This seems like a job for Kendall's distance (also known, sometimes, as the Bubble-sort distance). It is probably the most commonly used metric to measure distance in ranking space.
The Kendall distance counts the number of times that two sequences differ in their ordering of the items in two indices. In the case that one of the sequences is the trivial sequence (1, 2, ..., n), we can measure the distance simply by counting the number of times that i < j and pi(i) > pi(j).
If you like this metric (it is equivalent to the minimum number of pairwise transpositions of adjacent items you would have to complete to transform one sequence into 1:n), you can find it in my package, RMallow, available on CRAN. The function is called AllSeqDists. Here is an example:
# Create a matrix of sequences, each of length 5
datas <- matrix(c(1:5, 5:1, c(2, 1, 3, 4, 5), c(5, 1, 2, 3, 4), c(1, 2, 4, 5, 6), c(1, 5, 6, 2, 4)), nrow = 6, byrow = TRUE)
# Calculate all of their Kendall distances to the sequence (1, 2, 3, 4, 5)
datas <- SimplifySequences(datas)
dists <- AllSeqDists(datas)
You might also consider Spearman's metric.
Also, there are a class of models on ranking data that I must plug called "Mallows models", depending on what you want to do.