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:
J. De Ro, Morita theory for dynamical von Neumann algebras, International Mathematics Research Notices 12 (2025). Preprint version: arXiv:2410.17407
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
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
K. De Commer and J. De Ro, Approximation properties for dynamical W*-correspondences, Advances in Mathematics 458 (2024), 109958. Preprint version: arXiv:2308.05024v3
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:
J. De Ro, Equivariant injectivity of crossed products, Journal of Operator Theory. Preprint version: arXiv:2312.10738v3
In preparation:
J. De Ro. Equivariant Eilenberg-Watts theorem for locally compact quantum groups.
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)