Tessellation-valued processes that are generated by cell division

Abstract: Processes of random tessellations of the Euclidean space $\mathbb{R}^d$ , $d\geq 1$ , are considered that are generated by subsequent division of their cells. Such processes are characterized by the laws of the life times of the cells until their division and by the laws for the random hyperplanes that divide the cells at the end of their life times. The STIT (STable with respect to ITerations) tessellation processes are a reference model. In the presen… Show more

There is no perfect Mondrian partition for squares of side lengths less than 1001

There is no perfect Mondrian partition for squares of side lengths less than 1001

Parameter Optimization on a Tessellation Model for Crack Pattern Simulation