An embedded Trefftz-DG method for nonlinear steady Navier-Stokes proves existence, uniqueness, and Picard convergence under resolution and small-data assumptions while inheriting a priori error bounds from standard DG analysis.
A discontinuous Galerkin method for elliptic-hyperbolic equations
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abstract
We present and analyze a discontinuous Galerkin method for the numerical solution of a class of second-order linear mixed-type partial differential equations, i.e. equations that change their nature from elliptic to hyperbolic through the computational domain. Well-posedness of the discrete problem is established via coercivity in an energy norm, achieved through the Morawetz multiplier technique. We derive $hp$-a priori error estimates in the energy norm, which we use to prove convergence rates for standard and quasi-Trefftz polynomial spaces. Numerical experiments validate the theoretical results.
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2026 1verdicts
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Embedded Trefftz DG method for steady Navier-Stokes flow. Part II: Nonlinear problem
An embedded Trefftz-DG method for nonlinear steady Navier-Stokes proves existence, uniqueness, and Picard convergence under resolution and small-data assumptions while inheriting a priori error bounds from standard DG analysis.