Navier

To make sense of the chaos, researchers rely on a set of mathematical formulas known as the Navier-Stokes equations, derived from Newton's laws of motion.

HappyNews - Top Stories 2008

To make sense of the chaos, researchers rely on a set of mathematical formulas known as the Navier-Stokes equations, derived from Newton's laws of motion.

msnbc.com: Top msnbc.com headlines 2008

In particular, he deconstructs one particular post: Why global regularity for Navier-Stokes ishard, which sets out a particular problem, identifies the approaches that have been used, and has attracted a large number of comments from some of the top mathematicians in the field, all of which helps to make progress on the problem. (similar examples from other mathematicians, such as the polymath project), and a brand new blog for this: polymathprojects. org.

2009 July 29 | Serendipity 2009

Solving the Navier-Stokes equations is notoriously difficult.

Archive 2009-03-01 Gordon McCabe 2009

In particular, he deconstructs one particular post: Why global regularity for Navier-Stokes ishard, which sets out a particular problem, identifies the approaches that have been used, and has attracted a large number of comments from some of the top mathematicians in the field, all of which helps to make progress on the problem. (similar examples from other mathematicians, such as the polymath project), and a brand new blog for this: polymathprojects. org.

Liveblogging Science 2.0 | Serendipity 2009

The required physical simulations would include: fracture and breach physics, cloud interaction and combustion physics, Navier-Stokes CFD analysis of escape and recovery, and an integrated comprehensive evaluation of both logical sequences and physical environment.

Ares 1 Abort Study Update - NASA Watch 2009

This can only be blamed upon the capricious nature of the Navier-Stokes equations.

Archive 2009-03-01 Gordon McCabe 2009

The Clay Mathematics Institute have, since 2000, been offering a $1,000,000 prize to anyone who can prove that the specification of an arbitrary initial velocity vector field v (x, y, z,0), determines a unique solution of the Navier-Stokes equations.

Archive 2009-03-01 Gordon McCabe 2009

The difficulty of trying to discover such optimum global solutions to the Navier-Stokes equations is compounded by the non-linearity of those equations.

Archive 2009-03-01 Gordon McCabe 2009

In particular, he deconstructs one particular post: Why global regularity for Navier-Stokes ishard, which sets out a particular problem, identifies the approaches that have been used, and has attracted a large number of comments from some of the top mathematicians in the field, all of which helps to make progress on the problem. (similar examples from other mathematicians, such as the polymath project), and a brand new blog for this: polymathprojects. org.

2009 July | Serendipity 2009