March 26, 2024
12:00PM - 1:00PM
PRB 4138 & Zoom
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2024-03-26 12:00:00
2024-03-26 13:00:00
CCAPP Seminar: Maria Han Viega (OSU)
Speaker: Maira Han Viega (OSU)Arbitrarily high-order spectral difference method for Euler equations with a posteriori limitingIn this talk, I will present a new numerical scheme that combines an arbitrarily high-order spectral difference method and the ADER time-stepping method with a-posteriori subcell limiting using the classical MUSCL-Hancock scheme as a fallback scheme. This scheme is used to solve the one and two-dimensional compressible Euler equations, delivering very accurate solutions in smooth regions of the flow while capturing sharp discontinuities without spurious oscillations. If time allows, will also talk about the extension of this work to treat the ideal magneto-hydrodynamics equations. This is joint work with David Velasco and Romain Teyssier.
PRB 4138 & Zoom
OSU ASC Drupal 8
ascwebservices@osu.edu
America/New_York
public
Date Range
Add to Calendar
2024-03-26 12:00:00
2024-03-26 13:00:00
CCAPP Seminar: Maria Han Viega (OSU)
Speaker: Maira Han Viega (OSU)Arbitrarily high-order spectral difference method for Euler equations with a posteriori limitingIn this talk, I will present a new numerical scheme that combines an arbitrarily high-order spectral difference method and the ADER time-stepping method with a-posteriori subcell limiting using the classical MUSCL-Hancock scheme as a fallback scheme. This scheme is used to solve the one and two-dimensional compressible Euler equations, delivering very accurate solutions in smooth regions of the flow while capturing sharp discontinuities without spurious oscillations. If time allows, will also talk about the extension of this work to treat the ideal magneto-hydrodynamics equations. This is joint work with David Velasco and Romain Teyssier.
PRB 4138 & Zoom
Center for Cosmology and AstroParticle Physics (CCAPP)
ccapp@osu.edu
America/New_York
public
Speaker: Maira Han Viega (OSU)
Arbitrarily high-order spectral difference method for Euler equations with a posteriori limiting
In this talk, I will present a new numerical scheme that combines an arbitrarily high-order spectral difference method and the ADER time-stepping method with a-posteriori subcell limiting using the classical MUSCL-Hancock scheme as a fallback scheme. This scheme is used to solve the one and two-dimensional compressible Euler equations, delivering very accurate solutions in smooth regions of the flow while capturing sharp discontinuities without spurious oscillations. If time allows, will also talk about the extension of this work to treat the ideal magneto-hydrodynamics equations.
This is joint work with David Velasco and Romain Teyssier.
