On pluricanonical boundedness of varieties of general type

Abstract

We present a new proof of a theorem of Chen and Jiang: for any integer n>1, there is a constant Kn>0 such that every smooth projective n-fold X with vol(X)>Kn has either the stable birational 2-canonical map or a McKernan fibration. This amends a gap in the original proof. As a direct application of our method, we improve a former boundedness theorem of Lacini and prove that for any integer r>1 and n≥ 1, r-canonical maps of n-folds of general type have birationally bounded fibers. This gives an affirmative answer to a question posed by Chen and Jiang in 2014.