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比利时vs摩洛哥足彩 ,
university of california san diego

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final defense

joseph palmer

ucsd

symplectic invariants and moduli spaces of integrable systems

abstract:

integrable systems are, roughly, dynamical systems with many conserved quantities. recently, pelayo-v\~{u} ng\d{o}c classified semitoric integrable systems, which generalize toric integrable systems in dimension four, in terms of five symplectic invariants. using this classification, i construct a metric on the space of semitoric integrable systems. by studying continuous paths in this space produced via symplectic blowups i determine its connected components. this uses a new algebraic technique in which i lift matrix equations from $\mathrm{sl}(2,\mathbb{z})$ to its preimage in the universal cover of $\mathrm{sl}(2,\mathbb{r})$ and i further use this technique to completely classify all semitoric minimal models. i also produce invariants of integrable systems by constructing an equivariant version of the ekeland-hofer symplectic capacities and, as a first step towards a metric on general integrable systems, i provide a framework to study convergence properties of families of maps between manifolds which have distinct domains. this work is partially joint with \'alvaro pelayo, daniel m. kane, and alessio figalli.

advisor: alvaro pelayo

april 6, 2016

3:00 pm

ap&m 2402

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