Distributional and \(L^q\) norm inequalities for polynomials over convex bodies in \(\mathbb{R}^n\) (Q5946652)

Let \(p: \mathbb{R}^n\to X\) be a vector-valued polynomial of degree \(d\) ranging in the Banach space \(X\). For a convex body \(K\subset \mathbb{R}^n\) of volume 1 set NEWLINE\[NEWLINE\|p^{\#}\|_q:= \Biggl(\int_K p^{\#}(x)^q dx\Biggr)^{1/q}:= \Biggl(\int_K\|p(x)\|^{q/d}_X dx\Biggr)^{1/q}.NEWLINE\]NEWLINE One of the main theorems states that for given \(0\leq r\leq q\leq\infty\) there is a numerical constant \(C>0\) such that NEWLINE\[NEWLINE\|p^{\#}\|_q\leq C{[nB(n,q+1)]^{1/q}\over [nB(n,r+ 1)]^{1/r}} \|p^{\#}\|_r.NEWLINE\]NEWLINE As consequences the authors derive the inequalities proved by Brudnyi and Ganzburg, Gromov and Milman, Bourgain, Bobkob, and Nazarov, Sodin and Volberg.