| Title |
Spectrum curves for Sturm–Liouville problem with integral boundary condition / |
| Authors |
Skučaitė, Agnė ; Štikonas, Artūras |
| DOI |
10.3846/13926292.2015.1116470 |
| Full Text |
|
| Is Part of |
Mathematical mdelling and analysis.. Abingdon, Oxfordshire : Taylor&Francis and VGTU. 2015, Vol. 20, No. 6, p. 802-818.. ISSN 1392-6292. eISSN 1648-3510 |
| Keywords [eng] |
Sturm–Liouville Problem ; Characteristic Function ; Spectrum Curves ; Critical point ; Integral Boundary Condition |
| Abstract [eng] |
We consider Sturm–Liouville problem with one integral type nonlocal boundary condition depending on three parameters γ (multiplier in nonlocal condition), ξ<sub>1</sub>, ξ<sub>2</sub> ([ξ<sub>1</sub>,ξ<sub>2</sub>] is a domain of integration). The distribution of zeroes, poles, and constant eigenvalue points of Complex Characteristic Function is presented. We investigate how Spectrum Curves depend on the parameters of nonlocal boundary conditions. In this paper we describe the behaviour of Spectrum Curves and classify critical points of Complex-Real Characteristic function. Phase Trajectories of critical points in Phase Space of the parameters ξ<sub>1</sub>,ξ<sub>2</sub>are investigated. We present the results of modelling and computational analysis and illustrate those results with graphs. |
| Published |
Abingdon, Oxfordshire : Taylor&Francis and VGTU |
| Type |
Journal article |
| Language |
English |
| Publication date |
2015 |
| CC license |
|
