Abstract
Some sharp bounds for the inner radius and the outer radius of the unit ball of a (normed or) Minkowski space with respect to its isoperimetrix are known. To find more such bounds is a challenging problem. Related to this motivation, we derive new sharp inequalities between inner and outer radii for the Holmes–Thompson and Busemann measures. Cross-section measures as well as the Blaschke–Santalo inequality will be used to obtain these new inequalities.
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