A Study on Hierarchical Floorplans of Order k

Abstract

A floorplan is a rectangular dissection which describes the relative placement of electronic modules on the chip. It is called a mosaic floorplan if there are no empty rooms or cross junctions in the rectangular dissection. We study a subclass of mosaic floorplans called hierarchical floorplans of order k (abbreviated HFO-k). A floorplan is HFO-k if it can be obtained by starting with a single rectangle and recursively embedding mosaic floorplans of at most k rooms inside the rooms of intermediate floorplans. When k=2 this is exactly the class of slicing floorplans as the only distinct floorplans with two rooms are a room with a vertical slice and a room with a horizontal slice respectdeively. And embedding such a room is equivalent to slicing the parent room vertically/horizontally. In this paper we characterize permutations corresponding to the Abe-labeling of HFO-k floorplans and also give an algorithm for identification of such permutations in linear time for any particular k. We give a recurrence relation for exact number of HFO-5 floorplans with n rooms which can be easily extended to any k also. Based on this recurrence we provide a polynomial time algorithm to generate the number of HFO-k floorplans with n rooms. Considering its application in VLSI design we also give moves on HFO-k family of permutations for combinatorial optimization using simulated annealing etc. We also explore some interesting properties of Baxter permutations which have a bijective correspondence with mosaic floorplans.