Titlebook: Classification of Higher Dimensional Algebraic Varieties; Christopher D. Hacon,Sándor Kovács Textbook 2010 Birkh?user Basel 2010 Dimension

Offstage

令人作嘔

Nyamjav Sumberzul,Shagdarsuren OyunbilegIn this Chapter we will recall the definition and the main properties of multiplier ideal sheaves. The standard reference for multiplier ideal sheaves is [ Laz04b]. In what follows we will focus on a generalization of this notion known as adjoint ideals.

變量

https://doi.org/10.1057/9781137291646 . - 1. . π: . → . Δ . ?-. = [Δ] . ?-. ≥ 0, (.,Δ) ., (., Ω +A. . Ω = (A + B)|., . .(. + Δ) . > 0 .

Intruder

Researching Intercultural LearningIn this chapter we will prove that Theorems 5.56, 5.57, 5.58, 5.59, 5.60 in dimensions ≤ . - 1 and Theorems 5.56, 5.57 in dimensions ≤ . imply Theorem 5.58 in dimension .. We begin by recalling the following results from [Nak04].

臥虎藏龍

Researching Intercultural Learning Theorems 5.59, 5.60 in dimensions ≤ n - 1 and Theorems 5.56, 5.57, 5.58 in dimensions ≤ n imply Theorem 5.59 (1) in dimension n.

Contort

解開

International Pedagogical StructuresThroughout this section we will use the notation for the pull-back of a sheaf introduced in (2.15).

異教徒

會(huì)議

Conceptualisations of Intimacy,In this chapter we will recall a few results regarding singularities that occur on stable varieties, that is, singularities of the objects that appear on the boundary of the moduli spaces we discussed in the previous chapter.

拖債

SingularitiesFor an excellent introduction to this topic the reader is urged to take a thorough look at Miles Reid’s . [Rei87]. Here we will only briefly touch on the subject.