Differentiably finite function: Difference between revisions

Browse history interactively

← Previous edit

Content deleted Content added

VisualWikitext

Revision as of 20:27, 15 May 2013 edit Mm (talk \| contribs) 88 edits slightly more complete definition; skeleton; refs ← Previous edit		Latest revision as of 10:33, 11 June 2013 edit undo Fredrik (talk \| contribs) 23,349 edits make this a redirect to Holonomic function
(3 intermediate revisions by 3 users not shown)
Line 1: #REDIRECT [[Holonomic function]] ~~{{Unreferenced\|date=January 2012}}~~ In mathematics, a '''differentiably finite function''' of one variable, also referred to as a '''D‑finite''' or '''holonomic''' '''function''', is a [[Function (mathematics)\|function]] which is a solution of a [[linear differential equation]] with polynomial coefficients. A '''differentiably finite''' (or D‑finite, or holonomic) '''power series''' is a [[formal power series]] that satisfies a linear differential equation with polynomial coefficients. ~~== Formal definition ==~~ ~~<!-- ground field, finite dim over K(x), formal vs analytic case -->~~ ~~<!-- counterexamples & ways to prove that a function is ''not'' D‑finite?~~ ~~-->~~ ~~== P-recursive sequences ==~~ ~~== Closure properties ==~~ ~~<!-- ring operations, algebraic substitution, Hadamard product -->~~ ~~== In combinatorics ==~~ ~~<!-- asymptotics? -->~~ ~~<!-- diagonals? we need an article on D-finite functions of several~~ ~~variables! -->~~ ~~== In computer algebra: differential equations as a data structure ==~~ ~~<!-- special functions? -->~~ ~~== Computation ==~~ ~~<!-- coefficients: binary splitting, baby steps-giant steps; values:~~ ~~"bit-burst" algorithm -->~~ ~~== Further reading ==~~ * {{cite book \|last1=Flajolet \|first1=Philippe \|last2=Sedgewick \|first2=Robert \|title=Analytic Combinatorics \|publisher=Cambridge University Press \|isbn=0521898064}} * {{cite book \|last1=Kauers \|first1=Manuel \|last2=Paule \|first2=Peter \|title=The Concrete Tetrahedron\| series=Text and Monographs in Symbolic Computation \|publisher=Springer \|isbn=978-3-7091-0444-6}} * {{cite book\|last=Stanley\|first=Richard P. \|year=1999\|title=Enumerative Combinatorics, Volume 2\|publisher=Cambridge University Press\|isbn=0-521-56069-1}} ~~[[Category:Functions and mappings]]~~ ~~{{mathanalysis-stub}}~~