Profil

Pilatte Cédric

Université de Mons - UMONS > Faculté des Sciences > Service de Logique mathématique

Main Referenced Co-authors
GALANT, Damien  (1)
Galant, Damien (1)
Main Referenced Keywords
Mathematics - Combinatorics (2); Mathematics - Number Theory (2); combinatorics (1); Computational Complexity (1); Discrete Geometry (1);
Main Referenced Unit & Research Centers
AGIF - Algèbre, Géométrie et Interactions fondamentales (5)
CREMMI - Modélisation mathématique et informatique (5)
Main Referenced Disciplines
Mathematics (10)
Electrical & electronics engineering (3)

Publications (total 10)

The most downloaded
16 downloads
Galant, D., & Pilatte, C. (2021). A note on optimal degree-three spanners of the square lattice. Discrete Mathematics, Algorithms and Applications. https://hdl.handle.net/20.500.12907/22622

The most cited

2 citations (Scopus®)

Pilatte, C. (2020). On the sets of n points forming n + 1 directions. Electronic Journal of Combinatorics. doi:10.37236/8308 https://hdl.handle.net/20.500.12907/10036

Pilatte, C. (2023). A solution to the Erdős-Sárközy-Sós problem on asymptotic Sidon bases of order 3. doi:10.48550/arXiv.2303.09659

Pilatte, C. (2023). Improved bounds for the two-point logarithmic Chowla conjecture.

Pilatte, C. (2022). New bound for Roth’s theorem with generalized coefficients. Discrete Analysis.
Peer Reviewed verified by ORBi

Pilatte, C. (2021). New bound for Roth's theorem with generalized coefficients.

Galant, D., & Pilatte, C. (2021). A note on optimal degree-three spanners of the square lattice. Discrete Mathematics, Algorithms and Applications.
Peer reviewed

Pilatte, C. (07 April 2021). The Inverse Slope Problem and Additive Combinatorics [Poster presentation]. British Mathematical Colloquium (BMC), Glasgow, (Online), United Kingdom.

Galant, D., & Pilatte, C. (2020). A note on optimal degree-three spanners of the square lattice.

Pilatte, C. (2020). NP-completeness of slope-constrained drawing of complete graphs. Journal of Computational Geometry.
Peer Reviewed verified by ORBi

Pilatte, C. (2020). On the sets of n points forming n + 1 directions. Electronic Journal of Combinatorics. doi:10.37236/8308
Peer Reviewed verified by ORBi

Pilatte, C. (2019). Un problème de pentes. Losanges.
Peer reviewed

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