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  • 4 Similar Profiles
K-theory Mathematics
Cyclic Homology Mathematics
Ring Mathematics
Algebraic K-theory Mathematics
K-group Mathematics
Hochschild Homology Mathematics
Cohomology Mathematics
Toric Varieties Mathematics

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Projects 2008 2020

Motivic Cohomology
Homotopy Theory
Algebraic Geometry
K-theory
Slice
Motivic Cohomology
K-theory
Cyclic Homology
Algebraic topology
Cobordism
Research Methods
Algebraic Geometry
Algebraic Variety
Homotopy Theory
Invariant
Motivic Cohomology
Algebraic K-theory
K-theory
Chow Groups
Algebraic Geometry

Research Output 1978 2018

K-theory of line bundles and smooth varieties

Haesemeyer, C. & Weibel, C., Jan 1 2018, In : Proceedings of the American Mathematical Society. 146, 10, p. 4139-4150 12 p.

Rutgers, The State University

Research output: Contribution to journalArticle

Projective Variety
K-theory
Line Bundle
Sheaves
Invertible

Principal ideals in mod- ℓ Milnor K-theory

Weibel, C. & Zakharevich, I., Dec 1 2017, In : Journal of Homotopy and Related Structures. 12, 4, p. 1033-1049 17 p.

Rutgers, The State University

Research output: Contribution to journalArticle

K-theory
Annihilator
Generator
kernel
Norm

Relative Cartier divisors and Laurent polynomial extensions

Sadhu, V. & Weibel, C., Feb 1 2017, In : Mathematische Zeitschrift. 285, 1-2, p. 353-366 14 p.

Rutgers, The State University

Research output: Contribution to journalArticle

Canonical Decomposition
Laurent Polynomials
Commutative Ring
Invertible
Divisor

Twisted K-theory, Real A-bundles and Grothendieck–Witt groups

Karoubi, M. & Weibel, C., Jul 1 2017, In : Journal of Pure and Applied Algebra. 221, 7, p. 1629-1640 12 p.

Rutgers, The State University

Research output: Contribution to journalArticle

Witt Group
Grothendieck Group
K-theory
Bundle
Algebraic Variety
1 Citations

Some surfaces of general type for which Bloch's conjecture holds

Pedrini, C. & Weibel, C., Feb 4 2016, Recent Advances in Hodge Theory: Period Domains, Algebraic Cycles, and Arithmetic. Cambridge University Press, p. 308-330 23 p.

Rutgers, The State University

Research output: Chapter in Book/Report/Conference proceedingChapter

Surfaces of General Type
Involution