ﻻ يوجد ملخص باللغة العربية
It is conjectured that the canonical models of varieties (not of general type) are bounded when the Iitaka volume is fixed. We confirm this conjecture when the general fibers of the corresponding Iitaka fibration are in a fixed bounded family of polarized Calabi-Yau pairs. As a consequence, we prove that in this case, the fibration is birationally bounded, and when it has terminal singularities, the corresponding minimal model is bounded in codimension 1.
We give a new simple proof of boundedness of the family of semistable sheaves with fixed numerical invariants on a fixed smooth projective variety. In characteristic zero our method gives a quick proof of Bogomolovs inequality for semistable sheaves
Let $Gamma$ be a finite set, and $X i x$ a fixed klt germ. For any lc germ $(X i x,B:=sum_{i} b_iB_i)$ such that $b_iin Gamma$, Nakamuras conjecture, which is equivalent to the ACC conjecture for minimal log discrepancies for fixed germs, predicts th
An important classification problem in Algebraic Geometry deals with pairs $(E,phi)$, consisting of a torsion free sheaf $E$ and a non-trivial homomorphism $phicolon (E^{otimes a})^{oplus b}lradet(E)^{otimes c}otimes L$ on a polarized complex project
We show the existence of $(epsilon,n)$-complements for $(epsilon,mathbb{R})$-complementary surface pairs when the coefficients of boundaries belong to a DCC set.
We prove that the log canonical ring of a projective log canonical pair in Kodaira dimension two is finitely generated.