Airy equation

The (homogeneous) Airy equation is given by

${\displaystyle y_{xx}-xy=0.}$

This equation can be solved by power series expansion techniques to give the Airy functions. The solutions to a wide class of problems may be expressed in terms of these functions. One such problem is the reduced Korteweg-de Vries equation

${\displaystyle u_{t}+u_{xxx}=0,}$

which is the linear component of many equations of KdV type. For applications to nonlinear perturbation problems, it is often important to study the more general inhomogeneous linear component of the KdV equation

${\displaystyle u_{t}+u_{xxx}=F}$

for various forcing terms F. Of course, the inhomogeneous and homogeneous equations are related by Duhamel's formula.

A large number of linear, bilinear, trilinear, and multilinear estimates for this equation are known; see the page on Airy estimates for more details.