4.3. LOCALLY QUASICONFORMAL MAPPINGS 65for locally quasiconformal mappings. It turns out t hat the BMO (bounded mean
oscillation) norm of the Jacobian J1 of a locally quasiconformal mapping f is a
natural counterpart for each of the above quantities.
Suppose that u is a function locally integra ble in a domain D C R^2. Then t he
BMO-norm of u in Dis given by(4.3.1) llullsMO(D) =sup (lB) ( lu - UB 0 l dm
Bo m 0 }Bowhere the supremum is taken over all disks Bo with Bo c D and
UBo = m(~o) l o udm.
The following observation suggests how this norm is related to the hyperbolic
metric.
LEMMA 4.3.2. If Bo is a disk in D with center z 0 , thenm(~o) l
0hD(z, zo) dm '.'::: 2.PROOF. The left-hand side of the above inequ ality is invariant with respect to
similarity mappings. Hence we may assume that B 0 is the unit disk B. Then
L hD(z, O)dm '.'::: L hB(z, O)dm = L log(~~::: )dm
= fo2
~ (fo1
logC ~ ~) tdt) dB[
t^2 - 1 (l+t)]t=l
= 27r t + --log --=- = 2m(B).
2 1 t t=O
0With Lemma 4.3.2 we are able to derive the following useful estimate for the
BMO norm of a harmonic function.
LEMMA 4.3.3. If u is harmonic in D c R^2 , th en
~ llullsMO(D) '.':::sup !grad u(z)I PD
1
(z) '.'::: 6llullsMO(D)
2 zED
where PD is the density of the hyperbolic metric hD.
PROOF. Choose a disk Bo = B (z 0 , d) with Bo C D. Then since u is harmonic
in D , u( zo) = UB 0 and it suffices to prove that
(4.3.4) !grad u(zo)I PD(zo)-
1
'.'::: m(~o) l
0lu(z) - u(zo)I dmand( 4.3.5) _ (l ) r /u(z) - u(zo)ldm::::; 2 sup lgrad u(z)I PD(z)-^1.
m Bo }Bo zED
By performing a change of variable we may assume that zo = 0.
For (4.3.4) fix 0 < r < d and letf(z ) = J_ { 2 ~ re•;+ z u(rei&) dB.
27r } 0 re' - z