A unified method to prove Rogers-Ramanujan generalizations (Kagan Kursungöz)

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Description

The first of the famous Rogers-Ramanujan identities states that the number of partitions of a positive integer n into distinct non-consecutive parts equals the number of partitions of n into parts that are 1 or 4 mod 5. Gordon later extended this theorem for partitions into repeated parts with some limit on the number of occurrences. There have been many generalizations since then. We will describe a unified method of proving Rogers-Ramanujan-Gordon generalizations. Our starting point is Andrews' recent paper "Parity in Partitions" and we will work with larger moduli. As time allows, we will show how to apply the method in some results involving overpartitions.
Period09 Jan 2013
Event typeGuest talk
LocationAustriaShow on map

Fields of science

  • 101002 Analysis
  • 101013 Mathematical logic
  • 101001 Algebra
  • 101012 Combinatorics
  • 101020 Technical mathematics
  • 102 Computer Sciences
  • 101 Mathematics
  • 101009 Geometry
  • 102011 Formal languages
  • 101006 Differential geometry
  • 101005 Computer algebra
  • 101025 Number theory
  • 101003 Applied geometry
  • 102025 Distributed systems

JKU Focus areas

  • Computation in Informatics and Mathematics