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The the symplectic handouts (LecturesonSymplecticGeometry)(Chinese Edition)

paperback. Etat : New. Ship out in 2 business day, And Fast shipping, Free Tracking number will be provided after the shipment.Paperback. Pub Date: Unknown Pages: 245 Publisher: Tsinghua University Press. basic information Original Price: 49.00 yuan: (U.S.) Apostle Berg book. Li Yi Compilation and Translation Press: Tsinghua University Press ISBN: 9787302294986 Pages: 245 times: 1 Binding: Paperback: 16 Published :2012-10-1 Printing time: Words: 301.000 commodities identification: 22903489 Description symplectic geometry Handouts is American the famous mathematician shlomosternberg in 2010 professor at Tsinghua University symplectic geometry handouts. divided into two parts. The first part (Chapter 1 to Chapter 10) of the symplectic group symplectic areas symplectic manifold and kostant-souriau theorem; second part (Chapter 11 to Chapter 16). respectively. discussed marle constant rank embedding theorem convex torus theorem. hamiltonian linearization theorem and minimal even right. The symplectic handouts available for scholars engaged in related research in the field of symplectic geometry and differential geometry reference. as senior undergraduate and graduate teaching materials and reference books. Author Introduction Chapter 1 Introduction and background 1.1 Some history 1.2 linear symplectic geometry 1.3 1.4 Linear hamilton theory of symplectic group 1.5gaussian optical method of hamilton Chapter 2 symplectic group 2.1 basics recalled 2.2 polar decomposition 2.3 symplectic group elements in the coordinates to describe the 2.4 symplectic matrix eigenvalue 2.5 sp () lie algebra 2.6sp () polar decomposition the the cartan of 2.7 sp () decomposition 2.8sp () tight subgroup 2.9sp () of gaussian 3.1 scope theory generator Chapter 3 linear symplectic areas 3.2 sets and relations 3.3 Categorization point 3.4 linear symplectic areas the 3.5 linsym areas and symplectic groups Chapter 4 symplectic vector space lagrangian subspace and further hamilton 4.1 a finite lagrangian subspace cross section lagrangian subspace 4.2l (). sp () role on the 4.3 generation function - hamilton idea of ??a simple example of Chapter 5 review of the differential operator. generalized weil identity. moser skills and darboux of type theorem 5.1 the superalgebra 5.2 Differential form of 5.3d operators 5.4 Derivations 5.5 pullback 5.6lie derivative 5.7weil formula 5.8 generalized weil formula 5.9 chain homotopy 5.10moser skills 6th Chapter symplectic manifold and hamiltonlan mechanics 6.1 symplectic manifold defined 6.2poisson brackets 6.3poisson algebra 6.4 basic local example 6.5 the hamiltonian mechanics 7.1 on the cotangent bundle in Chapter 7 cotangent bundle cotangent bundle Review 7.2 cotangent bundle hamiltonian mechanics: Continued 7.3euler-lagrange equation 7.4 cotangent bundle On the variational calculation of 7.5 some riemannian geometric variational 7.6 Another question - hamilton principle 7.7 Appendix: the legendre transform as a lagrangian sub-manifold of Chapter 8 of approximately 8.1 frobenius Theorem 8.2 closed form about 8.3 drowned level and basic form of the ninth chapter symplectic groups and torque mapping swarm 9.1lie background knowledge and notation 9.2 Sim for 9.3hamiltonian role and its torque torque mapped continued Reductive Mapping Chapter 10 the 10.1 torque mapping derivative form of 10.2kostant-souriau 10.3 torque mapping derivative: Continued 10.4 torque mapping I accompanied the inverse image of the track and about abstract definition of the collective motion of the Chapter 11 collective motion and semidirect 11.1 11.2 Xie collective hamiltonian hamilton equation 11.3 semi-direct product of 11.4 collectives and constant hamiltonian Chapter 12 marie constant rank embedding theorem. torque mapping the positive is the form and Sim induced 12.1 compact group role 12.2 marie often rank embedding theorem 12.3 is the form and duistermaat-heckman Theorem 12.4t * g the rebirth of nature and Sim induced 12.5 Sim induced Chapter 13 torus role of convex. N° de réf. du vendeur EJ010846

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