Principal and antiprincipal solutions at infinity of linear Hamiltonian systems
Authors | |
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Year of publication | 2015 |
Type | Article in Periodical |
Magazine / Source | Journal of Differential Equations |
MU Faculty or unit | |
Citation | |
Doi | http://dx.doi.org/10.1016/j.jde.2015.06.027 |
Field | General mathematics |
Keywords | Linear Hamiltonian system; Antiprincipal solution at infinity; Principal solution at infinity; Minimal principal solution; Controllability; Normality; Conjoined basis; Order of abnormality; Genus of conjoined bases; Moore-Penrose pseudoinverse |
Description | The concept of principal solutions at infinity for possibly abnormal linear Hamiltonian systems was recently introduced by the authors. In this paper we develop the theory of antiprincipal solutions at infinity and establish a limit characterization of the principal solutions. That is, we prove that the principal solutions are the smallest ones at infinity when they are compared with the antiprincipal solutions. This statement is a generalization of the classical result of W. T. Reid, P. Hartman, or W. A. Coppel for controllable linear Hamiltonian systems. We also derive a classification of antiprincipal solutions at infinity according to their rank and show that the antiprincipal solutions exist for any rank in the range between explicitly given minimal and maximal values. We illustrate our new theory by several examples. |
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