On the Gonality type invariants and the slope of a fibered 3-fold

Abstract

The slope of a fibered 3-folds f:X B is a relative numerical invariant defined by λ(f) := Kf3/deg(fωf), where Kf is the relative canonical divisor and ωf is the relative dualizing sheaf. Establishing slope inequalities is a fundamental problem in the geography of fibered spaces. In this paper, we introduce a new invariant called the minimal covering degree as a gonality-type invariant and study a lower bound of the slope increasing with the covering gonality and the minimal covering degree of the general fiber of f.

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