On the classification of product-quotient surfaces with q=0, pg=3 and their canonical map

Abstract

In this work we present new results to produce an algorithm that returns, for any fixed pair of natural integers K2 and , all regular surfaces S of general type with self-intersection KS2=K2 and Euler characteristic ( OS)=, that are product-quotient surfaces. The key result we obtain is an algebraic characterization of all families of regular product-quotients surfaces, up to isomorphism, arising from a pair of G-coverings of P1. As a consequence of our work, we provide a classification of all regular product-quotient surfaces of general type with 23≤ K2≤ 32 and ( OS)=4. Furthermore, we study their canonical map and present several new examples of surfaces of general type with a high degree of the canonical map.

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