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1 ISSN: X (Print) ISSN: (Online) Bulletin of the Iranian Mathematical Society Vol. 41 (2015), No. 3, pp Title: Volume difference inequalities for the projection and intersection bodies Author(s): C. J. Zhao and W. S. Cheung Published by Iranian Mathematical Society
2 Bull. Iranian Math. Soc. Vol. 41 (2015), No. 3, pp Online ISSN: VOLUME DIFFERENCE INEQUALITIES FOR THE PROJECTION AND INTERSECTION BODIES C. J. ZHAO AND W. S. CHEUNG (Communicated by Mohammad Bagher Kashani) Abstract. In this paper, we introduce a new concept of volumes difference function of the projection and intersection bodies. Following this, we establish the Minkowski and Brunn-Minkowski inequalities for volumes difference function of the projection and intersection bodies. Keywords: Projection body, intersection body, volume difference, Minkowski inequality, Brunn-Minkowski inequality. MSC(2010): Primary: 52A40; Secondary: 52A Introduction The well-known classical Brunn-Minkowski inequality can be stated as follows: If K and L are convex bodies in R n, then (1.1) V (K + L) 1/n V (K) 1/n + V (L) 1/n, The Brunn-Minkowski inequality has in recent decades dramatically extended its influence in many areas of mathematics. Various applications have surfaced, for example, to probability and multivariate statistics, shape of crystals, geometric tomography, elliptic partial differential equations, and combinatorics (see 1, 5, 8 10, 19]). Several remarkable analogs have been established in other areas, such as potential theory and algebraic geometry (see 3,4,6,7,12,14,18,20 22]). Reverse forms of the inequality are important in the local theory of Banach spaces (see 19]). An elegant survey on this inequality is provided by Gardner (see 11]). In fact, a general version of the Brunn- Minkowski s inequality holds ( 11]): If K and L are convex bodies in R n and Article electronically published on June 15, Received: 15 March 2013, Accepted: 2 April Corresponding author. 581 c 2015 Iranian Mathematical Society
3 Volume difference inequalities for the projection and intersection bodies i n 1, then (1.2) W i (K + L) 1/(n i) W i (K) 1/(n i) + W i (L) 1/(n i), In 2004, the quermassintegral difference function was defined by Leng 13] as follows Dw i (K, D) = W i (K) W i (D), where K and D are convex bodies, D K, and 0 i n 1. Inequality 1.2 was extended to the quermassintegral difference of convex bodies as follows. Theorem A. K, L, and D be convex bodies in R n. If D K, and D is a homothetic copy of D, then (1.3) Dw i (K + L, D + D ) 1/(n i) Dw i (K, D) 1/(n i) + Dw i (L, D ) 1/(n i), with equality for 0 i < n 1 if and only if K and L are homothetic and (W i (K), W i (D)) = µ(w i (L), W i (D )), where µ is a constant.. In 2010, the dual quermassintegral difference function was defined by Lv 24] as follows D w i (K, D) = W i (K) W i (D), where K and D are star bodies and D K. Dual Brunn-Minkowski-type inequality for the dual quermassintegral difference was also established. Motivated by the work of Leng and Lv, we give the following definition: Definition 1.1. Let K be a convex body and D be a star body in R n, with D K, the mixed volumes difference function of ΠK and ID is defined for 0 i < n by (1.4) Dw i (ΠK, ID) = W i (ΠK) W i (ID). Taking i = 0 in 1.4, will change it to Dv (ΠK, ID) = V (ΠK) V (ID), which is called volume difference function of a projection body ΠK and an intersection body ID. In 1993, Lutwak established the Brunn-Minkowski inequality for mixed projection bodies as follows: Theorem B ( 15]) Let K and L be convex bodies in R n. If 0 j < n 2 and 0 i < n, then (1.5) W i (Π j (K + L)) 1/(n i)(n j 1) W i (Π j K) 1/(n i)(n j 1) + W i (Π j L) 1/(n i)(n j 1), The first aim of this paper is to establish the Brunn-Minkowski inequality for volume difference function of the mixed projection and the mixed intersection bodies.
4 583 Zhao and Cheung Theorem 1.2. Let K and L be convex bodies, and D and D be star bodies in R n. If D K, D L, 0 j < n 2 and 0 i < n 1, then (1.6) (W i (Π j (K + L)) W i (I j (D +D ))) 1/(n i)(n j 1) (W i (Π j K) W i (I j D)) 1/(n i)(n j 1) +(W i (Π j L) W i (I j D )) 1/(n i)(n j 1), with equality if and only if K and L are homothetic, D and D are dilates, and (W i (Π j K), W i (I j D)) = µ(w i (Π j L), W i (I j D )), where µ is a constant. Remark 1.3. Here, + is the radial Minkowski sum, Π j K denotes jth mixed projection bodies of a convex body K and I j D denotes jth mixed intersection bodies of a star body K (see Section 2). In case D and D are single points, 1.6 reduces to inequality 1.5. In 15], Lutwak established the Minkowski inequality for mixed projection bodies as follows. Theorem C ( 15]) Let K and L be convex bodies in R n. If 0 j < n 2 and 0 i < n, then (1.7) W i (Π j (K, L)) n 1 W i (ΠK) n j 1 W i (ΠL) j, The another aim of this paper is to establish the Minkowski inequality for volume difference function of the mixed projection and the mixed intersection bodies. Theorem 1.4. Let K and L be convex bodies, and D and D be star bodies in R n. If D K, D L, 0 j < n 2 and 0 i < n 1, then (1.8) (W i (Π j (K, L)) W i (I j (D, D ))) n 1 (W i (ΠK) W i (ID))) n j 1 (W i (ΠK) W i (ID))) j, with equality if and only if K and L are homothetic, D and D are dilates, and (W i (ΠK), W i (ID)) = µ(w i (ΠL), W i (ID )), where µ is a constant. Remark 1.5. In case D and D are single points, 1.8 reduces to inequality 1.7. We refer the reader to the next section for above interrelated notations, definitions and background materials. 2. Background materials The setting for this paper is the n-dimensional Euclidean space R n (n > 2). Let K n denote the set of convex bodies (compact, convex subsets with nonempty interiors) in R n. We reserve the letter u for unit vectors and the letter B for the unit ball centered at the origin. The boundary of B is S n 1. For u S n 1, let E u denote the hyperplane, through the origin, that is orthogonal
5 Volume difference inequalities for the projection and intersection bodies 584 to u. We will use K u to denote the image of K under an orthogonal projection onto the hyperplane E u. We use V (K) for the n-dimensional volume of convex body K. The support function of K K n, h(k, ), is defined on R n by h(k, ) = Max{x y : y K}. Let δ denote the Hausdorff metric on K n, namely, for K, L K n, δ(k, L) = h K h L, where denotes the sup-norm on the space of continuous functions C(S n 1 ). Associated with a compact subset K of R n, which is star-shaped with respect to the origin, is its radial function ρ(k, ) : S n 1 R defined for u S n 1, by ρ(k, u) = Max{λ 0 : λu K}. If ρ(k, ) is positive and continuous, K will be called a star body. Let S n denote the set of star bodies in R n Quermassintegral of convex body. For K 1,..., K r K n and λ 1,..., λ r 0, the volume of the Minkowski liner combination λ 1 K λ r K r is a homogeneous nth-degree polynomial in the λ i, (2.1) V (λ 1 K λ r K r ) = V i1,...,i n λ i1 λ in, where the sum is taken over all n-tuples (i 1,..., i n ) whose entries are positive integers not exceeding r. If we require the coefficients of the polynomial in 2.1 to be symmetric in their arguments, then they are uniquely determined. The coefficient V i1,...,i n is nonnegative and depends only on the bodies K i1,..., K in. It is written as V (K i1,..., K in ) and is called the mixed volume of K i1,..., K in. If K 1 = = K n i = K, K n i+1 = = K n = L, the mixed volume is written as V i (K, L). The mixed volume V i (K, B) is written as W i (K) and called the quermassintegral of a convex body K Dual quermassintegral of star body. We introduce a vector addition on R n, which we call radial addition, as follows. If x 1,..., x r R n, then x x r is defined to be the usual vector sum of x 1,..., x r, provided that x 1,..., x r all lie in a 1-dimensional subspace of R n, and as the zero vector otherwise. If K 1,..., K r S n and λ 1,..., λ r R, then the radial Minkowski linear combination, λ 1 K 1 + +λ r K r, is defined by λ 1 K 1 + +λ r K r = {λ 1 x λ r x r : x i K i }. It has the following important property that for K, L S n and λ, µ 0, (2.2) ρ(λk +µl, ) = λρ(k, ) + µρ(l, ) For K 1,..., K r S n and λ 1,..., λ r 0, the volume of the radial Minkowski liner combination λ 1 K λ r K r is a homogeneous nth-degree polynomial in the λ i, defined by (2.3) V (λ 1 K λ r K r ) = Ṽ i1,...,i n λ i1 λ in, where the sum is taken over all n-tuples (i 1,..., i n ) whose entries are positive integers not exceeding r. If we require the coefficients of the polynomial in 2.3 to
6 585 Zhao and Cheung be symmetric in their arguments, then they are uniquely determined. The coefficient Ṽi 1,...,i n is nonnegative and depends only on the bodies K i1,..., K in. It is written as Ṽ (K i 1,..., K in ) and is called the dual mixed volume of K i1,..., K in. If K 1 = = K n i = K, K n i+1 = = K n = L, the dual mixed volumes is written as Ṽi(K, L). The dual mixed volumes Ṽi(K, B) is written as W i (K) and called as the dual quermassintegral of the star body K Mixed projection bodies. If K 1,..., K r K n and λ 1,..., λ r 0, then the projection body of the Minkowski linear combination λ 1 K λ r K r K n can be written as a symmetric homogeneous polynomial of degree (n 1) in the λ i ( 15]): (2.4) Π(λ 1 K λ r K r ) = λ i1... λ in 1 Π i1 i n 1 where the sum is a Minkowski sum taken over all (n 1)-tuples (i 1,..., i n 1 ) of positive integers not exceeding r. The body Π i1...i n 1 depends only on the bodies K i1,..., K in 1, and is uniquely determined by (2.3.1), it is called the mixed projection bodies of K i1,..., K in 1, and is written as Π(K i1,..., K in 1 ). If K 1 = = K n 1 i = K and K n i = = K n 1 = L, then Π(K i1,..., K in 1 ) will be written as Π i (K, L). If L = B, then Π i (K, L) is denoted by Π i K and when i = 0, Π i K is denoted by ΠK, where ΠK is the projection body of K (see 15]) Mixed intersection bodies. For K S n, there is a unique star body IK whose radial function satisfies for u S n 1, (2.5) ρ(ik, u) = v(k E u ). It is called the intersection bodies of K. From a result of Busemann, it follows that IK is convex if K is convex and origin symmetric. Clearly any intersection body is centred. The volume of intersection bodies is given by V (IK) = 1 v(k E u ) n ds(u). n S n 1 The mixed intersection bodies of K 1,..., K n 1 S n, I(K 1,..., K n 1 ), whose radial function is defined by (2.6) ρ(i(k 1,..., K n 1 ), u) = ṽ(k 1 E u,..., K n 1 E u ), where ṽ is the (n 1)-dimensional dual mixed volume. If K 1 = = K n i 1 = K, K n i = = K n 1 = L, then I(K 1,..., K n 1 ) is written as I i (K, L). If L = B, then I i (K, L) is written I i K and is called the ith intersection body of K. For I 0 K simply write IK.
7 Volume difference inequalities for the projection and intersection bodies Main results Theorem 3.1. Let K and L be convex bodies, and D and D be star bodies in R n. If D K, D L, 0 j < n 2 and 0 i < n 1, then (3.1) Dw i (Π j (K + L), I j (D +D )) 1/(n i)(n j 1) Dw i (Π j K, I j D) 1/(n i)(n j 1) + Dw i (Π j L, I j D ) 1/(n i)(n j 1), with equality if and only if K and L are homothetic, D and D are dilates, and (W i (Π j K), W i (I j D)) = µ(w i (Π j L), W i (I j D )), where µ is a constant. We need the following lemmas to prove Theorem 3.1. Lemma 3.2 ( 9]). If K is a convex body in R n with o intk, then (3.2) IK ΠK. Lemma 3.3 ( 16]). If K is a convex body in R n with o intk, then (3.3) W i (K) W i (K), with equality if and only if K is a n-ball. Lemma 3.4. (see 2]) Let for x i in the region R defined by Then for x, y R n, we have ϕ(x) = (x p 1 xp 2 xp n) 1/p, p > 1, (a) x i 0, (b) x 1 (x p 2 + xp xp n) 1/p. (3.4) ϕ(x + y) ϕ(x) + ϕ(y), with equality if and only if x = µy where µ is a constant. Proof of Theorem 3.1. If K, L K n, 0 j < n 2 and 0 i < n, then (3.5) W i (Π j (K + L)) 1/(n i)(n j 1) (3.6) W i (Π j K) 1/(n i)(n j 1) + W i (Π j L) 1/(n i)(n j 1), Moreover, in view of the following inequality (see 23]), if D, D S n, 0 j < n 2 and 0 i < n, then (3.7) (3.8) W i (I j (D +D )) 1/(n i)(n j 1) W i (I j D) 1/(n i)(n j 1) + W i (I j D ) 1/(n i)(n j 1), with equality if and only if D and D are dilates. From 3.5 and 3.7, we have
8 587 Zhao and Cheung (3.9) (3.10) (3.11) W i (Π j (K + L)) W i (I j (D +D )) W i (Π j K) 1/(n i)(n j 1) + W i (Π j L) 1/(n i)(n j 1)] (n i)(n j 1) Wi (I j D) 1/(n i)(n j 1) + W i (I j D ) 1/(n i)(n j 1)] (n i)(n j 1), with equality if and only if K and L are homothetic, and D and D are dilates. From Lemma 3.1 and 3.2, we have W i (Π j (K + L)) W i (Π j (K + L)) W i (I j (D +D )), W i (Π j K) W i (Π j K) W i (I j D), and W i (Π j L) W i (Π j L) W i (I j D ). By using Lemma 3.3, we have W i (Π j (K + L)) W ] 1/(n i)(n j 1) i (I j (D +D )) { W i (Π j K) 1/(n i)(n j 1) + W i (Π j L) 1/(n i)(n j 1)] (n i)(n j 1) Wi (I j D) 1/(n i)(n j 1) + W i (I j D ) 1/(n i)(n j 1)] } (n i)(n j 1) 1/(n i)(n j 1) (W i (Π j K) W i (I j D)) 1/(n i)(n j 1) +(W i (Π j L) W i (I j D )) 1/(n i)(n j 1). In view of the equality conditions of 3.9 and Lemma 3.3, it follows that this equality holds if and only if K and L are homothetic, D and D are dilates, and (W i (Π j K), W i (I j D)) = µ(w i (Π j L), W i (I j D )), where µ is a constant. Taking i = 0, j = 0 in 3.1, 3.1 reduces to (3.12) (3.13) Dv (Π(K + L), I(D +D )) 1/n(n 1) Dv (ΠK, ID) 1/n(n 1) + Dv (ΠL, ID ) 1/n(n 1), with equality if and only if K and L are homothetic, D and D are dilates, and (V (ΠK), V (ID)) = µ(v (ΠL), V (ID )), where µ is a constant. In case D and D are single points, 3.12 reduces to the classical Brunn- Minkowski inequality for mixed projection bodies. Theorem 3.5. Let K and L be convex bodies, and D and D be star bodies in R n. If D K, D L, 0 j < n 2 and 0 i < n 1, then (3.14) Dw i (Π j (K, L), I j (D, D )) n 1 Dw i (ΠK, ID) n j 1 Dw i (ΠL, ID ) j, with equality if and only if K and L are homothetic, D and D are dilates and (W i (ΠK), W i (ID)) = µ(w i (ΠL), W i (ID )), where µ is a constant. We need the following lemmas to prove Theorem 3.2.
9 Volume difference inequalities for the projection and intersection bodies 588 Lemma 3.6 ( 24]). If K, L S n, 0 i < n and 0 j < n 1, then W i (I j (K, L)) n 1 W i (IK) n j 1 Wi (IL) j, with equality if and only if K and L are dilates. Lemma 3.7 ( 25]). Let a, b, c, d 0, 0 < α < 1, 0 < β < 1 and α + β = 1. If a b and c d, then (3.15) a α c β b α d β (a b) α (c d) β, with equality if and only if ad = bc. Proof of Theorem 3.2. If K, L K n, then (3.16) W i (Π j (K, L)) n 1 W i (ΠK) n j 1 W i (ΠL) j, If D, D S n, then (3.17) Wi (I j (D, D )) n 1 W i (ID) n j 1 Wi (ID ) j, with equality if and only if D and D are dilates. From 3.16 and 3.17, we have (3.18) W i (Π j (K, L)) W i (I j (D, D )) W i (ΠK) (n j 1)/(n 1) W i (ΠL) j/(n 1) W i (ID) (n j 1)/(n 1) Wi (ID ) j/(n 1), with equality if and only if K and L are homothetic, and D and D are dilates Notice that W i (Π j (K, L)) W i (I j (D, D )), W i (ΠK) W i (ID), and W i (ΠL) W i (ID ). By using Lemma 3.5, we have W i (Π j (K, L)) W ] n 1 i (I j (D, D )) W i (ΠK) (n j 1)/(n 1) W i (ΠL) j/(n 1) W i (ID) (n j 1)/(n 1) Wi (ID ) j/(n 1) ] n 1 W i (ΠK) W ] n j 1 i (ID) W i (ΠL) W j i (ID )]. In view of the equality conditions of 3.18 and Lemma 3.5, it follows that this equality holds if and only if K and L are homothetic, D and D are dilates, and (W i (ΠK), W i (ID)) = µ(w i (ΠL), W i (ID )), where µ is a constant.
10 589 Zhao and Cheung Taking i = 0, j = 1 in the inequality 3.14, 3.14 changes to the following result: (3.19) Dv (Π 1 (K, L), I 1 (D, D )) n 1 Dv (ΠK, ID) n 2 Dv (ΠL, ID ), with equality if and only if K and L are homothetic, D and D are dilates, and (V (ΠK), V (ID)) = µ(v (ΠL), V (ID )), where µ is a constant. In case D and D are single points, 3.19 reduces to the classical Minkowski inequality for mixed projection bodies. Acknowledgments The first author s research is supported by Natural Science Foundation of China ( ). The second author s research is partially supported by a HKU Seed Grant for Basic Research. The authors express their grateful thanks to the referee for very good suggestions and comments. References 1] I. J. Bakelman, Convex Analysis and Nonlinear Geometric Elliptic Equations, Springer- Verlag, Berlin, ] E. F. Beckenbach, R. Bellman, Inequalities, 2nd edition, Springer-Verlag, New York, Inc ] C. Borell, The Brunn-Minkowski inequality in Gauss space, Invent. Math. 30 (1975), no. 2, ] C. Borell, Capacitary inequalities of the Brunn-Minkowski type, Math. Ann. 263 (1983), no. 2, ] Y. D. Burago and V. A. Zalgaller, Geometric Inequalities, Springer-Verlag, New York, ] L. A. Caffarelli, D. Jerison and E. Lieb, On the case of equality in the Brunn-Minkowski inequality for capacity, Adv. Math. 117 (1996), no. 2, ] G. Ewald, Combinatorial Convexity and Algebraic Geometry, Springer-Verlag, New York, ] W. J. Firey, p-means of convex bodies, Math. Scand. 10 (1962) ] R. J. Gardner, Geometric Tomography, Cambridge University Press, Cambridge, ] R. J. Gardner and P. Gronchi, A Brunn-Minkowski inequality for the integer lattice, Trans. Amer. Math. Soc. 353 (2001), no. 10, ] R. J. Gardner, The Brunn-Minkowski inequality, Bull. Amer. Math. Soc. 39 (2002), no. 3, ] D. Jerison, A Minkowski problem for electrostatic capacity, Acta Math. 176 (1996), no. 1, ] G. S. Leng, The Brunn-Minkowski inequality for volume difference, Adv. Appl. Math. 32 (2004), no. 3, ] E. Lutwak, The Brunn-Minkowski-Firey theory I: Mixed volumes and the Minkowski problem, J. Differential Geom. 38 (1993), no. 1, ] E. Lutwak, Inequalities for mixed projection bodies, Trans. Amer. Math. Soc. 339 (1993), no. 2, ] E. Lutwak, Dual mixed volume, Pacific J. Math. 58 (1975), no. 2, ] S. Lv, Dual Brunn-Minkowski inequality for volume differences, Geom. Dedicata 145 (2010) ] A. Okounkov, Brunn-Minkowski inequality for multiplicities, Invent Math. 125 (1996), no. 3,
11 Volume difference inequalities for the projection and intersection bodies ] R. Schneider, Convex Bodies, The Brunn-Minkowski Theory, Cambridge University Press, Cambridge, ] R. Schneider and W. Weil, Zonoids and Related Topics, Convexity and its Applications, , Birkhäuser, Basel, ] W. Süss, Zusummensetzung von Eikörpen und homothetische Eiflächen, Tôhoku. Math. J. 35 (1932) ] G. Y. Zhang, The affine Sobolev inequality, J. Differential Geom. 53 (1999), no. 1, ] C. J. Zhao, G. Leng, Brunn-Minkowski inequality for mixed intersection bodies, J. Math. Anal. Appl. 301 (2005), no. 1, ] C. J. Zhao, G. Leng, Inequalities for dual quermassintegrals of mixed intersection bodies, Proc. Indian Acad. Sci. 115 (2005), no. 1, ] C. J. Zhao, On polars of Blaschke-Minkowski homomorphisms, Math. Scand. 111 (2013), no. 1, (Chang-Jian Zhao) Department of Mathematics, China Jiliang University, Hangzhou, , China address: (Wing-Sum Cheung) Department of Mathematics, The University of Hong Kong, Pokfulam Road, Hong Kong address:
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