Sharp Sobolev inequalities on the complex sphere

Abstract

This paper is devoted to establish a class of sharp Sobolev inequalities on the unit complex sphere as follows: 1) Case 0<d<Q=2n+2: for any f∈ C∞ and 2≤ q ≤ 2QQ-d, equation* \|f\|q2≤ 8(q-2)d(Q-d) 2((Q-d)/4+1) 2((Q+d)/4)( ∫S2n+1 fAdf d -2((Q+d)/4) 2((Q-d)/4) ∫S2n+1 |f|2 d) +∫S2n+1 |f|2 d; equation* 2) Case d=Q: for any f∈ C∞ and 2≤ q< +∞, equation* \|f\|q2≤ q-2(n+1)! ∫S2n+1 f A'Q f d +∫S2n+1 |f|2 d, equation* where Ad(0<d<Q) are the intertwining operator, A'Q is the conditional intertwinor introduced in BFM2013, and d is the normalized surface measure of S2n+1.