Add to ORKGWe study the slicing inequality for the surface area instead of volume. This is the question whether there exists a constant αn depending (or not) on the dimension n so that S(K) ≤ αn|K| n1 max S(K ∩ ξ˔), ξ∈Sn−1 where S denotes surface area and |· | denotes volume. For any fixed dimension we provide a negative answer to this question, as well as to a weaker version in which sections are replaced by projections onto hyperplanes. We also study the same problem for sections and projections of lower dimension and for all the quermassintegrals of a convex body. Starting from these questions, we also introduce a number of natural parameters relating volume and surface area, and provide optimal upper and lower bounds for them. Finally, we show tha...
Abstract. The Loomis-Whitney inequality is a sharp estimate from above of the volumeof a compact sub...
It is a well known fact that for every polynomial time algorithm which gives an upper bound V (K) an...
AbstractHere we show that any centrally-symmetric convex body K⊂Rn has a perturbation T⊂Rn which is ...
Approximating convex bodies is a fundamental question in geometry and has applications to a wide var...
If K is a convex body in the Euclidean space En, we consider the six classic geometric functionals a...
Given a convex body $K$ in $\mathbb R^n$ and a real number $p$, we study the extremal inner and out...
Given a convex body $K$ in $\mathbb R^n$ and a real number $p$, we study the extremal inner and out...
The study of high-dimensional convex bodies from a geometric and analytic point of view, with an emp...
The following paper considers Alexandrov’s conjecture, that the ratio of surface area to intrinsic d...
Abstract. Bárány and Tokushige solved the problem of characterizing the asymptotic behavior of the...
Abstract. The Loomis-Whitney inequality is a sharp estimate from above of the volumeof a compact sub...
ABSTRACT For a convex body K in R n , the volume quotient is the ratio of the smallest volume of the...
Abstract. The purpose of this note is to bring into attention an apparently forgotten result of C. M...
Abstract. The Loomis-Whitney inequality is a sharp estimate from above of the volumeof a compact sub...
For a convex body K in Rn, the volume quotient is the ratio of the smallest volume of the circumscri...
Abstract. The Loomis-Whitney inequality is a sharp estimate from above of the volumeof a compact sub...
It is a well known fact that for every polynomial time algorithm which gives an upper bound V (K) an...
AbstractHere we show that any centrally-symmetric convex body K⊂Rn has a perturbation T⊂Rn which is ...
Approximating convex bodies is a fundamental question in geometry and has applications to a wide var...
If K is a convex body in the Euclidean space En, we consider the six classic geometric functionals a...
Given a convex body $K$ in $\mathbb R^n$ and a real number $p$, we study the extremal inner and out...
Given a convex body $K$ in $\mathbb R^n$ and a real number $p$, we study the extremal inner and out...
The study of high-dimensional convex bodies from a geometric and analytic point of view, with an emp...
The following paper considers Alexandrov’s conjecture, that the ratio of surface area to intrinsic d...
Abstract. Bárány and Tokushige solved the problem of characterizing the asymptotic behavior of the...
Abstract. The Loomis-Whitney inequality is a sharp estimate from above of the volumeof a compact sub...
ABSTRACT For a convex body K in R n , the volume quotient is the ratio of the smallest volume of the...
Abstract. The purpose of this note is to bring into attention an apparently forgotten result of C. M...
Abstract. The Loomis-Whitney inequality is a sharp estimate from above of the volumeof a compact sub...
For a convex body K in Rn, the volume quotient is the ratio of the smallest volume of the circumscri...
Abstract. The Loomis-Whitney inequality is a sharp estimate from above of the volumeof a compact sub...
It is a well known fact that for every polynomial time algorithm which gives an upper bound V (K) an...
AbstractHere we show that any centrally-symmetric convex body K⊂Rn has a perturbation T⊂Rn which is ...