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Paper detail

Self-similar Dirichlet forms on polygon carpets

We construct symmetric self-similar diffusions with sub-Gaussian heat kernel estimates on two types of polygon carpets, which are natural generalizations of planner Sierpinski carpets (SC). The first ones are called perfect polygon carpets that are natural analogs of SC in that any intersection cells are either side-to-side or point-to-point. The second ones are called bordered polygon carpets which satisfy the boundary including condition as SC but allow distinct contraction ratios.

preprint2022arXivOpen access
Shiping CaoHua QiuYizhou Wang
math.DSmath.PRmath.FA
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Shiping CaoHua QiuYizhou Wang

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