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Number of achiral orthoplex n-ominoes with cell centers determining n-3 space.
5

%I #6 Jul 26 2022 13:57:20

%S 3,10,46,215,1221,6384,31153,140320,596779,2416833,9417531,35541184,

%T 130684964,470159267,1660756778,5775367751,19816896743,67213026352,

%U 225673938496,751028439756,2479882044054,8131813096411

%N Number of achiral orthoplex n-ominoes with cell centers determining n-3 space.

%C Orthoplex polyominoes are connected sets of cells of regular tilings with Schläfli symbols {}, {4}, {3,4}, {3,3,4}, {3,3,3,4}, etc. These are tilings of regular orthoplexes projected on their circumspheres. Orthoplex polyominoes are equivalent to multidimensional polyominoes that do not extend more than two units along any axis, i.e., fit within a 2^d cube. This sequence is obtained using the first formula below. An achiral polyomino is identical to its reflection.

%F a(n) = A355048(n) - A355049(n) = 2*A355048(n) - A355047(n) = A355047(n) - 2*A355049(n).

%e a(6)=3 because there are 3 hexominoes in 2^3 space, all achiral. The two vacant cells share just a face, an edge, or a vertex.

%Y Cf. A355047 (oriented), A355048 (unoriented), A355049 (chiral), A355051 (asymmetric), A355055 (multidimensional).

%K nonn,easy

%O 6,1

%A _Robert A. Russell_, Jun 16 2022