A new class of non-linear compact interpolation schemes is introduced in this dissertation that have a high spectral resolution and are non-oscillatory across discontinuities. The Compact-Reconstruction Weighted Essentially Non-Oscillatory (CRWENO) schemes use a solution-dependent combination of lower-order compact schemes to yield a high-order accurate, non-oscillatory scheme. Fifth-order accurate CRWENO schemes are constructed and their numerical properties are analyzed. These schemes have lower absolute errors and higher spectral resolution than the WENO scheme of the same order. The schemes are applied to scalar conservation laws and the Euler equations of fluid dynamics. The order of convergence and the higher accuracy of the CRWENO ...
Copyright © 2022 The Author(s). Artificial compressibility methods intend to offer divergence-free f...
Theory of non-oscillatory schemes lias been used in conjunction with a finite-volume cell-vertex Nav...
Abstract Here we present a new, semi-discrete, central scheme for the numerical solution of one-dime...
A new class of non-linear compact interpolation schemes is introduced in this dis-sertation that hav...
High order essentially non-oscillatory (ENO) schemes, originally designed for compressible flow and ...
A comparative study of three numerical formulations for discontinuous high-order reconstruction on u...
In recent years, a class of numerical schemes for solving hyperbolic partial differential equations ...
A novel high order compact scheme for solving the compressible Navier-Stokes equations has been deve...
An assessment of two numerical formulations for high-order reconstruction on unstructured triangular...
Two families of explicit and implicit compact high-resolution shock- capturing methods for the multi...
With shock capturing capability and spectral like resolution, weighted compact schemes are good choi...
Many applications in engineering practice can be described by thehyperbolic partial differential equ...
In these lecture notes we describe the construction, analysis, and application of ENO (Essentially N...
The numerics of hyperbolic conservation laws, e.g., the Euler equations of gas dynamics, shallow wat...
The numerical dissipation operator of Residual-Based Compact (RBC) schemes of high accuracy is ident...
Copyright © 2022 The Author(s). Artificial compressibility methods intend to offer divergence-free f...
Theory of non-oscillatory schemes lias been used in conjunction with a finite-volume cell-vertex Nav...
Abstract Here we present a new, semi-discrete, central scheme for the numerical solution of one-dime...
A new class of non-linear compact interpolation schemes is introduced in this dis-sertation that hav...
High order essentially non-oscillatory (ENO) schemes, originally designed for compressible flow and ...
A comparative study of three numerical formulations for discontinuous high-order reconstruction on u...
In recent years, a class of numerical schemes for solving hyperbolic partial differential equations ...
A novel high order compact scheme for solving the compressible Navier-Stokes equations has been deve...
An assessment of two numerical formulations for high-order reconstruction on unstructured triangular...
Two families of explicit and implicit compact high-resolution shock- capturing methods for the multi...
With shock capturing capability and spectral like resolution, weighted compact schemes are good choi...
Many applications in engineering practice can be described by thehyperbolic partial differential equ...
In these lecture notes we describe the construction, analysis, and application of ENO (Essentially N...
The numerics of hyperbolic conservation laws, e.g., the Euler equations of gas dynamics, shallow wat...
The numerical dissipation operator of Residual-Based Compact (RBC) schemes of high accuracy is ident...
Copyright © 2022 The Author(s). Artificial compressibility methods intend to offer divergence-free f...
Theory of non-oscillatory schemes lias been used in conjunction with a finite-volume cell-vertex Nav...
Abstract Here we present a new, semi-discrete, central scheme for the numerical solution of one-dime...