Singular rationally connected threefolds with non-zero pluri-forms

Abstract

This paper is concerned with singular projective rationally connected threefolds X which carry non-zero pluri-forms, i.e. H0(X,(X1)[ m]) ≠ \0\ for some m > 0, where (X1)[ m] is the reflexive hull of (X1) m. If X has Q-factorial terminal singularities, then we show that there is a fibration p from X to P1. Moreover, there is a natural isomorphism from H0(X, (X1)[ m]) to H0(P1, OP1(-2m+Σz∈ P1 [(m(p,z)-1)mm(p,z)])) for all m>0, where m(p,z) is the smallest positive coefficient in the divisor p*z.