Essentially Non-oscillatory Spectral Volume Methods

Abstract

A new Essentially Non-oscillatory (ENO) recovery algorithm is developed and tested in a Finite Volume method. The construction is hinged on a reformulation of the reconstruction as the solution to a variational problem. The sign property of the classical ENO algorithm is expressed as restrictions on the admissible set of solutions to this variational problem. In conjunction with an educated guessing algorithm for possible locations of discontinuities an ENO reconstruction algorithm without divided differences or smoothness indicators is constructed. No tunable parameters exist apart from the desired order and stencil width. The desired order is in principle arbitrary, but growing stencils are needed. While classical ENO methods consider all connected stencils that surround a cell under consideration the proposed recovery method uses a fixed stencil, simplifying efficient high order implementations.

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