Jim had a kid sort o' chorin' around the place an' keepin' us from gettin' old an' stupid.
"Happy Hawkins" by Robert Alexander Wason
Latcherdom me a tani kali chavi of panj besh chorin levina avri miro curro.
"The Gypsies" by Charles G. Leland
Making improper advances to the local contingent of chorines?
"Occasion for Disaster" by Gordon Randall Garrett
Chorin was thus regarded as a leader of the newer Judaism.
"Encyclopaedia Britannica, 11th Edition, Volume 6, Slice 3" by Various
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Radhakrishnan Srinivasan, “The importance of higher-order effects in the Barenblatt– Chorin theory of wall-bounded fully developed turbulent shear ﬂows”, Phys.
A Note on the Intermediate Region in Turbulent Boundary Layers
Chorin, who made several considerations about their statistical mechanics, see .
Statistics of a vortex filament model
Chorin, A.J. and Tu X., Implicit sampling for particle ﬁlters, Proc.
A drift homotopy Monte Carlo approach to particle filtering for multi-target tracking
Chorin, Scaling laws in the vortex lattice model of turbulence, Commun.
The Kolmogorov-Obukhov Exponent in the Inertial Range of Turbulence: A Reexamination of Experimental Data
Chorin, Turbulence as a near-equilibrium process, Lectures in Appl.
The Kolmogorov-Obukhov Exponent in the Inertial Range of Turbulence: A Reexamination of Experimental Data
Chorin, A.J. and Marsden, J.E. (1997). A Mathematical Introduction to Fluid Mechanics, Third Edition.
Explanation and discovery in aerodynamics
Chorin, A.J. and Tu X., Implicit sampling for particle ﬁlters, Proc.
Path sampling for particle filters with application to multi-target tracking
Chorin, A.J., Hald, O.H. and Kupferman, R., Optimal prediction and the Mori-Zwanzig representation of irreversible processes.
Numerical computation of solutions of the critical nonlinear Schrodinger equation after the singularity
Chorin, A.J. and Stinis, P., Problem reduction, renormalization and memory, Comm.
Numerical computation of solutions of the critical nonlinear Schrodinger equation after the singularity
The artiﬁcial compressibility approximation was introduced by Chorin [1, 2], Temam [29, 30] and Oskolkov , in order to deal with the diﬃculty induced by the incompressibility constraints in the numerical approximations to the Navier Stokes equation.
On the artificial compressibility method for the Navier Stokes Fourier system
The interest into the artiﬁcial compressibility methods started with the previously mentioned results of Chorin and Temam and was later on investigated by Ghidaglia and Temam .
On the artificial compressibility method for the Navier Stokes Fourier system
Chorin, Numerical solution of the Navier-Stokes equations, Math.
On the artificial compressibility method for the Navier Stokes Fourier system
Chorin, On the convergence of discrete approximations to the Navier-Stokes equations, Math.
On the artificial compressibility method for the Navier Stokes Fourier system
Pro jection algorithms date back to the late 1960s and stem from the seminal works of Chorin and Temam .
Convergence Analysis of a Class of Massively Parallel Direction Splitting Algorithms for the Navier-Stokes Equations
On Chorin’s pro jection method for the incompressible Navier-Stokes equations.
Convergence Analysis of a Class of Massively Parallel Direction Splitting Algorithms for the Navier-Stokes Equations
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