Liouville equation

2020 Mathematics Subject Classification: Primary: 35-XX [MSN][ZBL]

The Liouville equation $\def\phi{\varphi}\partial_t\partial_\tau\phi(t,\tau) = e^{\phi(t,\tau)}$ or \begin{equation}\label{a1}\phi_{t\tau} = e^\phi\tag{a1}\end{equation} is a non-linear partial differential equation (cf. Differential equation, partial) that can be linearized and subsequently solved. Namely, it can be transformed into the linear wave equation \begin{equation}\label{a2}u_{t\tau} = 0\tag{a2}\end{equation} by any of the following two differential substitutions (see [Li], formulas (4) and (2)): \begin{equation}\label{a3}\def\ln{\mathrm{ln\;}}\phi = \ln\big(\frac{2u_t u_\tau}{u^2}\big),\quad \phi = \ln\big(\frac{2u_t u_\tau}{\cos^2 u}\big).\tag{a3}\end{equation} In other words, the formulas \eqref{a3} provide the general solution to the Liouville equation, in terms of the well-known general solution $u=f(t)+g(\tau)$ of the wave equation \eqref{a2}.

The Liouville equation appears also in Lie's classification [Li2] of second-order differential equations of the form \begin{equation}\label{a4}z_{xy} = F(z).\tag{a4}\end{equation} For the complete classification, see [Ib2].

The Liouville equation \eqref{a1} is invariant under the infinite group of point transformations $$\bar t = \alpha(t),\ \bar\tau = \beta(\tau), \ \bar\phi = \phi - \ln \alpha'(t) - \ln \beta'(\tau)\tag{a5}$$ with arbitrary invertible differentiable functions $\alpha(t) $ and $\beta(\tau)$. The infinitesimal generator of this group is:

$$X=\xi(t)\frac{\partial}{\partial t} + \eta(\tau)\frac{\partial}{\partial\tau} - (\xi'(t)+\eta'(\tau))\frac{\partial}{\partial\phi},$$ where $\xi(t)$, $\eta(\tau)$ are arbitrary functions and $\xi'(t)$, $\eta'(\tau)$ are their first derivatives. It is shown in [Li2] that the equation \eqref{a4}, and in particular the Liouville equation, does not admit non-trivial (i.e. non-point) Lie tangent transformations.

In addition to the transformations \eqref{a3}, it is known (see, e.g., [Ib]) that the Liouville equation is related with the wave equation \eqref{a2} by the following Bäcklund transformation: $$\phi_t - u_t+ a e^{(\phi+u)/2} = 0,\quad \phi_\tau + u_\tau + \frac{2}{a} e^{(\phi-u)/2} = 0.$$ By letting $x=t+\tau$, $y=i(t-\tau)$ in \eqref{a1}, \eqref{a2} and \eqref{a3}, where $i = \sqrt{-1}$, one can transform the elliptic Liouville equation $\phi_{xx}+\phi_{yy} = e^\phi$ into the Laplace equation $u_{xx}+u_{yy} = 0$.

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