Projectively and affinely invariant PDEs on hypersurfaces

Abstract

In [Alekseevsky, Gutt, Manno, Moreno: "A general method to construct invariant PDEs on homogeneous manifolds", Communications in Contemporary Mathematics (2021)] the authors have developed a method for constructing G-invariant PDEs imposed on hypersurfaces of an (n+1)-dimensional homogeneous space G/H, under mild assumptions on the Lie groups G. In the present paper the method is applied to the case when G=PGL(n+1) or G=Aff(n+1) and the homogeneous space G/H is the (n+1)-dimensional projective Pn+1 or affine An+1 space, respectively. The paper's main result is that projectively or affinely invariant PDEs with n independent and one unknown variables are in one-to-one correspondence with CO(d,n-d)-invariant hypersurfaces of the space of trace-free cubic forms in n variables. Local descriptions are also provided.