Define the n-omino graph to be the graph whose vertices are each of the n-ominoes, two of which are joined by an edge if one can be obtained from the other by cutting out one of the latter's component squares (thus obtaining an (n-1)-omino for most cases) and gluing it elsewhere. The sequence counts the edges in these graphs.
A098891
Define the n-omino graph to be the graph whose vertices are each of the n-ominoes, two of which are joined by an edge if one can be obtained from the other by cutting out one of the latter's component squares (thus obtaining an (n-1)-omino for most cases) and gluing it elsewhere. The sequence counts the edges in these graphs.
Terms
- a(0) =0a(1) =0a(2) =1a(3) =8a(4) =47a(5) =266a(6) =1339a(7) =6544a(8) =29837a(9) =133495a(10) =585002a(11) =2542563a(12) =10959656a(13) =47037733a(14) =201059520
External references
- oeis: A098891