Conditions and evidence for non-integrability in the Friedmann-Robertson-Walker Hamiltonian |
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Authors: | Sergi Simon |
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Affiliation: | Department of Mathematics, University of Portsmouth Lion Gate Bldg, Lion Terrace Portsmouth PO1 3HF, UK sergi.simon@port.ac.uk |
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Abstract: | This is an example of application of Ziglin-Morales-Ramis algebraic studies in Hamiltonian integrability, more specifically the result by Morales, Ramis and Simó on higher-order variational equations, to the well-known Friedmann-Robertson-Walker cosmological model. A previous paper by the author formalises said variational systems in such a way allowing the simple expression of notable elements of the differential Galois group needed to study integrability. Using this formalisation and an alternative method already used by other authors, we find sufficient conditions whose fulfilment for given parameters would entail very simple proofs of non-integrability – both for the complete Hamiltonian, a goal already achieved by other means by Coelho et al, and for a special open case attracting recent attention. |
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Keywords: | Hamiltonian integrability Differential Galois Theory Ziglin-Morales-Ramis theory Cosmology Friedmann-Robertson-Walker metric numerical detection of chaos monodromy group |
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