A343002 -id:A343002 - cp's OEIS frontend

A343000 Discriminants of cyclic cubic fields.

49, 81, 169, 361, 961, 1369, 1849, 3721, 3969, 4489, 5329, 6241, 8281, 9409, 10609, 11881, 13689, 16129, 17689, 19321, 22801, 24649, 26569, 29241, 32761, 37249, 39601, 44521, 47089, 49729, 52441, 58081, 61009, 67081, 73441, 76729, 77841, 80089, 90601, 94249, 97969

Offset: 1

Jianing Song, Apr 02 2021

Square terms in A006832.
Numbers of the form k^2 where A160498(k) >= 2.
Each term k^2 is associated with A343003(k) cyclic cubic fields.
Let D be a discriminant of a cubic field F, then F is a cyclic cubic field if and only if D is a square. For D = k^2, k must be of the form (p_1)*(p_2)*...*(p_t) or 9*(p_1)*(p_2)*...*(p_{t-1}) with distinct primes p_i == 1 (mod 3), in which case there are exactly 2^(t-1) = 2^(omega(k)-1) (cyclic) cubic fields with discriminant D. See Page 17, Theorem 2.7 of the Ka Lun Wong link.

			49 = 7^2 is a term since it is the discriminant of the cyclic cubic field Q[x]/(x^3 - x^2 + x + 1).
81 = 9^2 is a term since it is the discriminant of the cyclic cubic field Q[x]/(x^3 - 3x - 1).

Jianing Song, Table of n, a(n) for n = 1..3200
LMFDB, Cubic fields
Wikipedia, Cubic field
Ka Lun Wong, Maximal Unramified Extensions of Cyclic Cubic Fields, (2011), Theses and Dissertations, 2781.

Discriminants and their square roots of cyclic cubic fields:
At least 1 associated cyclic cubic field: this sequence, A343001.
Exactly 1 associated cyclic cubic field: A343022, A002476 U {9}.
At least 2 associated cyclic cubic fields: A343024, A343025.
Exactly 2 associated cyclic cubic fields: A343002, A343003.
Cf. A006832, A160498, A343023.

isA343000(n) = if(issquare(n)&&n>1, my(k=sqrtint(n), L=factor(k), w=omega(k)); for(i=1, w, if(!((L[i, 1]%3==1 && L[i, 2]==1) || L[i, 1]^L[i, 2] == 9), return(0))); 1)

a(n) = A343001(n)^2.

A343001 Square roots of discriminants of cyclic cubic fields.

Original entry on oeis.org

7, 9, 13, 19, 31, 37, 43, 61, 63, 67, 73, 79, 91, 97, 103, 109, 117, 127, 133, 139, 151, 157, 163, 171, 181, 193, 199, 211, 217, 223, 229, 241, 247, 259, 271, 277, 279, 283, 301, 307, 313, 331, 333, 337, 349, 367, 373, 379, 387, 397, 403, 409, 421, 427

Offset: 1

Jianing Song, Apr 02 2021

Numbers k such that k^2 is in A006832.
Numbers k such that A160498(k) >= 2.
Each term k is associated with A343003(k) cyclic cubic fields.
Let D be a discriminant of a cubic field F, then F is a cyclic cubic field if and only if D is a square. For D = k^2, k must be of the form (p_1)*(p_2)*...*(p_t) or 9*(p_1)*(p_2)*...*(p_{t-1}) with distinct primes p_i == 1 (mod 3), in which case there are exactly 2^(t-1) = 2^(omega(k)-1) (cyclic) cubic fields with discriminant D. See Page 17, Theorem 2.7 of the Ka Lun Wong link.

			7 is a term since 7^2 = 49 is the discriminant of the cyclic cubic field Q[x]/(x^3 - x^2 - 2*x + 1).
9 is a term since 9^2 = 81 is the discriminant of the cyclic cubic field Q[x]/(x^3 - 3*x - 1).

Jianing Song, Table of n, a(n) for n = 1..3200
LMFDB, Cubic fields
Wikipedia, Cubic field
Ka Lun Wong, Maximal Unramified Extensions of Cyclic Cubic Fields, (2011), Theses and Dissertations, 2781.

Discriminants and their square roots of cyclic cubic fields:
At least 1 associated cyclic cubic field: A343000, this sequence.
Exactly 1 associated cyclic cubic field: A343022, A002476 U {9}.
At least 2 associated cyclic cubic fields: A343024, A343025.
Exactly 2 associated cyclic cubic fields: A343002, A343003.
Cf. A006832, A160498, A343023.

isA343001(n) = my(L=factor(n), w=omega(n)); for(i=1, w, if(!((L[i,1]%3==1 && L[i,2]==1) || L[i,1]^L[i,2] == 9), return(0))); (n>1)

a(n) = sqrt(A343001(n)).

A343022 Discriminants with exactly 1 associated cyclic cubic field.

Original entry on oeis.org

49, 81, 169, 361, 961, 1369, 1849, 3721, 4489, 5329, 6241, 9409, 10609, 11881, 16129, 19321, 22801, 24649, 26569, 32761, 37249, 39601, 44521, 49729, 52441, 58081, 73441, 76729, 80089, 94249, 97969, 109561, 113569, 121801, 134689, 139129, 143641, 157609, 167281, 177241

Offset: 1

Jianing Song, Apr 02 2021

A cubic field is cyclic if and only if its discriminant is a square. Hence all terms are squares.
Numbers of the form k^2 where A160498(k) = 2.
Numbers of the form k^2 where k is in A002476 U {9}. That is to say, numbers of the form k^2 where k = 9 or is a prime congruent to 1 modulo 3.
In general, there are exactly 2^(t-1) (cyclic) cubic fields with discriminant k^2 if and only if k is of the form (p_1)*(p_2)*...*(p_t) or 9*(p_1)*(p_2)*...*(p_{t-1}) with distinct primes p_i == 1 (mod 3), See A343000 for more detailed information.

			169 is a term since the one (and only one) cyclic cubic field with that discriminant is Q[x]/(x^3 - x^2 - 4x - 1).

Jianing Song, Table of n, a(n) for n = 1..10000
LMFDB, Cubic fields
Wikipedia, Cubic field

Discriminants and their square roots of cyclic cubic fields:
At least 1 associated cyclic cubic field: A343000, A343001.
Exactly 1 associated cyclic cubic field: this sequence, A002476 U {9}.
At least 2 associated cyclic cubic fields: A343024, A343025.
Exactly 2 associated cyclic cubic fields: A343002, A343003.
Cf. A006832, A160498, A343023.

isA343022(n) = if(issquare(n), my(k=sqrtint(n)); k==9 || (isprime(k) && k%3==1), 0)

a(n) = A002476(n-1)^2 for n >= 3.

A343003 Numbers k such that there are exactly 2 cyclic cubic fields with discriminant k^2.

Original entry on oeis.org

63, 91, 117, 133, 171, 217, 247, 259, 279, 301, 333, 387, 403, 427, 469, 481, 511, 549, 553, 559, 589, 603, 657, 679, 703, 711, 721, 763, 793, 817, 871, 873, 889, 927, 949, 973, 981, 1027, 1057, 1099, 1141, 1143, 1147, 1159, 1251, 1261, 1267, 1273, 1333

Offset: 1

Jianing Song, Apr 02 2021

It makes no difference if the word "cyclic" is omitted from the title because a cubic field is cyclic if and only if its discriminant is a square.
Numbers k such that A160498(k) = 4.
Numbers of the form (i) 9p, where p is a prime congruent to 1 modulo 3; (ii) pq, where p, q are distinct primes congruent to 1 modulo 3.
In general, there are exactly 2^(t-1) (cyclic) cubic fields with discriminant k^2 if and only if k is of the form (p_1)*(p_2)*...*(p_t) or 9*(p_1)*(p_2)*...*(p_{t-1}) with distinct primes p_i == 1 (mod 3), See A343000 for more detailed information.

			63 is a term since 63^2 = 3969 is the discriminant of the 2 cyclic cubic fields Q[x]/(x^3 - 21x - 28) and Q[x]/(x^3 - 21x - 35).
91 is a term since 91^2 = 8281 is the discriminant of the 2 cyclic cubic fields Q[x]/(x^3 - x^2 - 30x + 64) and Q[x]/(x^3 - x^2 - 30x - 27).

Jianing Song, Table of n, a(n) for n = 1..10000
LMFDB, Cubic fields
Wikipedia, Cubic field

Discriminants and their square roots of cyclic cubic fields:
At least 1 associated cyclic cubic field: A343000, A343001.
Exactly 1 associated cyclic cubic field: A343022, A002476 U {9}.
At least 2 associated cyclic cubic fields: A343024, A343025.
Exactly 2 associated cyclic cubic fields: A343002, this sequence.
Cf. A006832, A160498, A343023.

isA343003(n) = if(omega(n)==2, if(n==63, 1, my(L=factor(n)); L[2,1]%3==1 && L[2,2]==1 && ((L[1,1]%3==1 && L[1,2]==1) || L[1,1]^L[1,2] == 9)), 0)

a(n) = sqrt(A343002(n)).

A343024 Discriminants with at least 2 associated cyclic cubic fields.

Original entry on oeis.org

3969, 8281, 13689, 17689, 29241, 47089, 61009, 67081, 77841, 90601, 110889, 149769, 162409, 182329, 219961, 231361, 261121, 301401, 305809, 312481, 346921, 363609, 431649, 461041, 494209, 505521, 519841, 582169, 628849, 667489, 670761, 758641, 762129, 790321, 859329, 900601, 946729, 962361

Offset: 1

Jianing Song, Apr 02 2021

A cubic field is cyclic if and only if its discriminant is a square. Hence all terms are squares.
Numbers of the form k^2 where A160498(k) >= 4.
Terms in A343000 that are not 81 or a square of a prime.
Different from A343002 since a(31) = 819^2 = (7*9*13)^2.
In general, there are exactly 2^(t-1) (cyclic) cubic fields with discriminant k^2 if and only if k is of the form (p_1)*(p_2)*...*(p_t) or 9*(p_1)*(p_2)*...*(p_{t-1}) with distinct primes p_i == 1 (mod 3), See A343000 for more detailed information.

			8281 = 91^2 is a term since it is the discriminant of the 2 cyclic cubic fields Q[x]/(x^3 - x^2 - 30x + 64) and Q[x]/(x^3 - x^2 - 30x - 27).
670761 = 819^2 is a term since it is the discriminant of the 4 cyclic cubic fields Q[x]/(x^3 - 273x - 91), Q[x]/(x^3 - 273x - 728), Q[x]/(x^3 - 273x - 1547) and Q[x]/(x^3 - 273x - 1729).

Jianing Song, Table of n, a(n) for n = 1..1600
LMFDB, Cubic fields
Wikipedia, Cubic field

Discriminants and their square roots of cyclic cubic fields:
At least 1 associated cyclic cubic field: A343000, A343001.
Exactly 1 associated cyclic cubic field: A343022, A002476 U {9}.
At least 2 associated cyclic cubic fields: this sequence, A343025.
Exactly 2 associated cyclic cubic fields: A343002, A343003.
Cf. A006832, A160498, A343023.

isA343024(n) = if(issquare(n), my(k=sqrtint(n), L=factor(k), w=omega(k)); if(w<2, return(0)); for(i=1, w, if(!((L[i, 1]%3==1 && L[i, 2]==1) || L[i, 1]^L[i, 2] == 9), return(0))); 1)

a(n) = A343025(n)^2.

A343025 Numbers k such that there are at least 2 cyclic cubic fields with discriminant k^2.

Original entry on oeis.org

63, 91, 117, 133, 171, 217, 247, 259, 279, 301, 333, 387, 403, 427, 469, 481, 511, 549, 553, 559, 589, 603, 657, 679, 703, 711, 721, 763, 793, 817, 819, 871, 873, 889, 927, 949, 973, 981, 1027, 1057, 1099, 1141, 1143, 1147, 1159, 1197, 1251, 1261, 1267

Offset: 1

Jianing Song, Apr 02 2021

It makes no difference if the word "cyclic" is omitted from the title because a cubic field is cyclic if and only if its discriminant is a square.
Numbers k such that A160498(k) >= 4.
Terms in A343001 that are not 9 or a prime.
Different from A343002 since a(31) = 819 = 7*9*13.
In general, there are exactly 2^(t-1) (cyclic) cubic fields with discriminant k^2 if and only if k is of the form (p_1)*(p_2)*...*(p_t) or 9*(p_1)*(p_2)*...*(p_{t-1}) with distinct primes p_i == 1 (mod 3); see A343000 for more detailed information.

			63 is a term since 63^2 = 3969 is the discriminant of the 2 cyclic cubic fields Q[x]/(x^3 - 21x - 28) and Q[x]/(x^3 - 21x - 35).
819 is a term since 819^2 = 670761 is the discriminant of the 4 cyclic cubic fields Q[x]/(x^3 - 273x - 91), Q[x]/(x^3 - 273x - 728), Q[x]/(x^3 - 273x - 1547) and Q[x]/(x^3 - 273x - 1729).

Jianing Song, Table of n, a(n) for n = 1..1600
LMFDB, Cubic fields
Wikipedia, Cubic field

Discriminants and their square roots of cyclic cubic fields:
At least 1 associated cyclic cubic field: A343000, A343001.
Exactly 1 associated cyclic cubic field: A343022, A002476 U {9}.
At least 2 associated cyclic cubic fields: A343024, this sequence.
Exactly 2 associated cyclic cubic fields: A343002, A343003.
Cf. A006832, A160498, A343023.

isA343025(n) = my(L=factor(n), w=omega(n)); if(w<2, return(0)); for(i=1, w, if(!((L[i, 1]%3==1 && L[i, 2]==1) || L[i, 1]^L[i, 2] == 9), return(0))); 1

a(n) = sqrt(A343024(n)).

cp's OEIS Frontend

A343000 Discriminants of cyclic cubic fields.

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A343001 Square roots of discriminants of cyclic cubic fields.

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A343022 Discriminants with exactly 1 associated cyclic cubic field.

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A343003 Numbers k such that there are exactly 2 cyclic cubic fields with discriminant k^2.

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A343024 Discriminants with at least 2 associated cyclic cubic fields.

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A343025 Numbers k such that there are at least 2 cyclic cubic fields with discriminant k^2.

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