Characterizing Curves on Surface of Special Types.
Characterizing Moisezon Spaces by Almost Positive Coherent Analytic Sheaves.
Characterizing Projective Bundles by Means of Ample Divisors.
Characterizing singularities of varieties and of mappings.
Characters of the Grothendieck-Teichmüller group through rigidity of the Burau representation
We present examples of characters of absolute Galois groups of number fields that can be recovered through their action by automorphisms on the profinite completion of the braid groups, using a “rigidity” approach. The way we use to recover them is through classical representations of the braid groups, and in particular through the Burau representation. This enables one to extend these characters to Grothendieck-Teichmüller groups.
Charakteristiken und Schnittzahlformeln für p-l-s-Kegelschnitte
Cheeger-Goreski-MacPherson's conjecture for the varieties with isolated singularities.
Chen–Ruan Cohomology of and
In this work we compute the Chen–Ruan cohomology of the moduli spaces of smooth and stable -pointed curves of genus . In the first part of the paper we study and describe stack theoretically the twisted sectors of and . In the second part, we study the orbifold intersection theory of . We suggest a definition for an orbifold tautological ring in genus , which is a subring of both the Chen–Ruan cohomology and of the stringy Chow ring.
Chern classes, adeles and L-functions.
Chern classes and Hirzebruch-Riemann-Roch theorem for coherent sheaves on complex-projective orbifolds with isolated singularities.
Chern classes of fibered products of surfaces.
Chern classes of matrices over Noetherian rings.
Chern Classes of Rank 3 Stable Reflexive Sheaves.
Chern classes of reductive groups and an adjunction formula
In this paper, I construct noncompact analogs of the Chern classes for equivariant vector bundles over complex reductive groups. For the tangent bundle, these Chern classes yield an adjunction formula for the (topological) Euler characteristic of complete intersections in reductive groups. In the case where a complete intersection is a curve, this formula gives an explicit answer for the Euler characteristic and the genus of the curve. I also prove that the higher Chern classes vanish. The first...
Chern invariants of surfaces of general type
Chern numbers for singular varieties and elliptic homology.
Chern numbers of a Kupka component
We will consider codimension one holomorphic foliations represented by sections , and having a compact Kupka component . We show that the Chern classes of the tangent bundle of behave like Chern classes of a complete intersection 0 and, as a corollary we prove that is a complete intersection in some cases.
Chern Numbers of Algebraic Surfaces.
Chern numbers of cusp resolutions in totally real cubic number fields.
Chern numbers of Hilbert modular varieties.