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dc.contributor.advisorBukhgeim, Alexander L.
dc.contributor.authorDomme, Cristina C.
dc.date.accessioned2018-10-12T20:32:58Z
dc.date.available2018-10-12T20:32:58Z
dc.date.issued2018-07
dc.identifier.othert18037
dc.identifier.urihttp://hdl.handle.net/10057/15558
dc.descriptionThesis (M.S.)-- Wichita State University, College of Liberal Arts and Sciences, Dept. of Mathematics, Statistics, and Physics
dc.description.abstractWe obtain new estimates of stability for continuation of solutions of elliptic inequali- ties | ∂u|2 < = a|u|2 from finite discrete sets. For this we use Hormander's type of Carleman estimates for ∂-bar with boundary terms and a special weight function equal to the linear com-bination of Green's functions with singularities at points where our function is given. To estimate functions in a given domain we use not only the classical Blaschke partial sum Sn but we also introduce a new sequence of numbers Mn which gives us better estimates in the case of a finite number of observations.
dc.format.extentvii, 38 pages
dc.language.isoen_US
dc.publisherWichita State University
dc.rightsCopyright 2018 by Cristina Camelia Domme All Rights Reserved
dc.subject.lcshElectronic dissertation
dc.titleContinuation of solutions of elliptic systems from discrete sets with application to geometry of surfaces
dc.typeThesis


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