Paper Info
Title
Multivariate partial fraction expansion
Abstract
The Derive computer-algebra program has Expand as one of the menu choices: The user is prompted for successively less main expansion variables, which can be all of the variables or any proper subset. It is clear how to proceed when the expression is a polynomial: Fully distribute with respect to all expansion variables, but collect as coefficient polynomials all terms that share the same exponents for the expansion variables. Derive uses a partially factored form, so the collected coefficient polynomials can be fortuitously partially factored. For rational expressions the expand function does partial fraction expansion because it is the most useful kind of rational expansion. However, most other computer algebra systems and examples in the literature focus on partial fraction expansion with respect to only one variable, where any other variables are considered mere parameters. For consistency with multivariate polynomial expansion, we wanted a useful and well-defined meaning for multivariate partial fraction expansion. This paper provides such a definition and a corresponding algorithm.
Year
DOI
Venue
2008
10.1145/1504341.1504346
ACM Comm. Computer Algebra
Keywords
Field
DocType
expansion variable,useful kind,multivariate partial fraction expansion,rational expansion,rational expression,partial fraction expansion,coefficient polynomial,multivariate polynomial expansion,factored form,main expansion variable,computer algebra
Discrete mathematics,Combinatorics,Algebra,Polynomial,Expression (mathematics),Multivariate statistics,Symbolic computation,Partial fraction decomposition,Rational function,Multivariate polynomials,Mathematics
Journal
Volume
Issue
Citations 
42
4
4
PageRank 
References 
Authors
0.47
0
1
Name
Order
Citations
PageRank
David R. Stoutemyer14919.14