Critical Point Theory for Lagrangian Systems, 2012
Progress in Mathematics Series, Vol. 293

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Language: English

Approximative price 52.74 €

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Critical Point Theory for Lagrangian Systems
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188 p. · 15.5x23.5 cm · Paperback

Approximative price 52.74 €

In Print (Delivery period: 15 days).

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Critical point theory for lagrangian systems (series: progress in mathematics)
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188 p. · 15.5x23.5 cm · Hardback
Lagrangian systems constitute a very important and old class in dynamics. Their origin dates back to the end of the eighteenth century, with Joseph-Louis Lagrange?s reformulation of classical mechanics. The main feature of Lagrangian dynamics is its variational flavor: orbits are extremal points of an action functional. The development of critical point theory in the twentieth century provided a powerful machinery to investigate existence and multiplicity questions for orbits of Lagrangian systems. This monograph gives a modern account of the application of critical point theory, and more specifically Morse theory, to Lagrangian dynamics, with particular emphasis toward existence and multiplicity of periodic orbits of non-autonomous and time-periodic systems.
1 Lagrangian and Hamiltonian systems.- 2 Functional setting for the Lagrangian action.- 3 Discretizations.- 4 Local homology and Hilbert subspaces.- 5 Periodic orbits of Tonelli Lagrangian systems.- A An overview of Morse theory.-Bibliography.- List of symbols.- Index.

Collects, in a rigorous and consistent style, many important results that are sparse in the literature

Exposition is self-contained

Arguments are presented in an elementary way in order to be accessible to the non-specialists

Includes supplementary material: sn.pub/extras