- In mathematics, the Kuramoto–
Sivashinsky equation (also
called the KS
equation or
flame equation) is a fourth-order
nonlinear partial differential equation...
- with an
exponential mapping period doubling bifurcation The Kuramoto–
Sivashinsky equation is an
example of a
spatiotemporally continuous dynamical system...
-
Sivashinsky (also
known as Grisha) is a
professor at Tel Aviv University,
working in the
field of
combustion and
theoretical physics.
Sivashinsky was...
- In combustion, Michelson–
Sivashinsky equation describes the
evolution of a
premixed flame front,
subjected to the Darrieus–Landau instability, in the...
- 13762. Bird,
Stewart &
Lightfoot 2007, p. 163.
Lesieur 2012, pp. 2–.
Sivashinsky &
Yakhot 1985, p. 1040. Xie &
Levchenko 2019, p. 045434.
Sharipov & Benites...
-
Forman A.
Williams Moshe Matalon John D.
Buckmaster Amable Liñán
Gregory Sivashinsky John W. Dold Joulin, G. (1979). Existence, stabilité et structuration...
-
equations Gardner equation Hasegawa–Mima
equation KdV
equation Kuramoto–
Sivashinsky equation Vlasov equation Dirac equation, the
relativistic wave equation...
- who
formulated the
Kuramoto model and is also
known for the Kuramoto–
Sivashinsky equation. He is also the
discoverer of so-called
chimera states in networks...
-
Quantitative stability theory for
premixed flames were
developed by
Gregory Sivashinsky (1977), Guy
Joulin and Paul
Clavin (1979) and for
diffusion flames by...
- Navier–Stokes
equations of
fluid flow. Allen–Cahn
equation Kuramoto–
Sivashinsky equation Cahn, John W.; Hilliard, John E. (1958). "Free
Energy of a Nonuniform...