Uncertainty quantification of equation-of-state closures and shock hydrodynamics
Abstract not provided.
Publications
Uncertainty quantification of equation-of-state closures and shock hydrodynamics
Abstract not provided.
ADAPTIVE TABULATION FOR VERIFIED EQUATIONS OF STATE
Abstract not provided.
A New Wide-Range Equation of State for Xenon
Abstract not provided.
Adaptive Tabulation for Verified Equations of State
Abstract not provided.
Fundamental issues in the representation and propagation of uncertain equation-of-state information in shock hydrodynamics
Abstract not provided.
High fidelity equation of state for xenon
Abstract not provided.
Shock compression of a fifth period element: liquid xenon to 840 GPa SUPPLEMENT
Physical Review Letters
Abstract not provided.
High fidelity equation of state for xenon : integrating experiments and first principles simulations in developing a wide-range equation of state model for a fifth-row element
The noble gas xenon is a particularly interesting element. At standard pressure xenon is an fcc solid which melts at 161 K and then boils at 165 K, thus displaying a rather narrow liquid range on the phase diagram. On the other hand, under pressure the melting point is significantly higher: 3000 K at 30 GPa. Under shock compression, electronic excitations become important at 40 GPa. Finally, xenon forms stable molecules with fluorine (XeF{sub 2}) suggesting that the electronic structure is significantly more complex than expected for a noble gas. With these reasons in mind, we studied the xenon Hugoniot using DFT/QMD and validated the simulations with multi-Mbar shock compression experiments. The results show that existing equation of state models lack fidelity and so we developed a wide-range free-energy based equation of state using experimental data and results from first-principles simulations.
Xenon equation of state table number 5195
Abstract not provided.
Summary of Modifications to Tabular EOS Material Driver
Abstract not provided.
A New Wide-Range Equation of State for Tungsten
Abstract not provided.
The effect of functionals on the Equation of State using Density Functional Theory cold curves
Abstract not provided.
Next generation of scientists workshop
Abstract not provided.
As symmetric spreading in highly advective, disordered environments
Proposed for publication in Physical Review Letters.
Spreading of bacteria in a highly advective, disordered environment is examined. Predictions of super-diffusive spreading for a simplified reaction-diffusion equation are tested. Concentration profiles display anomalous growth and super-diffusive spreading. A perturbation analysis yields a crossover time between diffusive and super-diffusive behavior. The time's dependence on the convection velocity and disorder is tested. Like the simplified equation, the full linear reaction-diffusion equation displays super-diffusive spreading perpendicular to the convection. However, for mean positive growth rates the full nonlinear reaction-diffusion equation produces symmetric spreading with a Fisher wavefront, whereas net negative growth rates cause an asymmetry, with a slower wavefront velocity perpendicular to the convection.
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