By a theorem of Reider, a twisted bicanonical system, that means a linear system of divisors numerically equivalent to a bicanonical divisor, on a minimal surface of general type, is base point free if its canonical degree is not smaller than 5. Twisted bicanonical systems with base points are known in literature only for canonical degree 1 and 2. We prove in this paper that all surfaces in a family of surfaces with canonical degree equal to 3 constructed in a previous paper with G. Bini and J. Neves have a twisted bicanonical system (different from the bicanonical system) with two base points. We show that the map induced by the above twisted bicanonical system is birational, and describe in detail the closure of its image and its singular locus. Inspired by this description, we reduce the problem of constructing a minimal surface of general type with canonical degree 3 whose bicanonical system has base points, under some reasonable assumptions, to the problem of constructing a curve in the projective 3-space with certain properties.
A twisted bicanonical system with base points / Favale, Filippo Francesco; Pignatelli, Roberto. - In: ANNALI DELL'UNIVERSITÀ DI FERRARA. SEZIONE 7: SCIENZE MATEMATICHE. - ISSN 0430-3202. - STAMPA. - 2017:63.1(2017), pp. 113-131. [10.1007/s11565-017-0273-3]
A twisted bicanonical system with base points
Favale, Filippo Francesco;Pignatelli, Roberto
2017-01-01
Abstract
By a theorem of Reider, a twisted bicanonical system, that means a linear system of divisors numerically equivalent to a bicanonical divisor, on a minimal surface of general type, is base point free if its canonical degree is not smaller than 5. Twisted bicanonical systems with base points are known in literature only for canonical degree 1 and 2. We prove in this paper that all surfaces in a family of surfaces with canonical degree equal to 3 constructed in a previous paper with G. Bini and J. Neves have a twisted bicanonical system (different from the bicanonical system) with two base points. We show that the map induced by the above twisted bicanonical system is birational, and describe in detail the closure of its image and its singular locus. Inspired by this description, we reduce the problem of constructing a minimal surface of general type with canonical degree 3 whose bicanonical system has base points, under some reasonable assumptions, to the problem of constructing a curve in the projective 3-space with certain properties.| File | Dimensione | Formato | |
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