Maple Professional
Maple Academic
Maple Student Edition
Maple Personal Edition
Maple Player
Maple Player for iPad
MapleSim Professional
MapleSim Academic
Maple T.A. - Testing & Assessment
Maple T.A. MAA Placement Test Suite
Möbius - Online Courseware
Machine Design / Industrial Automation
Aerospace
Vehicle Engineering
Robotics
Power Industries
System Simulation and Analysis
Model development for HIL
Plant Modeling for Control Design
Robotics/Motion Control/Mechatronics
Other Application Areas
Mathematics Education
Engineering Education
High Schools & Two-Year Colleges
Testing & Assessment
Students
Financial Modeling
Operations Research
High Performance Computing
Physics
Live Webinars
Recorded Webinars
Upcoming Events
MaplePrimes
Maplesoft Blog
Maplesoft Membership
Maple Ambassador Program
MapleCloud
Technical Whitepapers
E-Mail Newsletters
Maple Books
Math Matters
Application Center
MapleSim Model Gallery
User Case Studies
Exploring Engineering Fundamentals
Teaching Concepts with Maple
Maplesoft Welcome Center
Teacher Resource Center
Student Help Center
SumTools[Hypergeometric][PolynomialNormalForm] - construct the polynomial normal form of a rational function
Calling Sequence
PolynomialNormalForm(F, n)
Parameters
F
-
rational function of n
n
variable
Description
Let F be a rational function of n over a field K of characteristic 0. The PolynomialNormalForm(F,n) command constructs the polynomial normal form for F.
The output is a sequence of 4 elements where z is an element of K, and are monic polynomials over K such that:
Note: E is the automorphism of K(n) defined by {E(F(n)) = F(n+1)}.
Examples
Check the results.
Condition 1 is satisfied.
Condition 2 is satisfied.
Condition 3 is satisfied.
See Also
evalb, LREtools[dispersion], subs, SumTools[Hypergeometric], SumTools[Hypergeometric][Gosper], SumTools[Hypergeometric][RationalCanonicalForm]
References
Gosper, R.W., Jr. "Decision procedure for indefinite hypergeometric summation." Proc. Natl. Acad. Sci. USA. Vol. 75. (1977): 40-42.
Petkovsek, M. "Hypergeometric solutions of linear recurrences with polynomial coefficients." J. Symb. Comput. Vol. 14. (1992): 243-264.
Download Help Document
