Mathematics

During my Ph.D. years I became interested in the theory of algebraic cycles and in its interaction with the theory of motives. In particular, I worked and I am working in the emerging area of non-homotopy invariant motives, a recent development of the theory of Vladimir Voevodsky that is based on insights of Spencer Bloch, Hélène Esnault, Bruno Kahn, Moritz Kerz, Shuji Saito and others.

Papers and Preprints:

  1. (with Shuji Saito)  Algebraic cycles with moduli and regulator maps. arXiv:1412.0385 [math.AG]. Updated version (2017). Accepted for publication in J. of the Inst. of Math. Jussieu.
  2. (with Jin Cao, Wataru Kai and Rin Sugiyama) Torsion and divisibility for reciprocity sheaves and 0-cycles with modulus. J. of Algebra, Volume 469, 1 January 2017, Pages 437–463. Preprint version arXiv:1503.02161 [math.AG]. Published version.
  3. (with Amalendu Krishna) Zero cycles with modulus and zero cycles on singular varieties. arXiv:1512.04847 [math.AG]. Updated version (2017).  Accepted for publication in Compositio Math.
  4. Torsion zero cycles with modulus on affine varieties. arXiv:1604.06294v2 [math.AG]. (2017).  to appear in J. of Pure and App. Algebra. Online version.
  5. A cycle class map for zero cycles with modulus to higher relative K-groups. arXiv:1706.07126 [math.AG]. Submitted (2017). Part of it was contained in the first chapter of my PhD thesis.
  6. Additive homotopy theory of schemes. Here’s a first draft (2017).  Part of this paper is the content of the second Chapter of my PhD Thesis.
  7. (with Shuji Saito) 1-motives with modulus. In preparation.
  8. (with Stefan Müller-Stach and Thomas Weißschuh) Extensions of enriched Hodge structures and Jacobians with modulus. In preparation. 

Thesis:

Motives and algebraic cycles with moduli conditions. Ph.D. thesis, University of Duisburg-Essen (2016). DuEPublico ID: 41950. Available here.

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