中文

K-equivalence in Birational Geometry

代数几何 2011-10-11 v3

摘要

We give a survey of the background and recent development on the KK-equivalence relation among birational manifolds. After a brief historical sketch of birational geometry, we define the KK-partial ordering and KK-equivalence in a birational class and discuss geometric situations that lead to these notions. One application to the filling-in problem for threefolds is given. We discuss the motivic aspect of KK-equivalence relation. We believe that KK-equivalent manifolds have the same Chow motive though we are unable to prove it at this moment. Instead we discuss various approaches toward the corresponding statements in different cohomological realizations. We also formulate the {\it Main Conjectures} and prove a weak version of it. Namely, up to complex cobordism, KK-equivalence can be decomposed into composite of classical flops. Finally we review some other current researches that are related to the study of KK-equivalence relation.

关键词

引用

@article{arxiv.math/0204160,
  title  = {K-equivalence in Birational Geometry},
  author = {Chin-Lung Wang},
  journal= {arXiv preprint arXiv:math/0204160},
  year   = {2011}
}

备注

18 pages. Minor changes, references updated