Absorbing boundary conditions: a spectral collocation approach
We introduce a spectral collocation method for the discretisation of the shallow water
equations on a one‐dimensional semi‐infinite domain, employing scaled Laguerre basis …
equations on a one‐dimensional semi‐infinite domain, employing scaled Laguerre basis …
An extension of DG methods for hyperbolic problems to one-dimensional semi-infinite domains
We consider spectral discretizations of hyperbolic problems on unbounded domains using
Laguerre basis functions. Taking as model problem the scalar advection equation, we …
Laguerre basis functions. Taking as model problem the scalar advection equation, we …
A coupled scheme for the solution of parabolic problems on unbounded domains
F Vismara - 2019 - politesi.polimi.it
We discuss the discretization of parabolic equations on unbounded domains by means of a
spectral approach based on scaled Laguerre basis functions. Starting from the 1D advection …
spectral approach based on scaled Laguerre basis functions. Starting from the 1D advection …
A seamless extension of DG methods for hyperbolic problems to unbounded domains
We consider spectral discretizations of hyperbolic problems on unbounded domains using
Laguerre basis functions. Taking as model problem the scalar advection equation, we …
Laguerre basis functions. Taking as model problem the scalar advection equation, we …
[PDF][PDF] MOX–Report No. 34/2011
T Benacchio, L Bonaventura - researchgate.net
We introduce a spectral collocation method for the discretization of the shallow water
equations on a one dimensional semi-infinite domain, employing suitably rescaled Laguerre …
equations on a one dimensional semi-infinite domain, employing suitably rescaled Laguerre …