We propose a differential-geometric classification of the fourcomponent hyperbolic systems of conservation laws which satisfy the following properties: (a) they do not possess Riemann invariants; (b) they are linearly degenerate; (c) their rarefaction curves are rectilinear; (d) the cross-ratio of the four characteristic speeds is harmonic. This turns out to provide a classification of projective congruences in ${\mathbb P}^5$ whose developable surfaces are planar pencils of lines, each of these lines cutting the focal variety at points forming a harmonic quadruplet. Symmetry properties and the connection of these congruences to Cartan’s isoparametric hypersurfaces are discussed
In this article we study a class of integrable quadratic systems and classify all its phase portra...
3noWe study smooth quadric surfaces in the Pfaffian hypersurface in P^{14} parameterizing 6x6 skew-s...
In this paper, we classify the global phase portraits of all quadratic planar systems with two paral...
S. I. Agafonov and E. V. Ferapontov have introduced a construction that allows naturally associating...
S. I. Agafonov and E. V. Ferapontov have introduced a construction that allows naturally associating...
AbstractWe review some of the recent results in the projective-geometric theory of systems of conser...
International audienceIn [5], the author gave a classification (with respect the group of invertible...
We investigate $n$-component systems of conservation laws that possess third-order Hamiltonian st...
It was shown in Ferapontov et al. (Lett Math Phys 108(6):1525–1550, 2018) that the classification of...
In this article we classify all the smooth threefolds in P^5 with an apparent quadruple point provid...
The existence is proved of two new families of sextic threefolds in P^5, which are not quadratically...
We classify the phase portraits of quadratic polynomial differential systems having some relevant cl...
In the framework of projective-geometric theory of systems of differential equations developed by th...
In this article, we study the planar cubic differential systems with invariant affine straight lin...
Fifth order, quasi-linear, non-constant separant evolution equations are of the form u(t) = A(partia...
In this article we study a class of integrable quadratic systems and classify all its phase portra...
3noWe study smooth quadric surfaces in the Pfaffian hypersurface in P^{14} parameterizing 6x6 skew-s...
In this paper, we classify the global phase portraits of all quadratic planar systems with two paral...
S. I. Agafonov and E. V. Ferapontov have introduced a construction that allows naturally associating...
S. I. Agafonov and E. V. Ferapontov have introduced a construction that allows naturally associating...
AbstractWe review some of the recent results in the projective-geometric theory of systems of conser...
International audienceIn [5], the author gave a classification (with respect the group of invertible...
We investigate $n$-component systems of conservation laws that possess third-order Hamiltonian st...
It was shown in Ferapontov et al. (Lett Math Phys 108(6):1525–1550, 2018) that the classification of...
In this article we classify all the smooth threefolds in P^5 with an apparent quadruple point provid...
The existence is proved of two new families of sextic threefolds in P^5, which are not quadratically...
We classify the phase portraits of quadratic polynomial differential systems having some relevant cl...
In the framework of projective-geometric theory of systems of differential equations developed by th...
In this article, we study the planar cubic differential systems with invariant affine straight lin...
Fifth order, quasi-linear, non-constant separant evolution equations are of the form u(t) = A(partia...
In this article we study a class of integrable quadratic systems and classify all its phase portra...
3noWe study smooth quadric surfaces in the Pfaffian hypersurface in P^{14} parameterizing 6x6 skew-s...
In this paper, we classify the global phase portraits of all quadratic planar systems with two paral...
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