Add to ORKGWe define a notion of vexillar design for the flag variety in the spirit of the already known spherical designs. We explain how the orbits of any flag under the action of a finite group can be a design. We show that a lattice is locally optimal for the general Hermite constant when its minima form a 4-design. The reasoning proves useful to show the extremality of many new expected examples (E8, Λ24, Barnes–Wall lattices, Thompson–Smith lattice for instance) that were out of reach until now
A new definition for the dimension of a combinatorial t-(v,k,λ) design over a finite field is propos...
This thesis studies generalised Hermite constants associated with the adelic general linear group. L...
A new definition for the dimension of a combinatorial t-(v,k,λ) design over a finite field is propos...
We define a notion of vexillar design for the flag variety in the spirit of the already known spheri...
AbstractWe define a notion of vexillar design for the flag variety in the spirit of the already know...
We define a notion of vexillar design for the flag variety in the spirit of the spherical designs in...
AbstractWe define a notion of vexillar design for the flag variety in the spirit of the already know...
A well known theorem of Voronoi caracterizes extreme quadratic forms and Euclidean lattices, that is...
We set up a connection between the theory of spherical designs and the question of minima of Epstein...
A graphical design is a proper subset of vertices of a graph on which many eigenfunctions of the Lap...
This thesis extends Voronoy theory to the generalised Hermite invariants defined by T. Watanabe for ...
This note demonstrates that lattice square designs are /4-optimal, within the class of lattice squar...
My talk was about some recent connections between spherical designs and the classical theory of perf...
We study the Grassmannian 4-designs contained in lattices, in connection with the local property of ...
A new definition for the dimension of a combinatorial t-(v,k,λ) design over a finite field is propos...
A new definition for the dimension of a combinatorial t-(v,k,λ) design over a finite field is propos...
This thesis studies generalised Hermite constants associated with the adelic general linear group. L...
A new definition for the dimension of a combinatorial t-(v,k,λ) design over a finite field is propos...
We define a notion of vexillar design for the flag variety in the spirit of the already known spheri...
AbstractWe define a notion of vexillar design for the flag variety in the spirit of the already know...
We define a notion of vexillar design for the flag variety in the spirit of the spherical designs in...
AbstractWe define a notion of vexillar design for the flag variety in the spirit of the already know...
A well known theorem of Voronoi caracterizes extreme quadratic forms and Euclidean lattices, that is...
We set up a connection between the theory of spherical designs and the question of minima of Epstein...
A graphical design is a proper subset of vertices of a graph on which many eigenfunctions of the Lap...
This thesis extends Voronoy theory to the generalised Hermite invariants defined by T. Watanabe for ...
This note demonstrates that lattice square designs are /4-optimal, within the class of lattice squar...
My talk was about some recent connections between spherical designs and the classical theory of perf...
We study the Grassmannian 4-designs contained in lattices, in connection with the local property of ...
A new definition for the dimension of a combinatorial t-(v,k,λ) design over a finite field is propos...
A new definition for the dimension of a combinatorial t-(v,k,λ) design over a finite field is propos...
This thesis studies generalised Hermite constants associated with the adelic general linear group. L...
A new definition for the dimension of a combinatorial t-(v,k,λ) design over a finite field is propos...