Navier-Stokes equations

It is a PDE that indeed reflects Newton second law $m\cdot a=F$. It shows how a fluid varies with time:

• $\rho$ is density of the fluid
• $u$ is the velocity
• $P$ is the pressure
• $\mu$ is viscosity
• $F$ is an external force

It is also required $\mathrm{\nabla }\cdot u=0$ (divergence), which meas that mass is conserved.

Often, it is used the operator

named material derivative in the context of Continuum Mechanics.

Expanded, Navier-Stokes shows up as

if there is no external force.

The case $\mu =0$ (no viscosity) is called Euler equation.