Families of sections of quadrics and classical geometries

We study the deep interplay between geometry of quadrics in d-dimensional space and the dynamics of related integrable billiard systems. Various generalizations of Poncelet theorem are reviewed. The corresponding analytic conditions of Cayley's type are derived giving the full description of periodi

Starting with a subgeometry \(\Omega\) embedded in a \(\beta\)-dimensional projective space \(P G(\beta, q)\), \(\beta \geqslant 1\), we construct inductively a series of rank \(n\) residually connected geometries \(\Gamma^{(n, \beta, \Omega)}\), \(n \geqslant \beta\), by putting \(\Gamma^{(\beta, \

We characterize all the sequences of integers which are the first difference of the Hilbert function of a generic quadric section of an irreducible Buchsbaum curve in P3. By some suitable examples we show that these classes of sequences are wider than the ones relative to ACM and Buchsbaum maximal r