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URL: https://oeis.org/A163619

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A163619
Let q(p) be the smallest prime greater than the prime p. A positive integer n is included in this sequence if n+1 is divisible by q(p) for each prime p dividing n.
1
2, 8, 9, 20, 32, 98, 125, 128, 169, 464, 512, 729, 961, 1280, 2048, 2108, 5252, 8000, 8192, 9728, 15872, 16807, 18176, 22385, 32768, 36992, 50000, 53792, 59049, 78821, 81920, 97556, 98125, 100352, 124659, 131072, 195129, 219488, 223040, 307328
OFFSET
1,1
COMMENTS
All terms of this sequence are in sequence A073606.
From Robert Israel, Dec 01 2024: (Start)
If k is a term, then so is k^j for all odd j.
If A226295(k) is even, then prime(k)^(A226295(k)/2) is a term. (End)
EXAMPLE
20 is divisible by the primes 2 and 5. q(2) = 3, and q(5)=7. 20+1 = 21 is divisible by both 3 and 7, so 20 is in this sequence.
MAPLE
filter:= n ->
andmap(p -> n+1 mod nextprime(p) = 0, numtheory:-factorset(n)):
select(filter, [$2..4*10^5]); # Robert Israel, Dec 01 2024
MATHEMATICA
depQ[n_]:=With[{c=NextPrime[FactorInteger[n][[;; , 1]]]}, AllTrue[(n+1)/c, IntegerQ]]; Select[Range[ 2, 350000], depQ] (* Harvey P. Dale, Jun 10 2023 *)
CROSSREFS
Sequence in context: A073413 A046681 A259672 * A166968 A075644 A088825
KEYWORD
nonn
AUTHOR
Leroy Quet, Aug 01 2009
EXTENSIONS
More terms from Sean A. Irvine, Oct 04 2009
STATUS
approved