Francisco J. Gallego, B. P. Purnaprajna
Published 2003-02-05, updated 2003-12-08Version 2
In this article we classify quadruple Galois canonical covers of smooth surfaces of minimal degree. The classification shows that they are either non-simple cyclic covers or bi-double covers. If they are bi-double then they are all fiber products of double covers. We construct examples to show that all the possibilities in the classification do exist. There are implications of this classification that include the existence of families with unbounded geometric genus and families with unbounded irregularity, in sharp contrast with the case of double and triple canonical covers. Together with the results of Horikawa and Konno for double and triple covers, a pattern emerges that motivates some general questions on the existence of higher degree canonical covers, some of which are answered in this article.
Comments: 24 Pages, AMSTeX. This version contains a significant amount of new results and material. A part of the material and results from the older version have been removed and will appear, along with new results, in a second part to this paper, which will be posted subsequently
Classification of quadruple Galois canonical covers II
Classification of Elliptic Line Scrolls
The classification of isotrivially fibred surfaces with p_g=q=2
![QR code for arXiv:math/0302045 [math.AG]](http://oss.arxitics.com/images/favicon.svg)