Add to ORKGthis paper is a generalization of the following version of the argument principle for smooth maps from a manifold into complex projective space
Let M2n+1 be a C(CPn) -singular manifold. We study functions and vector fields with isolated singula...
For holomorphic line bundles, it has turned out to be useful to not just consider smooth metrics, bu...
Connections in fiber bundles, particularly in principal bundles, appear in many parts of differentia...
A compactification of the Chern-Weil theory for bundle maps developed by Harvey and Lawson is descri...
We show how the Chern character of the tangent bundle of a smooth manifold may be extracted from the...
Given a finite locally free resolution of a coherent analytic sheaf $\mathcal F$, equipped with Herm...
If we have a finite number of sections of a complex vector bundle E over a manifold M, certain Chern...
AbstractThe canonical family of Thom forms τs for 0 < s < ∞ constructed by Harvey and Lawson on an o...
We define Chern and Segre forms, or rather currents, associated with a Griffiths positive singular H...
AbstractMotivic integration [M. Kontsevich, Motivic integration, Lecture at Orsay, 1995] and MacPher...
The aim of this note is to point out that Chern characters can be computed using curvatures of \conn...
We prove a generalization of the classical Poincare-Lelong formula. Given a holomorphic section f, w...
For a compact complex manifold $X $ , we have the Chern class $c(X) $ , which is the Chern class $c(...
We prove a generalization of the classical Poincaré-Lelong formula. Given a holomorphic section $f$,...
We describe some instances of the appearance of Chern's mathematical ideas in physics. By means of s...
Let M2n+1 be a C(CPn) -singular manifold. We study functions and vector fields with isolated singula...
For holomorphic line bundles, it has turned out to be useful to not just consider smooth metrics, bu...
Connections in fiber bundles, particularly in principal bundles, appear in many parts of differentia...
A compactification of the Chern-Weil theory for bundle maps developed by Harvey and Lawson is descri...
We show how the Chern character of the tangent bundle of a smooth manifold may be extracted from the...
Given a finite locally free resolution of a coherent analytic sheaf $\mathcal F$, equipped with Herm...
If we have a finite number of sections of a complex vector bundle E over a manifold M, certain Chern...
AbstractThe canonical family of Thom forms τs for 0 < s < ∞ constructed by Harvey and Lawson on an o...
We define Chern and Segre forms, or rather currents, associated with a Griffiths positive singular H...
AbstractMotivic integration [M. Kontsevich, Motivic integration, Lecture at Orsay, 1995] and MacPher...
The aim of this note is to point out that Chern characters can be computed using curvatures of \conn...
We prove a generalization of the classical Poincare-Lelong formula. Given a holomorphic section f, w...
For a compact complex manifold $X $ , we have the Chern class $c(X) $ , which is the Chern class $c(...
We prove a generalization of the classical Poincaré-Lelong formula. Given a holomorphic section $f$,...
We describe some instances of the appearance of Chern's mathematical ideas in physics. By means of s...
Let M2n+1 be a C(CPn) -singular manifold. We study functions and vector fields with isolated singula...
For holomorphic line bundles, it has turned out to be useful to not just consider smooth metrics, bu...
Connections in fiber bundles, particularly in principal bundles, appear in many parts of differentia...