Joeri De Ro

About me

Welcome! I am a mathematician working in the theory of locally compact quantum groups and their dynamics. I obtained my PhD, under the supervision of Prof. Kenny De Commer, on 23 April 2025 at Vrije Universiteit Brussel (VUB), with the thesis manuscript titled 'Equivariant W*-correspondences'.  Currently, I am still working at VUB, supported by an FWO-grant.

 You can contact me at Joeri.Ludo.De.Ro@vub.be.

Publications and preprints

Published:

1. J. De Ro, Morita theory for dynamical von Neumann algebras, International Mathematics Research Notices 12 (2025). Preprint version: arXiv:2410.17407 

2. K. De Commer and J. De Ro, Amenable actions of compact and discrete quantum groups on von Neumann algebras, Journal of Functional Analysis 289 (2025), 110973. Preprint version: arXiv:2408.05571v3

3. J. De Ro,  A categorical interpretation of Morita equivalence for dynamical von Neumann algebras,  Journal of Algebra 666 (2025), 673-702. Preprint version: arXiv:2408.07701v2

4. K. De Commer and J. De Ro, Approximation properties for dynamical W*-correspondences, Advances in Mathematics  458  (2024), 109958. Preprint version: arXiv:2308.05024v3

5. J. De Ro and L. Hataishi, Actions of compact and discrete quantum groups on operator systems,  International Mathematics Research Notices 15 (2024), 11190–11220. Preprint version: arXiv:2304.14055

Accepted for publication:

1. J.  De Ro, Equivariant injectivity of crossed products, Journal of Operator Theory. Preprint version: arXiv:2312.10738v3 

In preparation:

1. J. De Ro. Equivariant Eilenberg-Watts theorem for locally compact quantum groups.

2. J. De Ro. Constructions with equivariant correspondences and closed quantum subgroups.

Teaching

2024-2025:

• Ordinary differential equations (2nd BA of Mathematics)

• Differential geometry (2nd BA of Mathematics)

• Measure theory (3th BA of Mathematics)

• Introduction functional analysis (2nd BA of Mathematics)

2023-2024:

• Ordinary differential equations (2nd BA of Mathematics)

• Differential geometry (2nd BA of Mathematics)

• Measure theory (3th BA of Mathematics)

• Probability theory (2nd BA of Mathematics)

• Introduction functional analysis (2nd BA of Mathematics)

2022-2023:

• Calculus (1st BA of Computer Science, Chemistry, Biology)

• Measure theory (3th BA of Mathematics).

• Probability theory (2nd BA of Mathematics)

• Introduction functional analysis (2nd BA of Mathematics)

2021-2022:

• Probability theory (2nd BA of Mathematics)

• Linear algebra (1st BA of Computer Science, Chemistry, Biology)