Integrability of non-linear differential equations; lax formulation and bi-Hamiltonian structures

dc.contributor	Graduate Program in Physics.
dc.contributor.advisor	Oğuz, Ömer.
dc.contributor.author	Güntürk, Kamil Serkan.
dc.date.accessioned	2023-03-16T10:37:13Z
dc.date.available	2023-03-16T10:37:13Z
dc.date.issued	1998.
dc.identifier.other	PHYS 1998 G95
dc.identifier.uri	http://digitalarchive.boun.edu.tr/handle/123456789/13601
dc.description.abstract	The integrability of non-linear differential equations are studied on the basis of Lax and bi-Hamiltonian formulations. The relations between the Lax formalism and bi-Hamiltonian structures are analysed and illustrated with well known examples such as the KdV system. Various methods resulting from this analysis are then applied to multicomponent KdV equations.
dc.format.extent	30 cm.
dc.publisher	Thesis (M.S.) - Bogazici University. Institute for Graduate Studies in Sciences and Engineering, 1998.
dc.relation	Includes appendices.
dc.relation	Includes appendices.
dc.subject.lcsh	Korteweg-de Vries equation.
dc.subject.lcsh	Differential equations, Nonlinear.
dc.subject.lcsh	Hamiltonian systems.
dc.title	Integrability of non-linear differential equations; lax formulation and bi-Hamiltonian structures
dc.format.pages	vii, 71 leaves;