论文信息 - On the spectrum of second-order differential operators with complex coefficients

On the spectrum of second-order differential operators with complex coefficients

The main objective of this paper is to extend the pioneering work of Sims on second-order linear differential equations with a complex coefficient, in which he obtains an analogue of the Titchmarsh–Weyl theory and classification. The generalization considered exposes interesting features not visible in the special case in Sims paper from 1957. An m-function is constructed (which is either unique or a point on a ‘limit-circle’), and the relationship between its properties and the spectrum of underlying m-accretive differential operators analysed. The paper is a contribution to the study of non–self–adjoint operators; in general, the spectral theory of such operators is rather fragmentary, and further study is being driven by important physical applications, to hydrodynamics, electro–magnetic theory and nuclear physics, for instance.

[1] W. N. Everitt. THE ASYMPTOTIC SOLUTION OF LINEAR DIFFERENTIAL SYSTEMS , 1990 .

[2] M. Eastham,et al. The asymptotic solution of linear differential systems , 1985 .

[3] Yutaka Kamimura. On The Spectrum of an Ordinary Differential Operator with an r -Integrable Complex-Valued Potential , 1979 .

[4] W. N. Everitt,et al. VII.—On the Spectrum of Ordinary Second Order Differential Operators. , 1969, Proceedings of the Royal Society of Edinburgh. Section A. Mathematical and Physical Sciences.

[5] Tosio Kato. Perturbation theory for linear operators , 1966 .

[6] I. M. Glazman. Direct methods of qualitative spectral analysis of singular differential operators , 1965 .

[7] J. McLeod. EIGENFUNCTION EXPANSIONS ASSOCIATED WITH A COMPLEX DIFFERENTIAL OPERATOR OF THE SECOND ORDER , 1961 .

[8] Allen Sims,et al. Secondary Conditions for Linear Differential Operators of the Second Order , 1957 .

[9] Edmund Taylor Whittaker,et al. A Course of Modern Analysis , 2021 .