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dc.contributor.authorMonzner, Alexandra-
dc.contributor.authorZapolsky, Frol-
dc.date.accessioned2011-02-11T10:50:29Z-
dc.date.available2011-02-11T10:50:29Z-
dc.date.issued2011-02-11-
dc.identifier.urihttp://hdl.handle.net/2003/27616-
dc.identifier.urihttp://dx.doi.org/10.17877/DE290R-15855-
dc.description.abstractWe compare two functionals defined on the space of continuous functions with compact support in an open neighborhood of the zero section of the cotangent bundle of a torus. One comes from Viterbo's symplectic homogenization, the other from the Calabi quasi-states due to Entov and Polterovich. In dimension 2 we are able to say when these two functionals are equal. A partial result in higher dimensions is presented. We also give a link to asymptotic Hofer geometry on T^*S^1. Proofs are based on the theory of quasi-integrals and topological measures on locally compact spaces.en
dc.language.isoen-
dc.subject.ddc610-
dc.titleA comparison of symplectic homogenization and Calabi quasi-statesen
dc.typeTextde
dc.type.publicationtypepreprinten
dcterms.accessRightsopen access-
Appears in Collections:Preprints der Fakultät für Mathematik

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