On the Extendability of Projective Surfaces and a Genus Bound for Enriques-Fano Threefolds

Abstract: We introduce a new technique, based on Gaussian maps, to study the possibility, for a given surface, to lie on a threefold as a very ample divisor with given normal bundle. We give several applications, among which one to surfaces of general type and another one to Enriques surfaces. For the latter we prove that any threefold (with no assumption on its singularities) having as hyperplane section a smooth Enriques surface (by definition an Enriques-Fano threefold) has genus g ≤ 17 (where g is the genus of its s… Show more

“…(Indeed, when k = 2, since (S, H) and (S, H + K S ) are both general in E • 6,2 we have that h 1 (T S (−H)) and h 1 (T S (−(H + K S )) are equal, and (27) implies they are both equal to 2. )…”

“…We conclude the section by explaining how to use our results (without using [27,38]) to bound the families of Enriques-Fano threefolds having the property that their Enriques sections are general in moduli, meaning that the family of polarized Enriques sections obtained from the family dominates the moduli space E of Enriques surfaces. Corollary 4.10.…”

“…We recall that a projective variety V ⊂ P N is said to be k-extendable if there exists a projective variety W ⊂ P N +k , different from a cone, such that V = W ∩ P N (transversely). The question of k-extendability of Enriques surfaces is still open, although it is proved in [38,27] that N 17 is a necessary condition for 1-extendability, and terminal threefolds having Enriques surfaces as hyperplane sections have been classified in [4,41,30]. This result is sharp in the case of 1-extendability: The general members of the moduli spaces of Corollary 1.2 indeed occur as hyperplane sections of threefolds different from cones, cf.…”

“…Corollary 6.5. We remark that the proof of Corollary 1.2 is independent from, and much simpler than, the results in [38,27], but it needs the technical assumption about rational curves, which can probably be avoided, at the expense of adding more cases, cf. Remark 6.1.…”

Moduli of curves on Enriques surfaces

“…(Indeed, when k = 2, since (S, H) and (S, H + K S ) are both general in E • 6,2 we have that h 1 (T S (−H)) and h 1 (T S (−(H + K S )) are equal, and (27) implies they are both equal to 2. )…”

“…We conclude the section by explaining how to use our results (without using [27,38]) to bound the families of Enriques-Fano threefolds having the property that their Enriques sections are general in moduli, meaning that the family of polarized Enriques sections obtained from the family dominates the moduli space E of Enriques surfaces. Corollary 4.10.…”

“…We recall that a projective variety V ⊂ P N is said to be k-extendable if there exists a projective variety W ⊂ P N +k , different from a cone, such that V = W ∩ P N (transversely). The question of k-extendability of Enriques surfaces is still open, although it is proved in [38,27] that N 17 is a necessary condition for 1-extendability, and terminal threefolds having Enriques surfaces as hyperplane sections have been classified in [4,41,30]. This result is sharp in the case of 1-extendability: The general members of the moduli spaces of Corollary 1.2 indeed occur as hyperplane sections of threefolds different from cones, cf.…”

“…Corollary 6.5. We remark that the proof of Corollary 1.2 is independent from, and much simpler than, the results in [38,27], but it needs the technical assumption about rational curves, which can probably be avoided, at the expense of adding more cases, cf. Remark 6.1.…”

Moduli of curves on Enriques surfaces

“…Пусть U -многообразие Фано-Энриквеса такое, что −K U ≡ H для некоторого дивизора Картье H. Согласно [13; лемма 2.2] g := 1 2 H 3 + 1 -целое число; этород U . Проблема получения точной оценки для рода многообразий Фано-Энриквеса изучалась в [17] и [18]. В [17] была установлена точная оценка g 17 в предположении, что особенности U изолированные.…”

О Трехмерных Многообразиях Фано С Каноническими Горенштейновыми Особенностями

Gauss‐Prym maps on Enriques surfaces