Euler-Lagrange equations for holomorphic structures on twistorial generalized Kähler manifolds
Journal: NEW TRENDS IN MATHEMATICAL SCIENCES (Vol.4, No. 1)Publication Date: 2016-01-01
Authors : Zeki Kasap;
Page : 193-202
Keywords : Twistor Kählerian manifold mechanical system dynamic equation almost complex Lagrangian formalism.;
Abstract
The paper aims to introduce some partial di¤erential equations on Twistorial generalized Kähler manifolds, with an emphasis on Euler-Lagrange equations. Twistor spaces are certain complex 3-manifolds which are associated with special conformal Riemannian geometries on 4-manifolds. Also, classical mechanic is one of the major subfields for mechanics system. A mechanical system has a state determined by a collection of real numbers, or more generally by a set of points in an appropriate state space. Euler-Lagrange equations are an e¢ cient use of classical mechanics to solve problems using mathematical modeling. In this study, showing motion modeling partial di¤erential equations have been obtained for movement of objects in space and solutions of these equations have been generated by using the Maple software. Additionally, of the implicit solution of the equations to be drawn the graph.
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Last modified: 2016-10-30 05:08:39