Ciro Ciliberto , Francesco Russo , Aron Simis
We introduce various families of irreducible homaloidal hypersurfaces in projective space , for all r3. Some of these are families of homaloidal hypersurfaces whose degrees are arbitrarily large as compared to the dimension of the ambient projective space. The existence of such a family solves a question that has naturally arisen from the consideration of the classes of homaloidal hypersurfaces known so far. The result relies on a fine analysis of hypersurfaces that are dual to certain scroll surfaces. We also introduce an infinite family of determinantal homaloidal hypersurfaces based on a certain degeneration of a generic Hankel matrix. The latter family fit non-classical versions of de Jonquières transformations. As a natural counterpoint, we broaden up aspects of the theory of Gordan�Noether hypersurfaces with vanishing Hessian determinant, bringing over some more precision into the present knowledge.
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