A time-stepping DPG scheme for the heat equation
Thomas Führer, Norbert Heuer, and Jhuma Sen Gupta
Comput. Methods Appl. Math. 17 (2), 237-252, 2017.
We introduce and analyze a discontinuous Petrov-Galerkin method with optimal test functions
for the heat equation. The scheme is based on the backward Euler time stepping and uses an ultra-weak
variational formulation at each time step. We prove the stability of the method for
the field variables (the original unknown and its gradient weighted by the square root
of the time step) and derive a Céa-type error estimate. For low-order approximation spaces
this implies certain convergence orders when time steps are not too small in comparison with mesh sizes.
Some numerical experiments are reported to support our theoretical results.