Some results on fake quadrics
报告专家:杨建强(红河学院)
报告时间:2025年4月11日(星期五)下午16:00-17:00
报告地点:国家天元数学西南中心516
报告摘要:In this talk, we give a criterion to assess the effectiveness and ampleness of divisors on a fake quadric surface S, and then we establish a relationship between the cones: \[\mathring{\Eff}(S)=\Amp(S)\subset \SAmp(S)=\Mov(S) \subset \Nef(S)=\Eff(S)=\overline{\Amp(S)}. \] In particular, we prove that any fake quadric of odd type does not contain a negative curve. This result is central to our manuscript.
As applications, first we give that any fake quadric is a fibration over P^1; Subsequently, we show that no fake quadric can be embedded in P^4; Finally, we prove that the fake quadric S possesses the bounded cohomology property. This property is characterized by the existence of a positive constant $c_{S}$ such that $h^1(\CO_S(C))\leq c_S h^0(\CO_S(C))$ for any curve $C \subset S$.
专家简介:杨建强,博士毕业于四川大学数学学院,任职于红河学院,目前在中科院晨兴数学中心和数学研究所访问学,研究方向为代数拓扑与代数几何的交叉领域,特别是对代数簇的分类,代数簇的拓扑性质,有深入的研究。
邀请人:张斌
