Integral function approximations derived from inhomogeneous equations
dc.contributor.author | McInnes, A. W. | |
dc.date.accessioned | 2015-10-27T20:38:20Z | |
dc.date.available | 2015-10-27T20:38:20Z | |
dc.date.issued | 1990 | en |
dc.description.abstract | The formulation of the problem of obtaining a unique integral function approximation to a real-valued locally analytic function is given. The integral function in this case is derived from an inhomogeneous, linear differential equation. A careful distinction is made between the approximation of the integral form which defines the polynomial coefficients of the differential equation which defines the integral function, and the approximation by the integral function itself. This formulation enables us to obtain results for existence, uniqueness and order of approximation in both normal and non-normal cases. | en |
dc.identifier.issn | 0110-537X | |
dc.identifier.uri | http://hdl.handle.net/10092/11270 | |
dc.language.iso | en | |
dc.publisher | University of Canterbury. Dept. of Mathematics | en |
dc.relation.isreferencedby | NZCU | en |
dc.rights | Copyright Allan William McInnes | en |
dc.rights.uri | https://canterbury.libguides.com/rights/theses | en |
dc.subject | integral function approximation | en |
dc.subject | Hermite-Pade approximation | en |
dc.subject | order of approximation | en |
dc.subject.anzsrc | Fields of Research::49 - Mathematical sciences::4901 - Applied mathematics::490101 - Approximation theory and asymptotic methods | en |
dc.title | Integral function approximations derived from inhomogeneous equations | en |
dc.type | Reports | |
thesis.degree.grantor | University of Canterbury | en |
thesis.degree.level | Research Report | en |
thesis.degree.name | Research Report | en |
uc.bibnumber | 341513 | en |
uc.college | Faculty of Engineering | en |
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