Gurjar, RV and Pradeep, CR and Zhang, DQ (2002) On Gorenstein Surfaces Dominted By $P^2$. In: Nagoya Mathematical Journal, 168 . pp. 41-63.
Restricted to Registered users only
Download (200Kb) | Request a copy
In this paper we prove that a normal Gorenstein surface dominated by $P^2$ is isomorphic to a quotient $P^2/G$, where G is a finite group of automor-phisms of $P^2$ (except possibly for one surface $V^'_8$ ). We can completely classify all such quotients. Some natural conjectures when the surface is not Gorenstein are also stated.
|Item Type:||Journal Article|
|Additional Information:||Copyright of this article belongs to Cornell University Library.|
|Department/Centre:||Division of Physical & Mathematical Sciences > Mathematics|
|Date Deposited:||22 Jul 2008|
|Last Modified:||07 Jan 2013 05:52|
Actions (login required)