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dc.contributor.authorBurdzy, Krzysztof
dc.contributor.authorBass, Richard F.
dc.contributor.authorKhoshnevisan, Davar
dc.date.accessioned2005-11-18T19:18:21Z
dc.date.available2005-11-18T19:18:21Z
dc.date.issued1994-04
dc.identifier.citationBass, R.F., K. Burdzy, & D. Khoshnevisan. (1994). Intersection local time for points of infinite multiplicity. Annals of Probability, 22, 566-625.en
dc.identifier.urihttp://hdl.handle.net/1773/2177
dc.description.abstractFor each a [is an element of the set] (0, 1/2), there exists a random measure [beta] [subscript] a which is supported on the set of points where two-dimensional Brownian motion spends a units of local time. The measure [beta] [subscript] a is carried by a set which has Hausdorff dimension equal to 2−a. A Palm measure interpretation of [beta] [subscript] a is given.en
dc.description.sponsorshipResearch partially supported by NSF grant DMS 91-00244.en
dc.format.extent404486 bytes
dc.format.mimetypeapplication/pdf
dc.language.isoen_US
dc.publisherInstitute of Mathematical Statisticsen
dc.subjectBrownian motionen
dc.subjectlocal timeen
dc.subjectintersection local timeen
dc.subjectexcursionsen
dc.subjectexit systemen
dc.titleIntersection local time for points of infinite multiplicityen
dc.typeArticleen


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