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dc.contributorJames Glazebrook Program Manageren_US
dc.contributor.authorJames Reineck Principal Investigatoren_US
dc.datestart 07/01/1991en_US
dc.dateexpiration 06/30/1994en_US
dc.date.accessioned2014-04-02T18:27:53Z
dc.date.available2014-04-02T18:27:53Z
dc.date.issued2014-04-02
dc.identifier9102914en_US
dc.identifier.urihttp://hdl.handle.net/10477/24047
dc.descriptionGrant Amount: $ 39696en_US
dc.description.abstractThe principal investigator will continue his study of connection matrices. The research combines methods from algebraic geometry and the qualitative theory of differential equations. Topics to be studied include the Conley index, Floer homology, and traveling wave solutions to reaction diffusion equations. The connection matrix is a device which formulates certain aspects of partial differential equations in an algebraic framework. The principal investigator will attempt to develop computational methods which take advantage of the algebraic framework and thus obtain more precise qualitative information on the differential equations. The predator - prey problem will be one of the classical problems to which this research will be applied.en_US
dc.titleMathematical Sciences: The Conley Index: Theory and Applicationsen_US
dc.typeNSF Granten_US


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