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Galois Covers and the Hilbert-Grunwald Property

Pierre Dèbes, Nour Ghazi (2012)

Annales de l’institut Fourier

Our main result combines three topics: it contains a Grunwald-Wang type conclusion, a version of Hilbert’s irreducibility theorem and a p -adic form à la Harbater, but with good reduction, of the Regular Inverse Galois Problem. As a consequence we obtain a statement that questions the RIGP over . The general strategy is to study and exploit the good reduction of certain twisted models of the covers and of the associated moduli spaces.

Geometric linear normality for nodal curves on some projective surfaces

F. Flamini, C. Madonna (2001)

Bollettino dell'Unione Matematica Italiana

In questo lavoro si generalizzano alcuni risultati di [3] riguardanti la proprietà di alcune curve nodali, su superficie non-singolari in P r , di essere «geometricamente linearmente normali» (concetto che estende la ben nota proprietà di essere linearmente normale). Precisamente, per una data curva C , irriducibile e dotata di soli punti nodali come uniche singolarità, che giace su una superfice S proiettiva, non-singolare e linearmente normale, si determina un limite superiore «sharp» sul numero dei...

Gonality for stable curves and their maps with a smooth curve as their target

Edoardo Ballico (2009)

Open Mathematics

Here we study the deformation theory of some maps f: X → ℙr , r = 1, 2, where X is a nodal curve and f|T is not constant for every irreducible component T of X. For r = 1 we show that the “stratification by gonality” for any subset of [...] with fixed topological type behaves like the stratification by gonality of M g.

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