The classification of surfaces with pg=0, K2=6 and non birational bicanonical map
Abstract
Let S be a minimal surface of general type with pg=0 and K2=6, such that its bicanonical map S6 is not birational. The map is a morphism of degree 4 onto a surface. The case of =4 is completely characterized in [Topology, 40 (5) (2001), 977--991] and the present paper completes the classification of these surfaces. It is proven that the degree of cannot be equal to 3, and the geometry of surfaces with =2 is analysed in detail. The last section contains three examples of such surfaces, two of which appear to be new.
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