Add to ORKGA new kind of duality between intersection bodies and projection bodies is presented. Furthermore, some inequalities for mixed intersection bodies are established. A geometric inequality is derived between the volumes of star duality of star bodies and their associated mixed intersection integral.</p
AbstractIn this paper we prove that intersection bodies cannot be direct sums using Fourier analytic...
AbstractIntersection bodies were introduced in 1988 by Lutwak, who found a close connection between ...
In this paper, we generalize the dual Brunn-Minkowski inequality and monotonicity of intersection bo...
A new kind of duality between intersection bodies and projection bodies is presented. Furthermore, s...
A new kind of duality between intersection bodies and projection bodies is presented. Furthermore, s...
AbstractIn this paper, it is shown that a family of inequalities involving mixed intersection bodies...
The paper extends the two notions of the dual mixed volumes and L p-intersection body to q-dual mixe...
Abstract. In this paper, we first introduce a new concept of dual quermassintegral sum function of t...
AbstractIn this paper, it is shown that a family of inequalities involving mixed intersection bodies...
We introduce the notion of Lp-mixed intersection body (p < 1) and extend the classical notion dual m...
Abstract. In this paper, we introduce the mixed mean of star bodies and give geometric version of mi...
AbstractDual of the Brunn–Minkowski inequality for mixed projection bodies are established for mixed...
AbstractDual of the Brunn–Minkowski inequality for mixed projection bodies are established for mixed...
Analogs of the classical inequalities from the Brunn Minkowski Theory for rotation intertwining addi...
Abstract. The 1956 Busemann-Petty problem asks whether symmetric convex bodies with larger central h...
AbstractIn this paper we prove that intersection bodies cannot be direct sums using Fourier analytic...
AbstractIntersection bodies were introduced in 1988 by Lutwak, who found a close connection between ...
In this paper, we generalize the dual Brunn-Minkowski inequality and monotonicity of intersection bo...
A new kind of duality between intersection bodies and projection bodies is presented. Furthermore, s...
A new kind of duality between intersection bodies and projection bodies is presented. Furthermore, s...
AbstractIn this paper, it is shown that a family of inequalities involving mixed intersection bodies...
The paper extends the two notions of the dual mixed volumes and L p-intersection body to q-dual mixe...
Abstract. In this paper, we first introduce a new concept of dual quermassintegral sum function of t...
AbstractIn this paper, it is shown that a family of inequalities involving mixed intersection bodies...
We introduce the notion of Lp-mixed intersection body (p < 1) and extend the classical notion dual m...
Abstract. In this paper, we introduce the mixed mean of star bodies and give geometric version of mi...
AbstractDual of the Brunn–Minkowski inequality for mixed projection bodies are established for mixed...
AbstractDual of the Brunn–Minkowski inequality for mixed projection bodies are established for mixed...
Analogs of the classical inequalities from the Brunn Minkowski Theory for rotation intertwining addi...
Abstract. The 1956 Busemann-Petty problem asks whether symmetric convex bodies with larger central h...
AbstractIn this paper we prove that intersection bodies cannot be direct sums using Fourier analytic...
AbstractIntersection bodies were introduced in 1988 by Lutwak, who found a close connection between ...
In this paper, we generalize the dual Brunn-Minkowski inequality and monotonicity of intersection bo...