Spectral flow is the integral of one forms on the Banach manifold of self adjoint Fredholm operators

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dc.contributor.authorCarey, Alan
dc.contributor.authorPotapov, Denis
dc.contributor.authorSukochev, Fedor A
dc.date.accessioned2015-12-08T22:40:43Z
dc.date.issued2009
dc.date.updated2016-02-24T11:54:39Z
dc.description.abstractOne may trace the idea that spectral flow should be given as the integral of a one form back to the 1974 Vancouver ICM address of I.M. Singer. Our main theorem gives analytic formulae for the spectral flow along a norm differentiable path of self adjoint
dc.identifier.issn0001-8708
dc.identifier.urihttp://hdl.handle.net/1885/36623
dc.publisherAcademic Press
dc.sourceAdvances in Mathematics
dc.subjectKeywords: Fredholm operator; Spectral flow; von Neumann algebra
dc.titleSpectral flow is the integral of one forms on the Banach manifold of self adjoint Fredholm operators
dc.typeJournal article
local.bibliographicCitation.issue5
local.bibliographicCitation.lastpage1849
local.bibliographicCitation.startpage1809
local.contributor.affiliationCarey, Alan, College of Physical and Mathematical Sciences, ANU
local.contributor.affiliationPotapov, Denis, University of New South Wales
local.contributor.affiliationSukochev, Fedor A, Flinders University
local.contributor.authoruidCarey, Alan, u4043636
local.description.embargo2037-12-31
local.description.notesImported from ARIES
local.identifier.absfor010199 - Pure Mathematics not elsewhere classified
local.identifier.ariespublicationu9209279xPUB138
local.identifier.citationvolume222
local.identifier.doi10.1016/j.aim.2009.06.020
local.identifier.scopusID2-s2.0-69849088227
local.identifier.thomsonID000273016300011
local.type.statusPublished Version

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