Explore: Sivashinsky Equation

In mathematics, the Kuramoto–Sivashinsky equation (also called the KS equation) is a partial differential equation used to model complex patterns and

differential equations, originally introduced as a model of flame front propagation. The one-dimensional Kuramoto–Sivashinsky equation is u t + u u x

In combustion, Michelson–Sivashinsky equation describes the evolution of a premixed flame front, subjected to the Darrieus–Landau instability, in the small

Poisson–Boltzmann equation in molecular dynamics Radioactive decay equations Gardner equation Hasegawa–Mima equation KdV equation Kuramoto–Sivashinsky equation Vlasov

Sivashinsky (also known as Grisha) is a professor at Tel Aviv University, working in the field of combustion and theoretical physics. Sivashinsky was

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

separation of the Cahn–Hilliard equation to the Navier–Stokes equations of fluid flow. Allen–Cahn equation Kuramoto–Sivashinsky equation De Jesus, Melissa; Gal

See also Nonlinear partial differential equation, List of partial differential equation topics and List of nonlinear ordinary differential equations.

"Back in the saddle again: a computer assisted study of the Kuramoto–Sivashinsky equation", SIAM Journal on Applied Mathematics, 50(3), 760-790 (1990). Michael

Forman A. Williams Moshe Matalon John D. Buckmaster Amable Liñán Gregory Sivashinsky John W. Dold "Obituary of Guy Joulin". Domínguez-González, A., Kurdyumov