Particular case of a system of DEs.
Following Lychagin_2021 page 11, we consider a PDE a submanifold of the jet bundle $J^n(\mathbb{R}^p,\mathbb{R})$ (where $n$ is the order of the PDE and $p$ the number of independent variables) given by
$$ \mathcal{S}_{\Delta}=\left\{\Delta=0 \right\} $$for a smooth function
$$ \Delta: J^n(\mathbb{R}^p,\mathbb{R})\rightarrow \mathbb{R} $$A solution is any integral manifold of the Cartan distribution of this jet bundle such that is contained in $\mathcal{S}_{\Delta}$.
When the PDE possesses a symmetry can be reduced, sometimes even to an ODE. The solutions of the original PDE obtained from the ODE are called similarity solutions
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Author of the notes: Antonio J. Pan-Collantes
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