Weakly separated self-affine carpets

The Weak Separation Condition was introduced for self-similar Iterated Function Systems by Lau-Ngay and Zerner, which allows exact overlaps between the cylinders with the caveat that we can't have arbitrarily close overlapping but not exactly overlapping functions. Using this, the dimension of weakly separated self-similar sets can be determined. We further explore this condition by introducing it for self-affine carpets, and compute the Hausdorff and box-counting dimensions.