Few Sequence Pairs Suffice: Representing All Rectangle Placements

Abstract

We consider representations of general non-overlapping placements of rectangles by spatial relations (west, south, east, north) of pairs of rectangles. We call a set of representations complete if it contains a representation of every placement of n rectangles. We prove a new upper bound of O(n!n6 · (11+5 52)n) and a new lower bound of (n!n4 · (4 + 2 2)n) on the minimum cardinality of complete sets of representations. A key concept in the proofs of these results are pattern-avoiding permutations. The new upper bound directly improves upon the well-known sequence pair representation, which has size (n!)2, by only considering a restricted set of sequence pairs. It implies theoretically faster algorithms for VLSI placement problems.