This paper is concerned with the strong stability preserving (SSP) time discretizations for semi-discrete systems, obtained from applying the method of lines to time-dependent partial differential equations. We focus on the construction of explicit hybrid methods with nonnegative coefficients, which are a class of multistep methods incorporating a function evaluation at an off-step point. A series of new SSP methods are found. Among them, the low order methods are more efficient than some well known SSP Runge-Kutta or linear multistep methods. In particular, we present some fifth to seventh order methods with nonnegative coefficients, which have healthy CFL coefficients. Finally, some numerical experiments on the Burgers equation are given. © 2008 IMACS.
CITATION STYLE
Huang, C. (2009). Strong stability preserving hybrid methods. Applied Numerical Mathematics, 59(5), 891–904. https://doi.org/10.1016/j.apnum.2008.03.030
Mendeley helps you to discover research relevant for your work.