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200 12$aA sermon on the parable of the sower$etaken out of the 13. of Matthew$b[electronic resource] /$fPreached at London by M.G. Gifford, and published at the request of sundry godly and well disposed persons
210   $aLondon $cIohn Wolfe, for Toby Cooke.$d1584
215   $a[40] p
300   $aTitle within ornamental border (McK. & Ferg. 201), printers' device (McK. 235); initials, tailpiece (McK. 379 var.).
300   $aImperfect: sign. B₈ lacking; stained, and print show-through.
300   $aReproduction of original in: Folger Shakespeare Library.
330   $aeebo-0055
606   $aSower (Parable)$vSermons$vEarly works to 1800
606   $aSermons, English$y16th century
615  0$aSower (Parable)
615  0$aSermons, English
700   $aGifford$b George$f1547 or 8-1600.$0695308
801  0$bEBK
801  1$bEBK
906   $aBOOK
912   $a996390443503316
996   $aA sermon on the parable of the sower$92321848
997   $aUNISA

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040   $aDip.to Fisica$beng
082 00$a515/.625$222
084   $aLC QA431
084   $a510.34
245 00$aSymmetries and integrability of difference equations /$cedited by Decio Levi ... [et al.].
260   $aCambridge ;$aNew York :$bCambridge University Press,$c2011
300   $axviii, 341 p. :$bill. ;$c23 cm
440  0$aLondon Mathematical Society lecture note series,$x0076-0552 ;$v381
504   $aIncludes bibliographical references.
505 8 $aMachine generated contents note: 1. Lagrangian and Hamiltonian formalism for discrete equations: symmetries and first integrals V. Dorodnitsyn and R. Kozlov; 2. Painleve; equations: continuous, discrete and ultradiscrete B. Grammaticos and A. Ramani; 3. Definitions and predictions of integrability for difference equations J. Hietarinta; 4. Orthogonal polynomials, their recursions, and functional equations M. E. H. Ismail; 5. Discrete Painleve; equations and orthogonal polynomials A. Its; 6. Generalized Lie symmetries for difference equations D. Levi and R. I. Yamilov; 7. Four lectures on discrete systems S. P. Novikov; 8. Lectures on moving frames P. J. Olver; 9. Lattices of compact semisimple Lie groups J. Patera; 10. Lectures on discrete differential geometry Yu. B Suris; 11. Symmetry preserving discretization of differential equations and Lie point symmetries of differential-difference equations P. Winternitz.
520   $a"Difference equations are playing an increasingly important role in the natural sciences. Indeed many phenomena are inherently discrete and are naturally described by difference equations. Phenomena described by differential equations are therefore approximations of more basic discrete ones. Moreover, in their study it is very often necessary to resort to numerical methods. This always involves a discretization of the differential equations involved, thus replacing them by difference equations. This book shows how Lie group and integrability techniques, originally developed for differential equations, have been adapted to the case of difference ones. Each of the eleven chapters is a self-contained treatment of a topic, containing introductory material as well as the latest research results. The book will be welcomed by graduate students and researchers seeking an introduction to the field. As a survey of the current state of the art it will also serve as a valuable reference"
650  0$aDifference equations
650  0$aSymmetry (Mathematics)
650  0$aIntegrals
700 1 $aLevi, Decio
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996   $aSymmetries and integrability of difference equations$9242391
997   $aUNISALENTO
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