A274154 - cp's OEIS frontend

A274154 Number of integers in n-th generation of tree T(-3/2) defined in Comments.

1, 1, 1, 2, 2, 4, 5, 8, 12, 18, 27, 41, 60, 92, 134, 206, 305, 463, 694, 1041, 1561, 2344, 3506, 5279, 7903, 11877, 17823, 26689, 40100, 60041, 90217, 135312, 202940, 304555, 456295, 685209, 1027291, 1541669, 2312510, 3466919, 5203662, 7801283, 11707295, 17559032, 26334864

Offset: 0

Clark Kimberling, Jun 12 2016

Let T* be the infinite tree with root 0 generated by these rules: if p is in T*, then p+1 is in T* and x*p is in T*. Let g(n) be the set of nodes in the n-th generation, so that g(0) = {0}, g(1) = {1}, g(2) = {2,x}, g(3) = {3,2x,x+1,x^2}, etc. Let T(r) be the tree obtained by substituting r for x.

See A274142 for a guide to related sequences.

			For r = -3/2, we have g(3) = {3,2r,r+1, r^2}, in which the number of integers is a(3) = 2.

Kenny Lau, Table of n, a(n) for n = 0..72

Cf. A274142.

z = 18; t = Join[{{0}}, Expand[NestList[DeleteDuplicates[Flatten[Map[{# + 1, x*#} &, #], 1]] &, {1}, z]]];
u = Table[t[[k]] /. x -> -3/2, {k, 1, z}]; Table[
Count[Map[IntegerQ, u[[k]]], True], {k, 1, z}]

More terms from Kenny Lau, Jun 30 2017

cp's OEIS Frontend

A274154 Number of integers in n-th generation of tree T(-3/2) defined in Comments.

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