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I want to count the number $N(n,A)$ of closed walks of length $2n$ on the square $2d$ lattice enclosing a signed area of $A$. These numbers refine $\sum_A N(n,A) = \left(\begin{array}{c}2n\\n\end{array}\right)^2.$ For example $N(2,-1) = 4, N(2,0) = 28, N(2,1) = 4.$ Any help?