- The staircase method Peter H. van der Kamp, G.R.W. Quispel
- Integrable Evolution Equations: a Diophantine Approach
- Journal of Nonlinear Mathematical Physics 20**, Volume *, Number *, 113 Article On testing integrability
- Almost Integrable Evolution Equations Peter H. van der Kamp and Jan A. Sanders
- Integrable systems and number theory Peter H. van der Kamp, Jan A. Sanders and Jaap Top
- IOP PUBLISHING JOURNAL OF PHYSICS A: MATHEMATICAL AND THEORETICAL J. Phys. A: Math. Theor. 40 (2007) 1278912798 doi:10.1088/1751-8113/40/42/S21
- September 28, 2007 9:29 WSPC -Proceedings Trim Size: 9in x 6in spt07N TOWARDS GLOBAL CLASSIFICATIONS
- Closed-form expressions for integrals of traveling wave reductions of integrable lattice
- Global classification of two-component approximately integrable evolution equations
- July 12, 2010 HIGHER ANALOGUES OF THE DISCRETE-TIME TODA
- Involutivity of sine-Gordon, pKdV and mKdV maps Dinh T. Tran, P.H. van der Kamp, G.R.W. Quispel
- Introduction In this introduction we describe the rise of the field of integrable equations. The
- pp. 73 90 Hanging a Carillon in a Broek-system
- Integreerbare Evolutievergelijkingen
- Symmetry condition in terms of Lie brackets. Peter H. van der Kamp
- Proceedings of Institute of Mathematics of NAS of Ukraine 2001, Vol. ??, Part ?, 1?? Finitely many symmetries
- Sufficient number of integrals for the pth-order Lyness equation This article has been downloaded from IOPscience. Please scroll down to see the full text article.
- Evolution of curvature invariants and lifting integrability
- September 28, 2007 16:9 WSPC -Proceedings Trim Size: 9in x 6in ws-sptRojasAbstr Lax representation for integrable OEs
- Lax representations for integrable maps Omar Rojas, Peter H van der Kamp and G R W Quispel
- Initial value problems for lattice equations. Peter H. van der Kamp
- Involutivity of integrals of sine-Gordon, modified KdV and potential Dinh T. Tran, P.H. van der Kamp, G.R.W. Quispel
- February 20, 2011 HIGHER ANALOGUES OF THE DISCRETE-TIME TODA
- Growth of degrees of integrable mappings Peter H. van der Kamp*
