Proof of the Holevo--Utkin conjecture on sharp p norms for zero-sum vectors

Abstract

Let d 3 and p>0. Let \|x\|p denote the p (quasi-)norm of a d-dimensional vector x. Holevo and Utkin HU26 conjectured that for 0<p 1, \[ \\|x\|p\|x\|2:0≠ x∈ Rd,\ Σi=1d xi=0\ =21/p-1/2; \] for 1<p<2, \[ \\|x\|p\|x\|2:0≠ x∈ Rd,\ Σi=1d xi=0\ = \21/p-1/2,((d-1)p/2+(d-1)1-p/2dp/2)1/p\; \] and for 2<q<∞ \[ \\|x\|q\|x\|2:0≠ x∈ Rd,\ Σi=1d xi=0\ = \21/q-1/2,((d-1)q/2+(d-1)1-q/2dq/2)1/q\. \] They proved the d=3 case in HU26. In this paper, we confirm the conjecture of the remaining cases d 4.