Let {A(t)}(-infinity<t<infinity) be Levy's stochastic area process and assume {W(t)}(t greater than or equal to 0) is an independent Brownian motion. Then we prove the following local law of the iterated logarithm for the composed process {A(W(t))}(t greater than or equal to 0):
limsup(t-0) A(W(t))/t(1/2)(log log(1/t))(3/2) = (2/3)(3/2)/pi.