On the relation between Galerkin approximations and canonical best-approximations of solutions to some non-linear Schr\"odinger equations
Reviewed by Pithpith:6OMBPASUopen to challenge →
read the original abstract
In this paper, we establish a superconvergence property of Galerkin approximations to some non-linear Schr\"odinger equations of Gross-Pitaevskii type. More precisely, denoting by $u^*\in X \subseteq H^1(\Omega)$ the exact solution to such an equation, by $\{X_{\delta}\}_{\delta >0}$, a sequence of conforming subspaces of $X$ satisfying the approximation property, by $u_\delta^*\in X_{\delta}$ the Galerkin solution to the equation, and by $\Pi^X_{\delta} u^*$, the $(\cdot, \cdot)_{X}$-best approximation in $X_\delta$ of $u^*$, we show -- under some assumptions -- that $u_\delta^*$ converges at a higher rate to $\Pi^X_{\delta} u^*$ than to $u^*$ in both the $L^2$ norm and the canonical $H^1$ norm. Our results apply to conforming finite element discretisations as well as spectral Galerkin methods based on polynomials or Fourier (plane-wave) expansions.
This paper has not been read by Pith yet.
discussion (0)
Sign in with ORCID, Apple, or X to comment. Anyone can read and Pith papers without signing in.