Claes Eskilsson scite author profile

a b s t r a c tNektar++ is an open-source software framework designed to support the development of highperformance scalable solvers for partial differential equations using the spectral/hp element method. High-order methods are gaining prominence in several engineering and biomedical applications due to their improved accuracy over low-order techniques at reduced computational cost for a given number of degrees of freedom. However, their proliferation is often limited by their complexity, which makes these methods challenging to implement and use. Nektar++ is an initiative to overcome this limitation by encapsulating the mathematical complexities of the underlying method within an efficient C++ framework, making the techniques more accessible to the broader scientific and industrial communities. The software supports a variety of discretisation techniques and implementation strategies, supporting methods research as well as application-focused computation, and the multi-layered structure of the framework allows the user to embrace as much or as little of the complexity as they need. The libraries capture the mathematical constructs of spectral/hp element methods, while the associated collection of pre-written PDE solvers provides out-of-the-box application-level functionality and a template for users who wish to develop solutions for addressing questions in their own scientific domains. Program summaryProgram title: Nektar++ Catalogue identifier: AEVV_v1_0Program summary URL:

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Coupled mooring analysis for floating wave energy converters using CFD: Formulation and validation

Palm

Eskilsson

Paredes

et al. 2016

International Journal of Marine Energy

123

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A stabilised nodal spectral element method for fully nonlinear water waves

Engsig-Karup

Eskilsson

Bigoni

2016

Journal of Computational Physics

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We present an arbitrary-order spectral element method for general-purpose simulation of non-overturning water waves, described by fully nonlinear potential theory. The method can be viewed as a high-order extension of the classical finite element method proposed and irregular dispersive wave propagation. The benefit of using a high-order -possibly adapted -spatial discretisation for accurate water wave propagation over long times and distances is particularly attractive for marine hydrodynamics applications.1

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A triangular spectral/hp discontinuous Galerkin method for modelling 2D shallow water equations

Eskilsson

Sherwin

2004

Numerical Methods in Fluids

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SUMMARYWe present a spectral/hp element discontinuous Galerkin model for simulating shallow water flows on unstructured triangular meshes. The model uses an orthogonal modal expansion basis of arbitrary order for the spatial discretisation and a third-order Runge-Kutta scheme to advance in time. The local elements are coupled together by numerical fluxes, evaluated using the HLLC Riemann solver. We apply the model to test cases involving smooth flows and demonstrate the exponentially fast convergence with regard to polynomial order. We also illustrate that even for results of "engineering

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Claes Eskilsson

Nektar++: An open-source spectral/hp element framework

Coupled mooring analysis for floating wave energy converters using CFD: Formulation and validation

A stabilised nodal spectral element method for fully nonlinear water waves

A triangular spectral/hp discontinuous Galerkin method for modelling 2D shallow water equations

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