Internet Resources for
Pole and Singularity
- Poles
Nils Andersson, Math. Dept., University of Southampton, Highfield,
UK
- Pole
Eric Weisstein, World of Mathematics, Wolfram Res., Inc.,
Champaign, IL
- Simple
Pole
Eric Weisstein, World of Mathematics, Wolfram Res., Inc.,
Champaign, IL
- Laurent
Series, Singularities And Residues
Michael Levitin, Math. Dept., Heriot-Watt University, Edinburgh,
Scotland
- Pole
(complex analysis)
Wikipedia, the free encyclopedia
- Poles
and Zeros
Manfred Thole, Netzwerktheorie und Schaltungstechnik, Tech. Univ.
Braunschweig, Germany
- Pole-Zero
Analysis
Julius O. Smith, Computer Research in Music and Acoustics,
Stanford University, CA
- Complex
one-pole resonator
Julius O. Smith, Computer Research in Music and Acoustics,
Stanford University, CA
- Poles
and Zeros of the Z-Transform
Michael Haag, Connexions Project, Rice University, Houston,
TX
- The
singularity at z=0 is a pole of first
order.
Bernd Thaller, Institute of Mathematics, University of Graz,
Austria
- Isolated
singularities
Thierry Dana-Picard, Jerusalem College of Technology,
Israel
- Residues
at Multiple Poles
Nils Andersson, Math. Dept., University of Southampton, Highfield,
UK
- Laurent
series
Fabricio Ferrari, Physics Dept., Universidade Federal de Santa
Catarina, Brasil
- Isolated
Singularities and Series Expansions
Lang Moore; David Smith, Math. Dept., Duke University, Durham,
NC
- Residues
John Inglesfield, Physics and Astronomy Dept., Cardiff University,
Cardiff, UK
- Evaluation
of integrals by using the residues at
poles
Harold V. McIntosh, Dept. de Aplicación de
Microcomputadoras, Univ. Autónoma de Puebla,
México.
- ...
Poles of Analytic Functions PDF
Niles A. Pierce, Math. Dept., California Institute of Technology,
Pasadena, CA
- Isolated
singularities
Keith Hirst, Math. Dept., University of Southampton. Highfield,
Southampton, UK
Return
to the Complex Analysis Project
(c) John
H. Mathews 2003