I have defined a new permutation statistic that gives rise to an integer sequence. The construction starts from a graphical representation of permutations on an grid. For every odd position of a permutation , all cells in column from the first row up to row are shaded. For every even position , all cells in row from the first column down to column are shaded. A cell may therefore be shaded once or twice.
For a permutation , I define to be the number of doubly shaded cells. This produces a nonnegative integer associated with every permutation. I then define the total number of doubly shaded cells over all permutations of size . The first values of this sequence are
The sequence appears to have interesting combinatorial properties. For example, numerical computations suggest that is even for every . I am also interested in finding a closed formula, a recurrence relation, a generating function, asymptotic estimates, or a combinatorial interpretation. The statistic arises naturally from the graphical construction, but I have not found an equivalent description in the existing literature.
Question. Is or, equivalently, the permutation statistic genuinely new, or is it already known under another name in the mathematical literature?
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