A291636 Matula-Goebel numbers of lone-child-avoiding rooted trees.
1, 4, 8, 14, 16, 28, 32, 38, 49, 56, 64, 76, 86, 98, 106, 112, 128, 133, 152, 172, 196, 212, 214, 224, 256, 262, 266, 301, 304, 326, 343, 344, 361, 371, 392, 424, 428, 448, 454, 512, 524, 526, 532, 602, 608, 622, 652, 686, 688, 722, 742, 749, 766, 784, 817
Offset: 1
Keywords
Examples
The sequence of all lone-child-avoiding rooted trees together with their Matula-Goebel numbers begins:
1: o
4: (oo)
8: (ooo)
14: (o(oo))
16: (oooo)
28: (oo(oo))
32: (ooooo)
38: (o(ooo))
49: ((oo)(oo))
56: (ooo(oo))
64: (oooooo)
76: (oo(ooo))
86: (o(o(oo)))
98: (o(oo)(oo))
106: (o(oooo))
112: (oooo(oo))
128: (ooooooo)
133: ((oo)(ooo))
152: (ooo(ooo))
172: (oo(o(oo)))
Links
- David Callan, A sign-reversing involution to count labeled lone-child-avoiding trees, arXiv:1406.7784 [math.CO], (30-June-2014).
- Gus Wiseman, Sequences counting series-reduced and lone-child-avoiding trees by number of vertices.
- Index entries for sequences related to Matula-Goebel numbers
Crossrefs
These trees are counted by A001678.
The case with more than two branches is A331490.
Unlabeled rooted trees are counted by A000081.
Topologically series-reduced rooted trees are counted by A001679.
Labeled lone-child-avoiding rooted trees are counted by A060356.
Labeled lone-child-avoiding unrooted trees are counted by A108919.
MG numbers of singleton-reduced rooted trees are A330943.
MG numbers of topologically series-reduced rooted trees are A331489.
Programs
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Mathematica
nn=2000; primeMS[n_]:=If[n===1,{},Flatten[Cases[FactorInteger[n],{p_,k_}:>Table[PrimePi[p],{k}]]]]; srQ[n_]:=Or[n===1,With[{m=primeMS[n]},And[Length[m]>1,And@@srQ/@m]]]; Select[Range[nn],srQ]
Extensions
Updated with corrected terminology by Gus Wiseman, Jan 20 2020
Comments