The Partition Method for a Power Series Expansion

Dr Victor Kowalenko is a Senior Research Fellow in the Department of Mathematics and Statistics, University of Melbourne, Australia. Since 2009, he has been associated with the ARC Centre of Excellence in Mathematics and Statistics of Complex Systems. He began his research career by joining the DSTO’s railgun project in Maribyrnong in the early 1980’s before transferring to the DSTO facility at Fishermen’s Bend to work on aeronautical systems. He then returned to the Department of Physics, University of Melbourne as one of the inaugural Australian Research Fellows to work on particle-anti-particle plasmas and general relativistic magnetohydrodynamics. It was here that he introduced the partition method for a power expansion. Between 2001 and 2003, when he was a Senior Research Fellow in the School of Computer Science and Software Engineering, Monash University, he was able to develop the method further and to extend it to intractable problems in mathematics and physics.

1. Introduction2. More Advanced Applications3. Generating Partitions4. General Theory5. Programming the Partition Method for a Power Series Expansion6. Operator Approach7. Classes of Partitions8. The Partition-Number Generating Function and Its Inverted Form9. Generalization of the Partition-Number Generating Function10. ConclusionsAppendix A. RegularizationAppendix B. Computer Programs