A seminorm-only characterization of analytic Besov spaces on the disc

Abstract

We introduce the space Ws,p(D) of analytic functions u on the unit disc such that the radial restrictions ur():=u(r) satisfy the Gagliardo seminorm-only bound \[ 0<r<1[ur]Ws,p(S1)<∞, \] with no a priori control of r\|ur\|Lp(S1). Our main result shows that this assumption already forces u∈ Hp(D) and that the radial boundary trace u* belongs to Ws,p(S1), with ur u* in Ws,p(S1) as r1-. The key mechanism combines the mean-value property (which pins the constant mode at u(0)) with a fractional Poincar\'e inequality on S1, recovering Lp control from oscillation alone. As a consequence, the trace map u u* is a surjective isomorphism Ws,p(D)Bsp,p,+(S1) with explicit norm equivalence.