Stephen Wiggins

Stephen R. Wiggins
Stephen R. Wiggins
Born	Oklahoma City, Oklahoma, US
Alma mater	Cornell, Caltech
Known for	Fluid dynamics, nonlinear dynamics and chaos in classical mechanics and mechanics applied to atomic systems
	Scientific career
Fields	Physics, Chemistry, Applied Mathematics
Institutions	University of Bristol
Doctoral advisor	Philip Holmes
Doctoral students	Tasso J. Kaper, Igor Mezić [1]

Stephen Ray Wiggins is an American applied mathematician, born in Oklahoma City, Oklahoma and best known for his contributions in nonlinear dynamics, chaos theory and nonlinear phenomena, influenced heavily by his PhD advisor Philip Holmes, whom he studied under at Cornell University. He is actively working on the advancement of computational applied mathematics at the University of Bristol, where he was the head of the Mathematics Department until 2008. Previously he was a professor at Caltech in Pasadena, California.[2]

Field of study

Stephen Wiggins contributed in many different areas of mathematical physics from classical dynamical systems point of view.

Nonlinear dynamics and chaos

His book Applied nonlinear dynamical systems and Chaos cited more than 3000 times.[3]

Transport theory and fluid dynamics

His recent works on chaotic mixing attract considerable interest, with the leading expert in the area, Julio Ottino.[4]

gollark: On the "I just want opencomputers to do what I want", it does not *know* what you want, and "I want it to display the RF here" is not a precise enough specification. A precise enough specification of what you want (which is also in a format the computer can understand) would be... code.

gollark: It can't interact with stuff outside the game (except internet cards), and you can edit, download, and do whatever else to it from within an OC computer.

gollark: This does *not* run "outside the game".

gollark: You can write software, in the form of Lua scripts, for OpenComputers computers.

gollark: Are you deliberately ignoring everything we have repeatedly and fairly clearly said?

References

On the geometrical and statistical properties of dynamical systems : Theory and applications (phd). California Institute of Technology. 1994.
Devaney, Robert L. (April 1989). "Review: Stephen Wiggins, Global bifurcation and chaos: analytical methods". Bulletin (New Series) of the American Mathematical Society. 20 (2): 256–259. doi:10.1090/S0273-0979-1989-15788-1. Retrieved 2008-10-22.
"Google Scholar".
Ottino, Julio M.; Wiggins, Stephen (2004). "Introduction: Mixing in microfluidics". Philosophical Transactions of the Royal Society of London. Series A: Mathematical, Physical and Engineering Sciences. 362 (1818): 923–935. doi:10.1098/rsta.2003.1355. PMID 15306477.

External links

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[1] On the geometrical and statistical properties of dynamical systems : Theory and applications (phd). California Institute of Technology. 1994.

[2] Devaney, Robert L. (April 1989). "Review: Stephen Wiggins, Global bifurcation and chaos: analytical methods". Bulletin (New Series) of the American Mathematical Society. 20 (2): 256–259. doi:10.1090/S0273-0979-1989-15788-1. Retrieved 2008-10-22.

[3] "Google Scholar".

[4] Ottino, Julio M.; Wiggins, Stephen (2004). "Introduction: Mixing in microfluidics". Philosophical Transactions of the Royal Society of London. Series A: Mathematical, Physical and Engineering Sciences. 362 (1818): 923–935. doi:10.1098/rsta.2003.1355. PMID 15306477.