Abstract
The integer sequence π = π1 ‧‧‧ πn is said to be an inversion sequence if 0 ≤ πi ≤ i – 1 for all i. Let ℐn denote the set of inversion sequences of length n, represented using positive instead of non-negative integers. We consider here two new statistics defined on the bargraph representation b(π) of an inversion sequence π which record the number of unit squares touching the boundary of b(π) and that are either exterior or interior to b(π). We denote these statistics on ℐn recording the number of outer and inner perimeter squares respectively by oper and iper. In this paper, we study the distribution of oper and iper on ℐn and also on members of ℐn that end in a particular letter. We find explicit formulas for the maximum and minimum values of oper and iper achieved by a member of ℐn as well as for the average value of these parameters. We make use of both algebraic and combinatorial arguments in establishing our results.