Towards the second main theorem on complements

Abstract: We prove the boundedness of complements modulo two conjectures: Borisov-Alexeev conjecture and effective adjunction for fibre spaces. We discuss the last conjecture and prove it in two particular cases.We give a sketch of the proof of our main results in Section 4. One can see that our proof essentially uses reduction to lower-dimensional global pairs. However it is expected that an improvement of our method can use reduction to local questions in the same dimension. In fact we hope that the hypothesis in our … Show more

“…The result follows from [PS09,Proposition 5.7]. Note that although the result in [PS09] is stated only over the complex field, the proof is characteristic free.…”

Uniform bounds for strongly 𝐹-regular surfaces

“…The result follows from [PS09,Proposition 5.7]. Note that although the result in [PS09] is stated only over the complex field, the proof is characteristic free.…”

Uniform bounds for strongly 𝐹-regular surfaces

“…This means that there is a common resolution If d f (X, B) ∈ {0, 1}, then the b-semi-ampleness of the moduli part M follows from [19] and [22] by the proof of Theorem 1.1. Moreover, it is obvious that M ∼ Q 0 when d f (X, B) = 0.…”

“…Introduction], [22,Conjecture 7.13.3], [6], [3], and [16,Section 3]). The b-semiampleness of the moduli part has been proved only for some special cases (see, for example, [19], [9], and [22,Section 8]). See also Remark 4.1 below.…”

On the moduli b-divisors of lc-trivial fibrations

“…The current approach for studying this problem is by using Kawamata's canonical bundle formula which identifies the pluricanonical ring of X with the pluricanonical ring of a pair (Y, + L) of log general type [Fujino and Mori 2000;Prokhorov and Shokurov 2009], where (Y, ) is a KLT pair (KLT = Kawamata log canonical; see Definition 1.4) and L is a ‫-ޑ‬line bundle coming from variation of Hodge structure. This raises the natural question of a log analogue of the above statement.…”

“…We remark that Conjecture 7.13 of [Prokhorov and Shokurov 2009] -in fact a list of conjectures -concerns the solution of the effective Iitaka fibration problem. We have shown item (2) of that list, in the relative dimension-two case.…”

Effectiveness of the log Iitaka fibration for 3-folds and 4-folds