In this paper we introduce a general framework for defining and studying essentially nonoscillatory reconstruction procedures of arbitrarily high order of accuracy, interpolating data in the central stencil around a given computational cell (CWENO). This technique relies on the same selection mechanism of smooth stencils adopted in WENO, but here the pool of candidates for the selection includes polynomials of different degrees. This seemingly minor difference allows us to compute the analytic expression of a polynomial interpolant, approximating the unknown function uniformly within a cell, instead of only at one point at a time. For this reason this technique is particularly suited for balance laws for finite volume schemes, when averages...
We present a family of high-order, essentially non-oscillatory, central schemes for approx- imating ...
Classical fifth-order weighted essentially non-oscillatory (WENO) schemes are based on reconstructio...
In this article, the development of high-order semi-implicit interpolation schemes for convection te...
In this paper we introduce a general framework for defining and studying essentially nonoscillatory ...
In this paper we introduce a general framework for defining and studying essentially nonoscillatory ...
In some previous works, two of the authors introduced a technique to design high-order numerical met...
Third order WENO and CWENO reconstruction are widespread high order reconstruction techniques for nu...
We present a novel family of arbitrary high order accurate central Weighted ENO (CWENO) finite volum...
We present a new third-order central scheme for approximating solutions of systems of conservation l...
This work focuses on the use of polyharmonic splines, a class of radial basis functions, in the reco...
Including polynomials with small degree and stencil when designing very high order reconstructions i...
Recent advances in finite-difference WENO schemes for hyperbolic conservation laws have resulted in ...
Solving hyperbolic conservation laws on general grids can be important to reduce the computational c...
This work is dedicated to the development and comparison of WENO-type reconstructions for hyperbolic...
We present a family of high-order, essentially non-oscillatory, central schemes for approx- imating ...
Classical fifth-order weighted essentially non-oscillatory (WENO) schemes are based on reconstructio...
In this article, the development of high-order semi-implicit interpolation schemes for convection te...
In this paper we introduce a general framework for defining and studying essentially nonoscillatory ...
In this paper we introduce a general framework for defining and studying essentially nonoscillatory ...
In some previous works, two of the authors introduced a technique to design high-order numerical met...
Third order WENO and CWENO reconstruction are widespread high order reconstruction techniques for nu...
We present a novel family of arbitrary high order accurate central Weighted ENO (CWENO) finite volum...
We present a new third-order central scheme for approximating solutions of systems of conservation l...
This work focuses on the use of polyharmonic splines, a class of radial basis functions, in the reco...
Including polynomials with small degree and stencil when designing very high order reconstructions i...
Recent advances in finite-difference WENO schemes for hyperbolic conservation laws have resulted in ...
Solving hyperbolic conservation laws on general grids can be important to reduce the computational c...
This work is dedicated to the development and comparison of WENO-type reconstructions for hyperbolic...
We present a family of high-order, essentially non-oscillatory, central schemes for approx- imating ...
Classical fifth-order weighted essentially non-oscillatory (WENO) schemes are based on reconstructio...
In this article, the development of high-order semi-implicit interpolation schemes for convection te...