Add to ORKGLet C be the boundary surface of a strictly convex d-dimensional body. Andrews obtained an upper bound in terms of M for the number of points on MC, the M-fold enlargement of C. We consider the integer points within a distance 5 of the hypersurface MC. Introducing S requires some uniform approximability condition on the surface C, involving determinants of derivatives. To obtain an asymptotic formula (main term the volume of the search region) requires the Fourier transform with conditions up to the Gd-th derivative. We obtain an upper bound subject to a Curvature Condition that re quires only first and second derivatives, that MC has a tangent hyperplane everywhere, and each two-dimensional normal section has radius of curvature in the ran...
Upper and lower bounds are given for the maximum Euclidean curvature among faces in Bianchi's fundam...
We discuss the relationship between Penner's λ-lengths, with both Fermat's theorem on representation...
I will describe some ways in which Zeta functions enter geometry and their relation to the theory o...
Let C be the boundary surface of a strictly convex d-dimensional body. Andrews obtained an upper bou...
Magic figures are discrete, two-dimensional (2-D) objects. We translated the definitions of magic sq...
This thesis presents solutions to various problems in the expanding field of combinatorial geometry....
International audienceThese is a survey on the theory of height zeta functions, written on the occas...
We prove discrete restriction estimates for a broad class of hypersurfaces arising in seminal work o...
Let Δ(x) and E(t) denote respectively the remainder terms in the Dirichlet divisor problem and the m...
In this thesis we study Mahler's conjecture in convex geometry, give a short summary about its histo...
Erd\H{o}s, Graham, and Selfridge considered, for each positive integer $n$, the least value of $t_n$...
We study a class of semialgebraic convex bodies called discotopes. These are instances of zonoids, o...
textHypergeometric functions seem to be ubiquitous in mathematics. In this document, we present a co...
The following paper considers Alexandrov’s conjecture, that the ratio of surface area to intrinsic d...
The Birch and Swinnerton-Dyer conjecture is one the most important, still unsolved problem in mathem...
Upper and lower bounds are given for the maximum Euclidean curvature among faces in Bianchi's fundam...
We discuss the relationship between Penner's λ-lengths, with both Fermat's theorem on representation...
I will describe some ways in which Zeta functions enter geometry and their relation to the theory o...
Let C be the boundary surface of a strictly convex d-dimensional body. Andrews obtained an upper bou...
Magic figures are discrete, two-dimensional (2-D) objects. We translated the definitions of magic sq...
This thesis presents solutions to various problems in the expanding field of combinatorial geometry....
International audienceThese is a survey on the theory of height zeta functions, written on the occas...
We prove discrete restriction estimates for a broad class of hypersurfaces arising in seminal work o...
Let Δ(x) and E(t) denote respectively the remainder terms in the Dirichlet divisor problem and the m...
In this thesis we study Mahler's conjecture in convex geometry, give a short summary about its histo...
Erd\H{o}s, Graham, and Selfridge considered, for each positive integer $n$, the least value of $t_n$...
We study a class of semialgebraic convex bodies called discotopes. These are instances of zonoids, o...
textHypergeometric functions seem to be ubiquitous in mathematics. In this document, we present a co...
The following paper considers Alexandrov’s conjecture, that the ratio of surface area to intrinsic d...
The Birch and Swinnerton-Dyer conjecture is one the most important, still unsolved problem in mathem...
Upper and lower bounds are given for the maximum Euclidean curvature among faces in Bianchi's fundam...
We discuss the relationship between Penner's λ-lengths, with both Fermat's theorem on representation...
I will describe some ways in which Zeta functions enter geometry and their relation to the theory o...