Blaschke-decomposable convex bodies

For a given centred convex bodyK of ℝ,n≥3, let be the class of all convex bodies with the same projection body asK. The question whetherK can be expressed as a Blaschke average of two non-homothetic bodies from is considered. Necessary and sufficient conditions onK to be Blaschke decomposable in are given. The paper provides also a characterization of the bodiesK such that the Blaschke indecomposable bodies in are dense in itself.     

Completions of convex families of convex bodies

The paper discusses the existence of a continuous extension of functions that are defined on subsets of ? ⁿ and whose values are convex bodies in ? ⁿ . This problem arose in convex geometry in connection with the notion, recently introduced in algebraic geometry, of convex Newton-Okounkov bodies.     

Duality of convex bodies

The paper presents a category theoretical approach to the notion of duality of convex bodies. Using results of I. Barany (Acta Sci. Math. (Szeged)52 (1988), 93–100), we define and study metric duality , whose advantage is that congruent convex bodies have congruent duals.Dedicated to Professor Helmut Salzmann on the occasion of his 65th birthday     

Polar reciprocal convex bodies

The minimum of the product of the volume of a symmetric convex bodyK and the volume of the polar reciprocal body ofK relative to the center of symmetry is attained for the cube and then-dimensional crossbody. As a consequence, there is a sharp upper bound in Mahler’s theorem on successive minima in the geometry of numbers. The difficulties involved in the determination of the minimum for unsymmetricK are discussed. Reserch partially supported by NSF Grant GP-27960. An erratum to this article is available at .     

On reduced convex bodies

A convex bodyK ⊂R ^d is called reduced if for each convex bodyK′ ⊂K,K′ ≠K, the width ofK′ is less than the width ofK. We prove that reduced bodyK is of constant width if (i) the bodyK has a supporting sphere almost everywhere in ∂K. (The radius of the sphere may vary with the point in ∂K; the condition (i) and strict convexity do not imply each other.) Supported by an N.S.E.R.C. Grant of Canada.     

Approximation of convex bodies by axially symmetric bodies

Let be an arbitrary planar convex body. We prove that contains an axially symmetric convex body of area at least . Also approximation by some specific axially symmetric bodies is considered. In particular, we can inscribe a rhombus of area at least in , and we can circumscribe a homothetic rhombus of area at most about . The homothety ratio is at most . Those factors and , as well as the ratio , cannot be improved.

     

Mixed width-integrals of convex bodies

The mixed width-integrals are defined and shown to have properties similar to those of the mixed volumes of Minkowski. An inequality is established for the mixed width-integrals analogous to the Fenchel-Aleksandrov inequality for the mixed volumes. An isoperimetric inequality (involving the mixed width-integrals) is presented which generalizes an inequality recently obtained by Chakerian and Heil. Strengthened versions of this general inequality are obtained by introducing indexed mixed width-integrals. This leads to an isoperimetric inequality similar to Busemann’s inequality involving concurrent cross-sections of convex bodies.     

Iterated means of convex bodies

LetK be a convex body inR ⁿ with polarK . Let _p refer to Fireyp orp-dot means. If 0<<1,p1, andK _i+1 =K _{i p} (1–)K _i , fori1, then K _i is the unit ball inR ⁿ.     

Contact points of convex bodies

LetB be a convex body in ? ⁿ and let ? be an ellipsoid of minimal volume containingB. By contact points ofB we mean the points of the intersection between the boundaries ofB and ?. By a result of P. Gruber, a generic convex body in ? ⁿ has (n+3)·n/2 contact points. We prove that for every ?>0 and for every convex bodyB ? ? ⁿ there exists a convex bodyK having $$m \leqslant C(\varepsilon ) \cdot n\log ^3 n$$ contact points whose Banach-Mazur distance toB is less than 1+?. We prove also that for everyt>1 there exists a convex symmetric body Γ ? ? ⁿ so that every convex bodyD ? ? ⁿ whose Banach-Mazur distance to Γ is less thant has at least (1+c ₀/t ²)·n contact points for some absolute constantc ₀. We apply these results to obtain new factorizations of Dvoretzky-Rogers type and to estimate the size of almost orthogonal submatrices of an orthogonal matrix.     

Hyperplane sections of convex bodies

We prove sharp inequalities for the volumes of hyperplane sections bisecting a convex body in Rn. This leads to a relative isoperimetric inequality for arbitrary hyperplane sections of a convex body.     

Double normals of convex bodies

In this paper we study the set of double normals of a solid convex body inE ⁿ (e.g.n-simplex). There are at leastn double normals. The lengths form a set of measure zero in ℝ forn≦3, not necessarily so forn>3. a. Research partially supported by the N.S.F. b. Lecture in the conference on differential geometry, June 1964, at Oberwohlfach, Germany.