We find relative differential invariants of different orders for non generic parabolic Monge-Ampère equations (MAE’s). They are constructed in terms of some tensors associated with the derived flag of the characteristic distribution. The vanishing of such invariants allows one to determine the classes of each non generic parabolic MAE with respect to contact transformations
This work was supported in part by the Polish National Science Centre (NCN) via the grant number 201...
We give local descriptions of parabolic contact structures and show how their flat models yield expl...
We compute the algebra of differential invariants of unparametrized curves in the homogeneous G2 fla...
We find relative differential invariants of different orders for non generic parabolic Monge-Ampère ...
In a series of papers we have described normal forms of parabolic Monge–Ampère equations (PMAEs) by ...
In this thesis, we study two problems focusing on the interplay between geometric properties of diff...
We present the basic notions and results of the geometric theory of second order PDEs in the framew...
We study the geometry of contact structures of partial differential equations. The main classes we s...
Abstract In a series of papers we have described normal forms of parabolic Monge–Ampere equations (P...
Abstract. All second order scalar differential invariants of symplectic hy-perbolic and elliptic Mon...
We present here classes of parabolic geometries arising naturally from Seashi’s principle to form go...
The geometric approach to the study of differential equations goes back to Sophus Lie and Elie Carta...
Abstract: Having as a model the metric contact case of V. Br̂nzanescu; R. Slobodeanu, we study two s...
We study the geometry of multidimensional scalar 2 nd order PDEs (i.e. PDEs with n independent varia...
All second order scalar differential invariants of symplectic hyperbolic and elliptic Monge-Ampère P...
This work was supported in part by the Polish National Science Centre (NCN) via the grant number 201...
We give local descriptions of parabolic contact structures and show how their flat models yield expl...
We compute the algebra of differential invariants of unparametrized curves in the homogeneous G2 fla...
We find relative differential invariants of different orders for non generic parabolic Monge-Ampère ...
In a series of papers we have described normal forms of parabolic Monge–Ampère equations (PMAEs) by ...
In this thesis, we study two problems focusing on the interplay between geometric properties of diff...
We present the basic notions and results of the geometric theory of second order PDEs in the framew...
We study the geometry of contact structures of partial differential equations. The main classes we s...
Abstract In a series of papers we have described normal forms of parabolic Monge–Ampere equations (P...
Abstract. All second order scalar differential invariants of symplectic hy-perbolic and elliptic Mon...
We present here classes of parabolic geometries arising naturally from Seashi’s principle to form go...
The geometric approach to the study of differential equations goes back to Sophus Lie and Elie Carta...
Abstract: Having as a model the metric contact case of V. Br̂nzanescu; R. Slobodeanu, we study two s...
We study the geometry of multidimensional scalar 2 nd order PDEs (i.e. PDEs with n independent varia...
All second order scalar differential invariants of symplectic hyperbolic and elliptic Monge-Ampère P...
This work was supported in part by the Polish National Science Centre (NCN) via the grant number 201...
We give local descriptions of parabolic contact structures and show how their flat models yield expl...
We compute the algebra of differential invariants of unparametrized curves in the homogeneous G2 fla...