Abstract
Three proofs and a generalization of the Goulden-Litsyn-Shevelev conjectured that certain Laurent polynomials associated with the solution of a functional equation have only odd negative powers. We prove their conjecture and generalize it.
- Title
- Three proofs of the Goulden-Litsyn-Shevelev conjecture on a sequence arising in algebraic geometry
- Creators
- Brian DrakeIra M GesselGuoce Xin
- Publication Details
- Journal of Integer Sequences, Vol.10(3), 07.3.7
- Identifiers
- 9924086062001921
- Academic Unit
- Department of Mathematics
- Language
- English
- Resource Type
- Journal article