A scalar patch forms spiral structure when it wraps around an isolated
vortex. It is shown that this wind-up process leads to accelerated di
ffusion during a time range T-S < t < T-D. The lower limit T-S is the
time needed to create a well-defined spiral, and the upper limit T-D i
s the diffusive time scale of the scalar field theta in the vortex. Wh
ereas the scaling T-D similar to Pe(1/3) is independent of the particu
lar spiral topology, the accelerated decay of the scalar variance <(th
eta(2))over bar>(t) for earlier times is directly linked to the space-
filling property of the spiral and is found to scale as <(theta(2))ove
r bar>(0)-<(theta(2))over bar>(t) similar to (Pe(-1/3)t)(3(1-DK')). D-
K' is the Kolmogorov capacity of the spiral; it is defined in the rang
e 1/2 < D-K' < 1 and it is the most suitable measure of the spiral's s
pace-filling property.