Abstract |
|
We estimate the Hausdorff measure and
dimension of Cantor sets in terms of a sequence given by the
lengths of the bounded complementary intervals. The results
provide the relation between the decay rate of this sequence and
the dimension of the associated Cantor set.
It is well-known that not every Cantor set on
the line is an s-set for some 0
≤ s ≤ 1.
However, if the sequence associated to the Cantor set
C is nonincreasing, we show that
C is an h-set for some continuous, concave dimension
function h. We construct the
function h from the sequence
associated to the set C.
|
Authors
|
Berkeley, California.