Gregory Joseph Herschlag
- Assistant Research Professor of Mathematics
Research Areas and Keywords
fluids flow across dynamic channels
physical modeling, kinetic equations, surface catalysis, molecular dynamics, stochastic boundary conditions
PDE & Dynamical Systems
biological modeling, physical modeling, fluids flow across dynamical channels, kinetic equations, surface catalysis, molecular dynamics, stochastic boundary conditions
physical modeling, fluids flow across dynamic channels, surface catalysis, molecular dynamics, stochastic boundary conditions
kinetic equations, surface catalysis, molecular dynamics, stochastic boundary conditions
I am interested in studying techniques to understand gerrymandering. I am also interested in computational fluid dynamics and high performance computing.
Chin, Andrew, et al. “The Signature of Gerrymandering in Rucho v. Common Cause.” South Carolina Law Review, vol. 70, 2019.
Cao, Yangxiaolu, et al. “Programmable assembly of pressure sensors using pattern-forming bacteria.” Nature Biotechnology, vol. 35, no. 11, Nov. 2017, pp. 1087–93. Epmc, doi:10.1038/nbt.3978. Full Text
Herschlag, G., et al. “Fluid extraction across pumping and permeable walls in the viscous limit.” Physics of Fluids, vol. 28, no. 4, Apr. 2016. Scopus, doi:10.1063/1.4946005. Full Text
Herschlag, Gregory J., et al. “A consistent hierarchy of generalized kinetic equation approximations to the master equation applied to surface catalysis.” The Journal of Chemical Physics, vol. 142, no. 23, June 2015, p. 234703. Epmc, doi:10.1063/1.4922515. Full Text Open Access Copy
Herschlag, G., et al. “An exact solution for stokes flow in a channel with arbitrarily large wall permeability.” Siam Journal on Applied Mathematics, vol. 75, no. 5, Jan. 2015, pp. 2246–67. Scopus, doi:10.1137/140995854. Full Text
Herschlag, Gregory, et al. Optimal reservoir conditions for fluid extraction through permeable walls in the viscous limit.
Miller, Laura, et al. Leaf roll-up and aquaplaning in strong winds and floods.
Herschlag, Gregory, and Laura A. Miller. Reynolds number limits for jet propulsion: A numerical study of simplified jellyfish.
Herschlag, G., et al. “Multi-physics simulations of particle tracking in arterial geometries with a scalable moving window algorithm.” Proceedings Ieee International Conference on Cluster Computing, Iccc, vol. 2019-September, 2019. Scopus, doi:10.1109/CLUSTER.2019.8891041. Full Text
Herschlag, G., et al. “GPU data access on complex geometries for D3Q19 lattice boltzmann method.” Proceedings 2018 Ieee 32nd International Parallel and Distributed Processing Symposium, Ipdps 2018, 2018, pp. 825–34. Scopus, doi:10.1109/IPDPS.2018.00092. Full Text
DURHAM, N.C. -- On March 26, the U.S. Supreme Court is set to hear a North Carolina lawsuit that could end partisan gerrymandering for good -- and a mode of analysis developed at Duke University could impact their decision. The nation’s highest... read more »
On January 9th, a three-judge court declared North Carolina’s congressional map unconstitutionally gerrymandered, stating that the drawing of the state’s electoral districts gave an advantage to the Republican Party. The US Federal court cited the... read more »