Litcius/Paper detail

Hybrid high-order method for singularly perturbed fourth-order problems on curved domains

Zhaonan Dong, Alexandre Ern

2021ESAIM Mathematical Modelling and Numerical Analysis14 citationsDOIOpen Access PDF

Abstract

We propose a novel hybrid high-order method (HHO) to approximate singularly perturbed fourth-order PDEs on domains with a possibly curved boundary. The two key ideas in devising the method are the use of a Nitsche-type boundary penalty technique to weakly enforce the boundary conditions and a scaling of the weighting parameter in the stabilization operator that compares the singular perturbation parameter to the square of the local mesh size. With these ideas in hand, we derive stability and optimal error estimates over the whole range of values for the singular perturbation parameter, including the zero value for which a second-order elliptic problem is recovered. Numerical experiments illustrate the theoretical analysis.

Topics & Concepts

Singular perturbationMathematicsPerturbation (astronomy)ScalingWeightingSingular valueBoundary value problemMathematical analysisBoundary (topology)Operator (biology)Singular boundary methodApplied mathematicsEigenvalues and eigenvectorsGeometryFinite element methodBoundary element methodPhysicsChemistryQuantum mechanicsBiochemistryThermodynamicsTranscription factorAcousticsRepressorGeneDifferential Equations and Numerical MethodsAdvanced Numerical Methods in Computational MathematicsNumerical methods for differential equations
Hybrid high-order method for singularly perturbed fourth-order problems on curved domains | Litcius