(L\) in \(L^{2}[0,1]\), where \(L\) is determined by \(\ell=-D^{2}+q\) and by independent boundary values \(B_{1}, B_{2}\). For the solutions \(u(\cdot ; \rho)\) and \(v(\cdo

In this paper we consider the nonlinear third-order quasi-linear differential equation and obtain some simple conditions for the existence of a periodic solution for it. In so doing we use the implicit function theorem to prove a theorem about the existence of periodic solutions and consider one ex