Wolfram Language & System 10.0 (2014)|Legacy Documentation

This is documentation for an earlier version of the Wolfram Language.View current documentation (Version 11.2)


attempts to find a simple generating function in x whose n^(th) series coefficient is .

attempts to find a simple generating function whose ^(th) series coefficient is .

Details and OptionsDetails and Options

  • The sequence elements can be either exact numbers or symbolic expressions.
  • FindGeneratingFunction finds results in terms of a wide range of integer functions, as well as implicit solutions to difference equations represented by DifferenceRoot.
  • If FindGeneratingFunction cannot find a simple generating function that yields the specified sequence, it returns unevaluated.
  • FindGeneratingFunction has the following options:
  • FunctionSpaceAutomaticwhere to look for candidate simple generating functions
    MethodAutomaticmethod to use
    TimeConstraint10how many seconds to search a particular function space or perform a transformation
    ValidationLengthAutomaticsequence length used to validate a candidate generating function found
  • FindGeneratingFunction[list,x] by default uses earlier elements in list to find candidate simple generating functions, then validates the generating functions by looking at later elements.
  • FindGeneratingFunction[list,x] only returns functions that correctly reproduce all elements of list.
Introduced in 2008