Title :
Computation of Stirling Numbers and Generalizations
Author :
S. Ilie;D.J. Jeffrey;R.M. Corless;X. Zhang
Author_Institution :
Dept. Math., Ryerson Univ., Toronto, ON, Canada
Abstract :
We consider the computation of Stirling numbers and generalizations for positive and negative arguments. We describe computational schemes for Stirling Partition and Stirling Cycle numbers, and for their generalizations to associated Stirling numbers. The schemes use recurrence relations and are more efficient than the current method used in Maple for cycle numbers, which is based on an algebraic expansion.
Keywords :
"Timing","Approximation algorithms","Mathematical model","Boundary conditions","Solids","Libraries"
Conference_Titel :
Symbolic and Numeric Algorithms for Scientific Computing (SYNASC), 2015 17th International Symposium on
DOI :
10.1109/SYNASC.2015.18
