Boundedness of klt complements on Fano fibrations over surfaces
Abstract
Let (X,B) be an ε-lc pair of dimension d with a closed point x∈ X. Birkar and Shokurov conjectured that there is an effective Cartier divisor H passing through x such that (X,B+tH) is lc near x, where t is a positive real number depending only on d,ε. We prove that this conjecture is equivalent to Shokurov's conjecture on boundedness of klt complements on Fano fibrations and we confirm it in dimension 2. As a corollary, we prove the boundedness of klt complements on Fano fibrations over surfaces.
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