Author Info
Name
Affiliation
Papers
ANN S. ALMGREN
Computational Research Division, Lawrence Berkeley National Lab, Berkeley, CA 94720, United States
19
Collaborators
Citations 
PageRank 
64
82
22.33
Referers 
Referees 
References 
238
328
115
Search Limit
100328
Title
Citations
PageRank
Year
Massively parallel finite difference elasticity using block-structured adaptive mesh refinement with a geometric multigrid solver00.342021
Feature Analysis, Tracking, and Data Reduction: An Application to Multiphase Reactor Simulation MFiX-Exa for <italic>In-Situ</italic> Use Case00.342021
AMReX: a framework for block-structured adaptive mesh refinement.40.422019
Phase asynchronous AMR execution for productive and performant astrophysical flows.10.362018
A hybrid adaptive low-Mach number/compressible method: Euler equations.00.342018
Nonintrusive AMR Asynchrony for Communication Optimization.00.342017
Overlapping Data Transfers with Computation on GPU with Tiles20.402017
BoxLib with Tiling: An Adaptive Mesh Refinement Software Framework.60.702016
Topology-Aware Performance Optimization and Modeling of Adaptive Mesh Refinement Codes for Exascale.00.342016
Perilla: metadata-based optimizations of an asynchronous runtime for adaptive mesh refinement.20.402016
BoxLib with Tiling: An AMR Software Framework.10.362016
A survey of high level frameworks in block-structured adaptive mesh refinement packages.261.122014
On the Use of Higher-Order Projection Methods for Incompressible Turbulent Flow.30.452013
Multi-Dimensional Simulations of Pair-Instability Supernovae00.342011
The potential role of spatial dimension in the neutrino-driving mechanism of core-collapse supernova explosions00.342011
A Three-Dimensional, Unsplit Godunov Method for Scalar Conservation Laws10.352011
A New Low Mach Number Approach in Astrophysics10.392009
Approximate Projection Methods: Part I. Inviscid Analysis163.042000
A Numerical Method for the Incompressible Navier--Stokes Equations Based on an Approximate Projection1911.971996