# Kristian J. Moi

**About me**: I am a mathematician by training and I've worked as a postdoc in pure mathematics at Copenhagen University, University of Münster, MPIM in Bonn and KTH in Stockholm. I currently work as a data engineer for the insurance company Fremtind Forsikring in Oslo.

**Research: ** My field of research is algebraic topology and homotopy theory, focusing on algebraic K-theory, trace methods and equivariant phenomena.

**E-mail: **kristian.moi at gmail.com

**Papers:**

Homotopy theory of G-diagrams and equivariant excision, (arXiv version, published version in Algebraic & Geometric Topology, joint with E. Dotto)

Equivariant loops on classifying spaces (Accepted for publication in Algebraic & Geometric Topology)

Real topological Hochschild homology (Accepted for publication in Journal of the European Mathematical Society, joint with E. Dotto, I. Patchkoria and S. Reeh)

Witt Vectors, Polynomial Maps, and Real Topological Hochschild Homology (joint with E. Dotto and I. Patchkoria)

Hermitian K-theory for stable infinity-categories I: Foundations. (Joint with Baptiste Calmès, Emanuele Dotto, Yonatan Harpaz, Fabian Hebestreit, Markus Land, Denis Nardin, Thomas Nikolaus and Wolfgang Steimle)

Hermitian K-theory for stable infinity-categories II: Cobordism categories and additivity. (Joint with Baptiste Calmès, Emanuele Dotto, Yonatan Harpaz, Fabian Hebestreit, Markus Land, Denis Nardin, Thomas Nikolaus and Wolfgang Steimle)

Hermitian K-theory for stable infinity-categories III: Grothendieck-Witt groups of rings. (Joint with Baptiste Calmès, Emanuele Dotto, Yonatan Harpaz, Fabian Hebestreit, Markus Land, Denis Nardin, Thomas Nikolaus and Wolfgang Steimle)

PhD thesis: Equivariant homotopy theory and K-theory of exact categories with duality

**Here is video from a talk I gave at the Hausdorff Institute in Bonn:**

**Kristian Moi: Real topological Hochschild homology**