Bogomolov's paper on "Holomorphic tensors and vector bundles on projective manifolds" proves what is now known as the
Bogomolov–Miyaoka–Yau inequality, and also proves that a stable bundle on a surface, restricted to a curve of sufficiently big degree, remains stable. In "Families of curves on a surface of general type", Bogomolov laid the foundations to the now popular approach to the theory of
diophantine equations through geometry of
hyperbolic manifolds and
dynamical systems. In this paper Bogomolov proved that on any
surface of general type with c_1^2>c_2, there is only a finite number of curves of bounded genus. Some 25 years later,
Michael McQuillan extended this argument to prove the famous Green–Griffiths conjecture for such surfaces. In "Classification of surfaces of class VII_0 with b_{2}=0", Bogomolov made the first step in a famously difficult (and still unresolved) problem of classification of surfaces of Kodaira class VII. These are compact complex surfaces with b_2=1. If they are in addition minimal, they are called
class VII_0.
Kunihiko Kodaira classified all compact complex surfaces except class VII, which are still not understood, except the case b_{2}=0 (Bogomolov) and b_{2}=1 (Andrei Teleman, 2005). == Later career ==