Zobrazeno 1 - 10
of 17
pro vyhledávání: '"Frédéric Vanhove"'
Autor:
Jan Casselman, Fréderic Van der Cruyssen, Frédéric Vanhove, Ronald Peeters, Robert Hermans, Constantinus Politis, Reinhilde Jacobs
Objectives We aim to validate 3D CRANI, a novel high-field STIR TSE, MR neurography sequence in the visualisation of the extraforaminal cranial and occipital nerve branches on a 3-T system. Furthermore, we wish to evaluate the role of gadolinium admi
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=doi_dedup___::fec5df4439ed5491eab19f0eaa4fbf49
https://lirias.kuleuven.be/handle/20.500.12942/707888
https://lirias.kuleuven.be/handle/20.500.12942/707888
Autor:
Geert Vanderschueren, Nathalie Noppe, Willem-Jan Metsemakers, Austin T. Fragomen, Harm Hoekstra, Frédéric Vanhove
Publikováno v:
Archives of Orthopaedic and Trauma Surgery. 139:795-805
Re-establishing anatomic rotational alignment of shaft fractures of the lower extremities remains challenging. Clinical evaluation in combination with radiological measurements is important in pre- and post-surgical assessment. Based on computed tomo
Autor:
Frédéric Vanhove
Publikováno v:
Advances in Mathematics of Communications. 5:157-160
We give a geometric proof of the upper bound of q2n+1$+1$ on the size of partial spreads in the polar space $H(4n+1,$q2$)$. This bound is tight and has already been proved in an algebraic way. Our alternative proof also yields a characterization of t
Autor:
Frédéric Vanhove
Publikováno v:
Journal of Algebraic Combinatorics. 34:357-373
The inequality of Higman for generalized quadrangles of order (s,t) with s>1 states that t?s 2. We generalize this by proving that the intersection number c i of a regular near 2d-gon of order (s,t) with s>1 satisfies the tight bound c i ?(s 2i ?1)/(
Autor:
Frédéric Vanhove
Publikováno v:
JOURNAL OF COMBINATORIAL DESIGNS
We give several examples of designs and antidesigns in classical finite polar spaces. These types of subsets of maximal totally isotropic subspaces generalize the dualization of the concepts of m-ovoids and tight sets of points in generalized quadran
Autor:
Frédéric Vanhove, Bart De Bruyn
Publikováno v:
COMBINATORICA
We discuss thick regular near 2d-gons with a Q-polynomial collinearity graph. For da parts per thousand yen4, we show that apart from Hamming near polygons and dual polar spaces there are no thick Q-polynomial regular near polygons. We also show that
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=doi_dedup___::4991187fdea17fde0c186000cc8213e0
https://biblio.ugent.be/publication/7140142
https://biblio.ugent.be/publication/7140142
Publikováno v:
Scopus-Elsevier
In this paper we investigate partial spreads of $H(2n-1,q^2)$ through the related notion of partial spread sets of hermitian matrices, and the more general notion of constant rank-distance sets. We prove a tight upper bound on the maximum size of a l
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=doi_dedup___::dae6658ce8a83fe98402a628ecfce7ab
https://biblio.vub.ac.be/vubir/constant-rankdistance-sets-of-hermitian-matrices-and-partial-spreads-in-hermitian-polar-spaces(7bf96c45-e2fa-4acf-9752-d7c3a69d63f5).html
https://biblio.vub.ac.be/vubir/constant-rankdistance-sets-of-hermitian-matrices-and-partial-spreads-in-hermitian-polar-spaces(7bf96c45-e2fa-4acf-9752-d7c3a69d63f5).html
Autor:
Frédéric Vanhove, Bart De Bruyn
Publikováno v:
EUROPEAN JOURNAL OF COMBINATORICS
We derive two sets of inequalities for regular near polygons and study the case where one or more of these inequalities become equalities. This will allow us to obtain two characterization results for dual polar spaces. Our investigation will also ha
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=doi_dedup___::241fc7fb81e95448a004568a090e5bd8
https://hdl.handle.net/1854/LU-3217940
https://hdl.handle.net/1854/LU-3217940
Publikováno v:
JOURNAL OF COMBINATORIAL THEORY SERIES A
We consider Erdős–Ko–Rado sets of generators in classical finite polar spaces. These are sets of generators that all intersect non-trivially. We characterize the Erdős–Ko–Rado sets of generators of maximum size in all polar spaces, except f
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=doi_dedup___::af39ffb448972fe339a93d3fcee38d5d
https://biblio.ugent.be/publication/1231350/file/1231354
https://biblio.ugent.be/publication/1231350/file/1231354
Autor:
Frédéric Vanhove
Publikováno v:
The Electronic Journal of Combinatorics. 16
We prove that in every finite Hermitian polar space of odd dimension and even maximal dimension $\rho$ of the totally isotropic subspaces, a partial spread has size at most $q^{\rho+1}+1$, where $GF(q^2)$ is the defining field. This bound is tight an