Marco Robalo

Maître de Conférence
Sorbonne Université
Faculté des sciences et ingénierie Pierre et Marie Curie,
Institut de Mathématiques de Jussieu - Paris Rive Gauche
Projet Analyse Algébrique
4 place Jussieu
Case 247
75252 Paris Cedex 05
France
Contact: marco.robalo (^) imj-prg.fr

 


Research Interests:

(Derived) Algebraic Geometry, Motives, Higher Category theory and Higher Algebra

 

Pre-Publications:

A Universal HKR Theorem - Joint with Tasos Moulinos and Bertrand Töen - pdf .

Publications:

[6] Gromov-Witten Theory with Derived Algebraic Geometry - Joint with Etienne Mann - This is a survey of the main results in [3] for the Summer School "États de la Recherche" (Toulouse, June 2017). The appendix section contains some new comparison results. Arxiv:1803.09476 . To appear in Panoramas et Synthèses.

[5] Motivic Realizations of Matrix Factorizations and Vanishing Cycles - Joint with A. Blanc , B. Töen and G. Vezzosi - JEP - arXiv:1607.03012

[4] A lemma for microlocal sheaf theory in the infinity-categorical setting - Joint with P. Schapira - arxiv: 1611.06789 - PRIMS.

[3] Brane actions, Categorification of Gromov-Witten theory and Quantum K-theory - Joint with Etienne Mann - Geometry & Topology - arXiv:1505.02964

[2] K-Theory and the bridge from Motives to non-commutative Motives - Advances in Mathematics (link), Erratum: The author thanks M. Hoyois for finding the error in the proof of Lemma 3.25. We provide a new proof to Thm 4.7 avoiding the Lemma.

[1] Théorie Homotopique Motivique des Espaces non-commutatifs , PhD Thesis , University of Montpellier under the supervision of Bertrand Toën .


 


Notes and Presentations:

• Some slides with an introduction to higher categories. Prepared for the same summer school "États de la Recherche".

• Notes for a Groupe de Travail around "THH" (2017/2018)

Slides from a talk about brane actions and Gromov-Witten theory

Cours Peccot Video Lectures

 


Enseignement:

• 2018/2019 - L2 - Groupes de permutations et groupes d'isométries || L1 1M001 - Algébre et Analyse pour les sciences || 2ème Semestre - en Délégation CNRS

• 2017/2018 - L1- 1M002 ( TD ) || "Groupes et Algèbres de Lie" TD || L1- 1M001

• 2016/2017 - Topology and Differential Calculus - AIMS Senegal || Cours M1 "Groupes et Algèbres de Lie" TD || Cours M2 - Homotopy Theory (with Gregory Ginot )

• 2015/2016 - TD Cours M1 "GÉOMETRIE DIFFÉRENTIELLE" 4M022 || TD Cours M1
"Groupes et Algèbres de Lie"