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dc.contributor.authorWesselkamper, Thomas C.en_US
dc.date.accessioned2013-06-19T14:37:07Z
dc.date.available2013-06-19T14:37:07Z
dc.date.issued1977
dc.identifierhttp://eprints.cs.vt.edu/archive/00000820/en_US
dc.identifier.urihttp://hdl.handle.net/10919/20300
dc.description.abstractAn alternative is provided to a recently published method of Benjauthrit and Reed for calculating the coefficients of the polynomial expansion of a given function. The method herein is an adaptation to finite fields of a method of Newton. The method is exhibited for functions of one and two variables. The relative advantages and disadvantages of the two methods are discussed. Some empirical results are given for GF(9) and GF(16). It is shown that functions with "don't care" states are represented by a polynomial of minimal degree by this method.en_US
dc.format.mimetypeapplication/pdfen_US
dc.publisherDepartment of Computer Science, Virginia Polytechnic Institute & State Universityen_US
dc.relation.ispartofHistorical Collection(Till Dec 2001)en_US
dc.titleDivided Difference Methods for Galois Switching Functionsen_US
dc.typeTechnical reporten_US
dc.identifier.trnumberCS77005-Ren_US
dc.type.dcmitypeTexten_US
dc.identifier.sourceurlhttp://eprints.cs.vt.edu/archive/00000820/01/CS77005-R.pdf


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