AbstractSingle-step methods, coupled with Galerkin discretizations in space, are applied to second-order hyperbolic equations. These methods are applied directly to the second-order equations. Optimal order convergence estimates are derived
AbstractUsing weighted norms, L∞-error estimates of the Galerkin method for second order hyperbolic ...
. We analyze a single step method for solving second-order parabolic initial--boundary value problem...
AbstractWe consider the original discontinuous Galerkin method for the first-order hyperbolic proble...
AbstractError estimates are proved for finite-element approximations to the solution of an initial b...
AbstractOptimal order rates of convergence are proved for fully discrete approximations for nonlinea...
AbstractSingle-step methods, coupled with Galerkin discretizations in space, are applied to second-o...
A new class of fully discrete Galerkin/Runge-Kutta methods is constructed and analyzed for semilinea...
AbstractWe compare the efficiency (attained level of accuracy vs cost) of a class of Galerkin method...
AbstractEfficient procedures for time-stepping Galerkin methods for approximating smooth solutions o...
AbstractError estimates valid for all t ⩾ 0 for the semi-discrete Galerkin approximation of a parabo...
Standard discontinuous Galerkin methods, based on piecewise polynomials of degree $ \qq=0,1$, are co...
AbstractWe investigate explicit higher order time discretizations of linear second order hyperbolic ...
AbstractThe standard Galerkin method is studied for nonlinear hyperbolic conservation laws in two sp...
AbstractGalerkin fully discrete approximations for hyperbolic equations with time-dependent coeffici...
We develop the convergence analysis of discontinuous Galerkin finite element approximations to secon...
AbstractUsing weighted norms, L∞-error estimates of the Galerkin method for second order hyperbolic ...
. We analyze a single step method for solving second-order parabolic initial--boundary value problem...
AbstractWe consider the original discontinuous Galerkin method for the first-order hyperbolic proble...
AbstractError estimates are proved for finite-element approximations to the solution of an initial b...
AbstractOptimal order rates of convergence are proved for fully discrete approximations for nonlinea...
AbstractSingle-step methods, coupled with Galerkin discretizations in space, are applied to second-o...
A new class of fully discrete Galerkin/Runge-Kutta methods is constructed and analyzed for semilinea...
AbstractWe compare the efficiency (attained level of accuracy vs cost) of a class of Galerkin method...
AbstractEfficient procedures for time-stepping Galerkin methods for approximating smooth solutions o...
AbstractError estimates valid for all t ⩾ 0 for the semi-discrete Galerkin approximation of a parabo...
Standard discontinuous Galerkin methods, based on piecewise polynomials of degree $ \qq=0,1$, are co...
AbstractWe investigate explicit higher order time discretizations of linear second order hyperbolic ...
AbstractThe standard Galerkin method is studied for nonlinear hyperbolic conservation laws in two sp...
AbstractGalerkin fully discrete approximations for hyperbolic equations with time-dependent coeffici...
We develop the convergence analysis of discontinuous Galerkin finite element approximations to secon...
AbstractUsing weighted norms, L∞-error estimates of the Galerkin method for second order hyperbolic ...
. We analyze a single step method for solving second-order parabolic initial--boundary value problem...
AbstractWe consider the original discontinuous Galerkin method for the first-order hyperbolic proble...