PUBLICATIONS

Selected Papers

Acknowledgments. Ms Sarah Fliegelman of the Weizmann Institute, Israel did me the enormous courtesy of retyping my earlier papers into Tex format and thereby making these texts available online. The only compensation that she would accept for this laborious task was a topflite bowling ball. I have been too late in acknowledging her tremendous contribution. On October 20, 2002 Sarah passed away at the age of 54.
 
 
  M. Tabor and John Weiss,  Analytical structure of the Lorenz system,
  Phys. Rev. A 24,  p 2157  (1981). Download: Lorenz.pdf

  John  Weiss, M. Tabor and G. Carnevale,  The Painlevé Property for Partial Differential Equations,
  J Math Phys 24 p 552 (1983).    Downloads:  Pan1.dvi  , Pan1.ps.gz , Pan1.pdf
 
John Weiss,  The Painleve property for Partial Differential Equations, II:  Backlund transformation, Lax pairs and the Schwarzian  Derivative,
 J Math Phys 24 , p 1405  (1983)& Downloads: Pan2.dvi , Pan2.ps.gz , Pan2.pdf
 
John Weiss,  On classes of integrable systems and the Painleve property,
  J Math Phys 25,  p 13  (1984) Downloads: Pan3.dvi,Pan3.ps.gz, Pan3.pdf
 
John Weiss,  Backlund transformation and linearizations for the  Henon-Heiles system,
  Phys Lett 102A , p 329 (1984) Downloads: Pan4.dvi , Pan4.ps.gz , Pan4.pdf
 
John Weiss,  The Sine-Gordon equations: Complete and partial integrability,
  J Math Phys 25,  p 2226  (1984) Downloads: Pan5.dvi , Pan5.ps.gz , Pan5.pdf
 
John Weiss,   Backlund transformations and the Henon-Heiles system,
   Phys Letts 105A , p 387 (1984) Downloads: Pan6.dvi , Pan6.ps.gz , Pan6.pdf
 
John Weiss, The Painleve property and Backlund transformation for  the sequence of Boussinesq equations,
  J Math Phys 26, p 258 (1985) Downloads: Pan7.dvi , Pan7.ps.gz , Pan7.pdf
 
John Weiss,  Modified equations, rational solutions and the Painleve property for the KP and Hirota-Satsuma equations,
   J Math Phys 26, p 2174 (1985) Downloads: Pan8.dvi , Pan8.ps.gz , Pan8.pdf
 
John Weiss,  Backlund transformation and the Painleve property,
   J Math Phys 27, p 1293 (1986) Downloads: Pan9.dvi , Pan9.ps.gz , Pan9.pdf
 
John Weiss,  Periodic fixed points of Backlund transformations and  the Korteweg-de Vries equation,
  J Math Phys 27, p  2647 (1986) Downloads: Pan10.dvi , Pan10.ps.gz , Pan10.pdf
 
John  Weiss, Periodic fixed points of Backlund transformations,
  J Math Phys 28, p 2025 (1987) Downloads: Pan11.dvi , Pan11.ps.gz , Pan11.pdf
 
John Weiss,  Backlund transformations, Focal surfaces and the Two  dimensional Toda lattice,
  Phys Letts 137A, p 365 (1989) Downloads: Pan12.dvi , Pan12.ps.gz , Pan12.pdf
 
John Weiss,  Bäcklund transformations and the Painlevé property, in Les Houches school Partially Integrable Evolution Equations in Physics,
NATO ASI series C, Vol. 310, Editors: R. Conte & N. Boccara, Kluwer (1990). Downloads: Pan13.dvi , Pan13.ps.gz , Pan13.pdf

John Weiss,   The Singular Manifold Method, Proceedings of conference on The Painlevé transcendents, and their physical applications, St. Adele, Quebec (1990), Editor, P. Winternitz, Plenum Press (1992). Downloads: dew.pdf , dew.ps.zip


John Weiss,  The dynamics of enstrophy transfer in two dimensional hydrodynamics,
Physica D 48, pp. 273-294 (1991) Downloads:  turb2d.dvi , turb2d.ps.gz turb2d.pdf
 
  John Weiss,  Factorization of the (2+1)-dimensional BLP integrable system by the periodic fixed  points of its Bäcklund transformations,
Physics Letters A 160,  pp. 161-165 (1991)    Downloads: Pan14.dvi , Pan14.ps.gz , Pan14.pdf
 
Sam Qian and John Weiss, Wavelets and the Numerical Solution of Partial Differential Equations,
Journal of Computational Physics 106,  pp 155-175 (1993)   Downloads: QianandWeiss.pdf
 
John Weiss,  Applications of the Singular Manifold Method ,
Proceedings of the workshop on Nonlinearity, Integrability, and All That, held at Gallipoli, Lecce, Italy,
July 1 to July 10, 1999
Editors, M. Boiti, L. Martina, F. Pempinelli, B. Prinari, and G. Soliani,
World Scientific Press, Singapore, April 2000.   Downloads :  Pan15,dvi , Pan15.ps.gz , Pan15.pdf
 
  A. Latto, H.L. Resnikoff, and E. Tenenbaum, The Evaluation of Connection Coefficients of Compactly Supported Wavelets,Proceedings of the Princeton Conference on Wavelets and Turbulence, (1991). Downloads: con3_5.dvi , con3_5.ps.gz , con3_5.pdf
 
  A. Latto and E. Tenenbaum, Compactly supported wavelets and the numerical solution of Burgers' equation,
Comptes Rendus, French Academy of Science, t. 311, Serie I,  903-909, (1990).
Downloads: burger.dvi , burger.ps.gz , burger.pdf
 
John Weiss, The numerical resolution of turbulence and boundary value problems using the wavelet-Galerkin method,
Applied Math Group preprint, July 1996. Download: drc.dvi , drc.ps.gz , drc.pdf
 
  John Weiss,  Translation Invariance and the Wavelet Transform,
Aware preprint, January 1993. Download: trep3.dvi , trep3.ps.gz , trep3.pdf
 
  Stephen Del Marco and John Weiss,  Improved Transient Signal Detection using a wavepacket-based detector with an extended translation-invariant wavelet  transform,
IEEE Transactions on Signal Processing, Vol. 45, pp.  841-850, April 1997.
Download:  ETI.dvi , ETI.ps.gz , ETI.pdf
 
  John Weiss,  The Hilbert Transform of Wavelets are Wavelets,
  Applied Mathematics Group Report,  October 1995
Download: hilb.dvi , hilb.ps.gz , hilb.pdf

John Weiss, Solution of the Wave Equation using theWavelet-Galerkin Method,
Applied Mathematics Group Report, August 1998

John Weiss, Parallel Methods for the Schroedinger Equation using Domain Decomposition and the Wavelet-Capacitance Matrix, Applied Mathematics Group Report, January 1995

John Weiss, Thermal Analysis of a Multichip Module using the wavelet-Galerkin Method, Applied Mathematics Group Report, September 1995


 


The above papers can also be directly downloaded  by FTP. To obtain papers not yet included in the download directory contact us by E mail.

Our E-mail address is: johnweiss@rcn.com Our fax line is: 781-648-6757