Reid roundabout theorem for symplectic dynamic systems on time scales
| Authors | |
|---|---|
| Year of publication | 2001 |
| Type | Article in Periodical |
| Magazine / Source | Applied Mathematics and Optimization |
| MU Faculty or unit | |
| Citation | |
| Field | General mathematics |
| Keywords | time scale; symplectic system; linear Hamiltonian system; quadratic functional; disconjugacy; focal point; principal solution; Riccati equation; Jacobi condition; Legendre condition |
| Description | The principal aim of this paper is to state and prove the so called Reid roundabout theorem for symplectic dynamic system (S) z\Delta=Stz on an arbitrary time scale T, so that the well known case of differential linear Hamiltonian systems (T=R) and recently developed case of discrete symplectic systems (T=Z) are unified. We list conditions which are equivalent to the positivity of the quadratic functional associated with (S), e.g. disconjugacy (in terms of no focal points of a conjoined basis) of (S), no generalized zeros for vector solutions of (S), the existence of a solution to the corresponding Riccati matrix equation. A certain normality assumption is employed. The result requires treatment of the quadratic functionals both with general and separated boundary conditions. |
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