ŠEPITKA, Peter a Roman ŠIMON HILSCHER. Genera of conjoined bases of linear Hamiltonian systems and limit characterization of principal solutions at infinity. Journal of Differential Equations. Elsevier, 2016, roč. 260, č. 8, s. 6581-6603. ISSN 0022-0396. Dostupné z: https://dx.doi.org/10.1016/j.jde.2016.01.004. |
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@article{1323915, author = {Šepitka, Peter and Šimon Hilscher, Roman}, article_number = {8}, doi = {http://dx.doi.org/10.1016/j.jde.2016.01.004}, keywords = {Linear Hamiltonian system; Genus of conjoined bases; Principal solution at infinity; Antiprincipal solution at infinity; Riccati differential equation; Controllability}, language = {eng}, issn = {0022-0396}, journal = {Journal of Differential Equations}, title = {Genera of conjoined bases of linear Hamiltonian systems and limit characterization of principal solutions at infinity}, volume = {260}, year = {2016} }
TY - JOUR ID - 1323915 AU - Šepitka, Peter - Šimon Hilscher, Roman PY - 2016 TI - Genera of conjoined bases of linear Hamiltonian systems and limit characterization of principal solutions at infinity JF - Journal of Differential Equations VL - 260 IS - 8 SP - 6581-6603 EP - 6581-6603 PB - Elsevier SN - 00220396 KW - Linear Hamiltonian system KW - Genus of conjoined bases KW - Principal solution at infinity KW - Antiprincipal solution at infinity KW - Riccati differential equation KW - Controllability N2 - In this paper we derive a general limit characterization of principal solutions at infinity of linear Hamiltonian systems under no controllability assumption. The main result is formulated in terms of a limit involving antiprincipal solutions at infinity of the system. The novelty lies in the fact that the principal and antiprincipal solutions at infinity may belong to two different genera of conjoined bases, i.e., the eventual image of their first components is not required to be the same as in the known literature. For this purpose we extend the theory of genera of conjoined bases, which was recently initiated by the authors. We show that the orthogonal projector representing each genus of conjoined bases satisfies a symmetric Riccati matrix differential equation. This result then leads to an exact description of the structure of the set of all genera, in particular it forms a complete lattice. We also provide several examples, which illustrate our new theory. ER -
ŠEPITKA, Peter a Roman ŠIMON HILSCHER. Genera of conjoined bases of linear Hamiltonian systems and limit characterization of principal solutions at infinity. \textit{Journal of Differential Equations}. Elsevier, 2016, roč.~260, č.~8, s.~6581-6603. ISSN~0022-0396. Dostupné z: https://dx.doi.org/10.1016/j.jde.2016.01.004.
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