Givi Berikelashvili, Nodar Khomeriki and Manana Mirianashvili
abstract:
We consider an initial boundary value problem for the 1D nonlinear Burgers'
equation. A~three-level finite difference scheme is studied. Two-level scheme is
used to find the values of unknown function on the first level. The obtained
algebraic equations are linear with respect to the values of the unknown
function for each new level. It is proved that the scheme is convergent at rate
$O(\tau^{k-1}+h^{k-1})$ in discrete $L_2$-norm when an exact solution belongs to
the Sobolev space $W_2^k$, $2<k\leq 3$.
Mathematics Subject Classification: 65M06, 65M12, 76B15
Key words and phrases: Burgers' equation, difference scheme, convergence rate.