1 5 A ug 2 00 5 Lagrangian dynamics of the Navier - Stokes equation

0 A ug 2 00 5 Relativistic Navier - Stokes Equation from a Gauge - invariant Lagrangian

A relativistic Navier-Stokes equation is constructed as the equation of motion of a gauge-invariant bosonic lagrangian. It is shown that the quantum-electrodynamic-like lagrangian is suitable for this purpose with a particular form of gauge field, A µ = φ, A ≡ −c 2 1 − | v| 2 /c 2 , − v. The equation of motion coincides with the classical Navier-Stokes equation at non-relativistic limit | v| ≪ c.

A ug 2 00 5 Gauge field theory approach to construct the Navier - Stokes equation

We construct the Navier-Stokes equation from first principle using relativistic bosonic lagrangian which is invariant under local gauge transformations. We show that by defining the bosonic field to represent the dynamic of fluid in a particular form, a general Navier-Stokes equation with conservative forces can be reproduced exactly. It also induces two new forces, one is relevant for rotation...

O ct 2 00 5 Relativistic Navier - Stokes Equation from a Gauge - invariant Lagrangian

A relativistic Navier-Stokes equation is constructed as the equation of motion of a gauge-invariant bosonic lagrangian. It is shown that the quantum-electrodynamic-like lagrangian is suitable for this purpose with a particular form of gauge field, A µ = φ, A ≡ −c 2 1 − | v| 2 /c 2 , − v. The equation of motion coincides with the classical Navier-Stokes equation at non-relativistic limit | v| ≪ c.

. A P ] 9 A ug 2 00 5 NONLINEAR INSTABILITY FOR THE NAVIER - STOKES EQUATIONS

It is proved, using a bootstrap argument, that linear instability implies nonlinear instability for the incompressible Navier-Stokes equations in L for all p ∈ (1,∞) and any finite or infinite domain in any dimension n.

1 5 A pr 2 00 5 Navier - Stokes Equation on the Rectangle