nLab Sadok Kallel

• webpage Lille

• webpage Sharjah

• Mathematics Genealogy page

Selected writings

On the rational cohomology of iterated loop spaces of n-spheres (cocycle spaces in rational Cohomotopy on n-spheres):

• Sadok Kallel, Denis Sjerve, On Brace Products and the Structure of Fibrations with Section, 1999 (pdf, pdf)

On configuration spaces and the homotopy type of mapping spaces from surfaces into complex projective spaces $\mathbb{C}P^n$ (hence of cohomotopy cocycle spaces for $n = 1$):

• Sadok Kallel: Configuration Spaces and the Topology of Curves in Projective Space, in: Topology, Geometry, and Algebra: Interactions and new directions, Contemporary Mathematics 279, AMS (2001) 151–175 [doi:10.1090/conm/279, arXiv:math-ph/0003010]

On configuration spaces of points:

• Sadok Kallel, Spaces of particles on manifolds and Generalized Poincaré Dualities, The Quarterly Journal of Mathematics 52 1 (2001) [doi:10.1093/qjmath/52.1.45]

• Sadok Kallel, Ines Saihi, Homotopy Groups of Diagonal Complements, Algebr. Geom. Topol. 16 (2016) 2949-2980 (arXiv:1306.6272)

The abelian case of what later came to be called nonabelian Poincaré duality:

• Sadok Kallel: Particle Spaces on Manifolds and Generalized Poincaré Dualities, Querterly Journal Math. 52 1 (2001) 45–70 [doi:10.1093/qjmath/52.1.45, arXiv:math/9810067]

On graph-indexed configuration spaces of points:

• Sadok Kallel, The Homotopy Type of Graph Configuration Spaces, talk at CQTS (Oct 2023) [slides:pdf, YT]

Review of configuration spaces of points and their relation to Cohomotopy via the scanning map:

• Sadok Kallel, Configuration spaces of points: A user’s guide, Encyclopedia of Mathematical Physics 2nd ed 4 (2025) 98-135 [arXiv:2407.11092, doi:10.1016/B978-0-323-95703-8.00211-1]

Related entries

• configuration space of points

• iterated loop space

• rational Cohomotopy