(1 + ε)-approximate sparse recovery
Eric Price, David P. Woodruff
FOCS 2011
A procedure is described for the numerical solution of the time-dependent equations governing the flow in a crystal-growth crucible. The molten crystal material is taken to be a Newtonian fluid with constant viscosity. The Boussinesq approximation is employed, i.e. compressibility is neglected except insofar as thermal expansion modifies the gravitational body force. Crucible rotation is the main driving force, but a series of numerical experiments suggests that buoyancy effects can modify appreciably the impurity-blending estimates obtained from an isothermal study. © 1977.
Eric Price, David P. Woodruff
FOCS 2011
Pradip Bose
VTS 1998
Charles H. Bennett, Aram W. Harrow, et al.
IEEE Trans. Inf. Theory
Heinz Koeppl, Marc Hafner, et al.
BMC Bioinformatics