A367584 Least number whose multiset multiplicity kernel (in which each prime exponent becomes the least prime factor with that exponent) is n. First position of n in A367580.
1, 2, 3, 6, 5, 12, 7, 30, 15, 20, 11, 90, 13, 28, 45, 210, 17, 60, 19, 150, 63, 44, 23, 630, 35, 52, 105, 252, 29, 360, 31, 2310, 99, 68, 175, 2100, 37, 76, 117, 1050, 41, 504, 43, 396, 525, 92, 47, 6930, 77, 140, 153, 468, 53, 420, 275, 1470, 171, 116, 59
Offset: 1
Keywords
Examples
The least number with multiset multiplicity kernel 9 is 15, so a(9) = 15.
The terms together with their prime indices begin:
1 -> 1: {}
2 -> 2: {1}
3 -> 3: {2}
4 -> 6: {1,2}
5 -> 5: {3}
6 -> 12: {1,1,2}
7 -> 7: {4}
8 -> 30: {1,2,3}
9 -> 15: {2,3}
10 -> 20: {1,1,3}
11 -> 11: {5}
12 -> 90: {1,2,2,3}
13 -> 13: {6}
14 -> 28: {1,1,4}
15 -> 45: {2,2,3}
16 ->210: {1,2,3,4}
Crossrefs
Positions of primes are A000040.
Positions of squarefree numbers are A000961.
All terms are rootless A007916.
Contains no nonprime prime powers A246547.
Positions of first appearances in A367580.
The sorted version is A367585.
The complement is A367768.
A007947 gives squarefree kernel.
A071625 counts distinct prime exponents.
Programs
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Mathematica
nn=1000; mmk[q_]:=With[{mts=Length/@Split[q]}, Sort[Table[Min@@Select[q,Count[q,#]==i&], {i,mts}]]]; spnm[y_]:=Max@@NestWhile[Most, Sort[y], Union[#]!=Range[Max@@#]&]; qq=Table[Times@@mmk[Join@@ConstantArray@@@FactorInteger[n]], {n,nn}]; Table[Position[qq,i][[1,1]], {i,spnm[qq]}]
Formula
a(p) = p for all primes p.
Comments