A054807 -id:A054807

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A054804

First term of strong prime quartets: prime(m+1)-prime(m) > prime(m+2)-prime(m+1) > prime(m+3)-prime(m+2).

+10
27

31, 61, 89, 211, 271, 293, 449, 467, 607, 619, 709, 743, 839, 863, 919, 1069, 1291, 1409, 1439, 1459, 1531, 1637, 1657, 1669, 1723, 1759, 1777, 1831, 1847, 1861, 1979, 1987, 2039, 2131, 2311, 2357, 2371, 2447, 2459, 2477, 2503, 2521, 2557, 2593, 2633

(list; graph; refs; listen; history; text; internal format)

OFFSET

1,1

COMMENTS

Primes preceding the first member of pairs of consecutive primes in A051634 ("strong primes"), see example. (A051634 lists the middle member of the triplets, here we list the first member of the quadruplets.) - M. F. Hasler, Oct 27 2018, corrected thanks to Gus Wiseman, Jun 01 2020.

LINKS

Robert Israel, Table of n, a(n) for n = 1..10000

FORMULA

a(n) = prime(A335278(n)). - Gus Wiseman, May 31 2020

EXAMPLE

The first 10 strictly decreasing prime gap quartets:

31 37 41 43

61 67 71 73

89 97 101 103

211 223 227 229

271 277 281 283

293 307 311 313

449 457 461 463

467 479 487 491

607 613 617 619

619 631 641 643

For example, the primes (211,223,227,229) have differences (12,4,2), which are strictly decreasing, so 211 is in the sequence.

The second and third term of each quadruplet are consecutive terms in A051634: this is a characteristic property of this sequence. - M. F. Hasler, Jun 01 2020

MAPLE

primes:= select(isprime, [seq(i, i=3..10000, 2)]):

L:= primes[2..-1]-primes[1..-2]:

primes[select(t -> L[t+2] < L[t+1] and L[t+1] < L[t], [$1..nops(L)-2])]; # Robert Israel, Jun 28 2018

MATHEMATICA

ReplaceList[Array[Prime, 100], {___, x_, y_, z_, t_, ___}/; y-x>z-y>t-z:>x] (* Gus Wiseman, May 31 2020 *)

Select[Partition[Prime[Range[400]], 4, 1], Max[Differences[#, 2]]<0&][[All, 1]] (* Harvey P. Dale, Jan 12 2023 *)

CROSSREFS

Cf. A051634, A054800-A054840.

Prime gaps are A001223.

Second prime gaps are A036263.

All of the following use prime indices rather than the primes themselves:

- Strictly decreasing prime gap quartets are A335278.

- Strictly increasing prime gap quartets are A335277.

- Equal prime gap quartets are A090832.

- Weakly increasing prime gap quartets are A333383.

- Weakly decreasing prime gap quartets are A333488.

- Unequal prime gap quartets are A333490.

- Partially unequal prime gap quartets are A333491.

- Adjacent equal prime gaps are A064113.

- Strict ascents in prime gaps are A258025.

- Strict descents in prime gaps are A258026.

- Adjacent unequal prime gaps are A333214.

- Weak ascents in prime gaps are A333230.

- Weak descents in prime gaps are A333231.

Maximal weakly increasing intervals of prime gaps are A333215.

Maximal strictly decreasing intervals of prime gaps are A333252.

Cf. also A000040, A006560, A031217, A054800, A054805, A054806, A054807, A059044, A084758, A089180, A333253, A335278.

KEYWORD

nonn

AUTHOR

Henry Bottomley, Apr 10 2000

STATUS

approved

A054806

Third term of strong prime quartets: prime(m+1)-prime(m) > prime(m+2)-prime(m+1) > prime(m+3)-prime(m+2).

+10
4

41, 71, 101, 227, 281, 311, 461, 487, 617, 641, 727, 757, 857, 881, 937, 1091, 1301, 1427, 1451, 1481, 1549, 1663, 1667, 1697, 1741, 1783, 1787, 1861, 1867, 1871, 1993, 1997, 2063, 2141, 2339, 2377, 2381, 2467, 2473, 2521, 2531, 2539, 2591, 2617, 2657

(list; graph; refs; listen; history; text; internal format)

OFFSET

1,1

LINKS

M. F. Hasler, Table of n, a(n) for n = 1..10000, Oct 27 2018

FORMULA

a(n) = nextprime(A054805(n)) = prevprime(A054807(n)), nextprime = A151800, prevprime = A151799. - M. F. Hasler, Oct 27 2018

MATHEMATICA

Select[Partition[Prime[Range[400]], 4, 1], Max[Differences[#, 2]]<0&][[All, 3]] (* Harvey P. Dale, Aug 28 2021 *)

CROSSREFS

Cf. A051634, A051635; A054800 .. A054803: members of balanced prime quartets (= 4 consecutive primes in arithmetic progression); A054804 .. A054818: members of strong prime quartet, quintet, sextet; A054819 .. A054840: members of weak prime quartet, quintet, sextet, septets.

KEYWORD

nonn

AUTHOR

Henry Bottomley, Apr 10 2000

EXTENSIONS

Offset corrected to 1 by M. F. Hasler, Oct 27 2018

Definition clarified by N. J. A. Sloane, Aug 28 2021

STATUS

approved

A054811

Fourth term of strong prime quintets: p(m-2)-p(m-3) > p(m-1)-p(m-2) > p(m)-p(m-1) > p(m+1)-p(m).

+10
2

1667, 1787, 1867, 1871, 1997, 2381, 2473, 2531, 2539, 3457, 3461, 4217, 4517, 5279, 5417, 5441, 6043, 6659, 7243, 7307, 7757, 7877, 7933, 8167, 8521, 9613, 9619, 11057, 11393, 11593, 11831, 12409, 13877, 14827, 15137, 15551, 16061, 16333

(list; graph; refs; listen; history; text; internal format)

OFFSET

1,1

COMMENTS

First member of pairs of consecutive primes in A054807 (4th of strong prime quartets). - M. F. Hasler, Oct 27 2018

LINKS

M. F. Hasler, Table of n, a(n) for n = 1..2000, Oct 27 2018

FORMULA

a(n) = nextprime(A054810(n)) = prevprime(A054812(n)), nextprime = A151800, prevprime = A151799; A054811 = {m = A054807(n) | nextprime(m) = A054807(n+1)}. - M. F. Hasler, Oct 27 2018

CROSSREFS

Cf. A051634, A051635; A054800 .. A054803: members of balanced prime quartets (= 4 consecutive primes in arithmetic progression); A054804 .. A054818: members of strong prime quartets, quintets, sextets; A054819 .. A054840: members of weak prime quartets, quintets, sextets, septets.

KEYWORD

nonn

AUTHOR

Henry Bottomley, Apr 10 2000

STATUS

approved

A054812

Fifth term of strong prime quintets: p(m-3)-p(m-4) > p(m-2)-p(m-3) > p(m-1)-p(m-2) > p(m)-p(m-1).

+10
2

1669, 1789, 1871, 1873, 1999, 2383, 2477, 2539, 2543, 3461, 3463, 4219, 4519, 5281, 5419, 5443, 6047, 6661, 7247, 7309, 7759, 7879, 7937, 8171, 8527, 9619, 9623, 11059, 11399, 11597, 11833, 12413, 13879, 14831, 15139, 15559, 16063, 16339

(list; graph; refs; listen; history; text; internal format)

OFFSET

1,1

COMMENTS

Second member of pairs of consecutive primes in A054807 (4th term of strong prime quartets). - M. F. Hasler, Oct 27 2018

LINKS

Harvey P. Dale, Table of n, a(n) for n = 1..1000

FORMULA

a(n) = nextprime(A054811(n)); A054811 = {m = A054807(n) | prevprime(m) = A054807(n-1)}; nextprime = A151800, prevprime = A151799. - M. F. Hasler, Oct 27 2018

MATHEMATICA

spqQ[c_]:=Module[{d=Differences[c]}, d[[1]]>d[[2]]>d[[3]]>d[[4]]]; Transpose[ Select[Partition[Prime[Range[2000]], 5, 1], spqQ]][[5]] (* Harvey P. Dale, Jan 01 2013 *)

CROSSREFS

Cf. A051634, A051635; A054800 .. A054803: members of balanced prime quartets (= 4 consecutive primes in arithmetic progression); A054804 .. A054818: members of strong prime quartets, quintets, sextets; A054819 .. A054840: members of weak prime quartets, quintets, sextets, septets.

KEYWORD

nonn

AUTHOR

Henry Bottomley, Apr 10 2000

STATUS

approved

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