A258421 Number of partitions of the 7-dimensional hypercube resulting from a sequence of n bisections, each of which splits any part perpendicular to any of the axes, such that each axis is used at least once.
2162160, 196756560, 10778727960, 463305056760, 17266750912320, 586609859314080, 18699578507549520, 569565504689176800, 16777853060738524020, 482011338862966969980, 13586929812483090607600, 377442353035435719228120, 10367784656620152180344310
Offset: 7
Keywords
Links
- Alois P. Heinz, Table of n, a(n) for n = 7..700
Crossrefs
Column k=7 of A255982.
Programs
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Maple
b:= proc(n, k, t) option remember; `if`(t=0, 1, `if`(t=1, A(n-1, k), add(A(j, k)*b(n-j-1, k, t-1), j=0..n-2))) end: A:= proc(n, k) option remember; `if`(n=0, 1, -add(binomial(k, j)*(-1)^j*b(n+1, k, 2^j), j=1..k)) end: T:= proc(n, k) option remember; add(A(n, k-i)*(-1)^i*binomial(k, i), i=0..k) end: a:= n-> T(n, 7): seq(a(n), n=7..25);