Search: keyword:new
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A372299
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Primitive infinitary abundant numbers (definition 2): infinitary abundant numbers (A129656) having no proper infinitary divisors that are infinitary abundant numbers.
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24, 30, 40, 42, 54, 56, 66, 70, 72, 78, 88, 96, 102, 104, 114, 138, 150, 174, 186, 222, 246, 258, 282, 294, 318, 354, 366, 402, 420, 426, 438, 474, 486, 498, 534, 540, 582, 606, 618, 642, 654, 660, 678, 726, 756, 762, 780, 786, 822, 834, 894, 906, 924, 942, 945, 960, 978, 990
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OFFSET
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1,1
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LINKS
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EXAMPLE
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24 is a term since it is an infinitary abundant number and none of its proper infinitary divisors, {1, 2, 3, 4, 6, 8, 12}, are infinitary abundant numbers.
The least infinitary abundant number that is not primitive is 120. It has 3 infinitary divisors, 24, 30, and 40, that are also infinitary abundant numbers.
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MATHEMATICA
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f[p_, e_] := Module[{b = IntegerDigits[e, 2]}, m = Length[b]; Product[If[b[[j]] > 0, 1 + p^(2^(m - j)), 1], {j, 1, m}]];
isigma[1] = 1; isigma[n_] := Times @@ f @@@ FactorInteger[n]; iabQ[n_] := isigma[n] > 2*n; idivs[1] = {1};
idivs[n_] := Sort@ Flatten@ Outer[Times, Sequence @@ (FactorInteger[n] /. {p_, e_Integer} :> p^Select[Range[0, e], BitOr[e, #] == e &])];
q[n_] := Module[{d = idivs[n]}, Total[d] > 2*n && AllTrue[Most[d], !iabQ[#] &]]; Select[Range[1000], q]
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PROG
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(PARI) isidiv(d, f) = {if (d==1, return (1)); for (k=1, #f~, bne = binary(f[k, 2]); bde = binary(valuation(d, f[k, 1])); if (#bde < #bne, bde = concat(vector(#bne-#bde), bde)); for (j=1, #bne, if (! bne[j] && bde[j], return (0)); ); ); return (1); }
idivs(n) = {my(f = factor(n), d = divisors(f), idiv = []); for (k=1, #d, if (isidiv(d[k], f), idiv = concat(idiv, d[k])); ); idiv; } \\ Michel Marcus at A077609
isigma(n) = {my(f = factor(n), b); prod(i=1, #f~, b = binary(f[i, 2]); prod(k=1, #b, if(b[k], 1+f[i, 1]^(2^(#b-k)), 1)))} ;
is(n) = isigma(n) > 2*n && select(x -> x < n && isigma(x) > 2*x, idivs(n)) == [];
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CROSSREFS
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KEYWORD
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nonn,easy,new
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AUTHOR
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STATUS
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approved
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A372298
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Primitive infinitary abundant numbers (definition 1): infinitary abundant numbers (A129656) whose all proper infinitary divisors are infinitary deficient numbers.
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40, 56, 70, 72, 88, 104, 756, 924, 945, 1092, 1188, 1344, 1386, 1428, 1430, 1596, 1638, 1760, 1870, 2002, 2016, 2080, 2090, 2142, 2176, 2210, 2394, 2432, 2470, 2530, 2584, 2720, 2750, 2944, 2990, 3040, 3128, 3190, 3200, 3230, 3250, 3400, 3410, 3496, 3712, 3770
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OFFSET
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1,1
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LINKS
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EXAMPLE
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40 is a term since it is an infinitary abundant number and all its proper infinitary divisors, {1, 2, 4, 5, 8, 10, 20}, are infinitary deficient numbers.
24 and 30, which are infinitary abundant numbers, are not primitive, because their are divisible by 6 which is an infinitary perfect number.
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MATHEMATICA
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f[p_, e_] := Module[{b = IntegerDigits[e, 2]}, m = Length[b]; Product[If[b[[j]] > 0, 1 + p^(2^(m - j)), 1], {j, 1, m}]];
isigma[1] = 1; isigma[n_] := Times @@ f @@@ FactorInteger[n]; idefQ[n_] := isigma[n] < 2*n; idivs[1] = {1};
idivs[n_] := Sort@ Flatten@ Outer[Times, Sequence @@ (FactorInteger[n] /. {p_, e_Integer} :> p^Select[Range[0, e], BitOr[e, #] == e &])];
q[n_] := Module[{d = idivs[n]}, Total[d] > 2*n && AllTrue[Most[d], idefQ]]; Select[Range[4000], q]
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PROG
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(PARI) isidiv(d, f) = {if (d==1, return (1)); for (k=1, #f~, bne = binary(f[k, 2]); bde = binary(valuation(d, f[k, 1])); if (#bde < #bne, bde = concat(vector(#bne-#bde), bde)); for (j=1, #bne, if (! bne[j] && bde[j], return (0)); ); ); return (1); }
idivs(n) = {my(f = factor(n), d = divisors(f), idiv = []); for (k=1, #d, if (isidiv(d[k], f), idiv = concat(idiv, d[k])); ); idiv; } \\ Michel Marcus at A077609
isigma(n) = {my(f = factor(n), b); prod(i=1, #f~, b = binary(f[i, 2]); prod(k=1, #b, if(b[k], 1+f[i, 1]^(2^(#b-k)), 1)))} ;
is(n) = isigma(n) > 2*n && select(x -> x < n && isigma(x) >= 2*x, idivs(n)) == [];
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CROSSREFS
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KEYWORD
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nonn,easy,new
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AUTHOR
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STATUS
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approved
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A372300
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Numbers k such that k and k+1 are both primitive infinitary abundant numbers (definition 1, A372298).
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812889, 3181815, 20787584, 181480695, 183872535, 307510664, 337206344, 350158808, 523403264, 744074624, 868421504, 1063361144, 1955365125, 2076191864, 2578966215, 3672231255, 4185590408, 5032685384, 7158001304, 8348108535, 10784978295, 16264812135, 20917209495, 24514454055
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OFFSET
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1,1
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COMMENTS
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The corresponding sequence with definition 2 (A372299) coincides with this sequence for the first 24 terms.
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LINKS
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PROG
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(PARI) isidiv(d, f) = {my(bne, bde); if (d==1, return (1)); for (k=1, #f~, bne = binary(f[k, 2]); bde = binary(valuation(d, f[k, 1])); if (#bde < #bne, bde = concat(vector(#bne-#bde), bde)); for (j=1, #bne, if (! bne[j] && bde[j], return (0)); ); ); return (1); }
idivs(n) = {my(f = factor(n), d = divisors(f), idiv = []); for (k=1, #d, if (isidiv(d[k], f), idiv = concat(idiv, d[k])); ); idiv; } \\ Michel Marcus at A077609
isigma(n) = {my(f = factor(n), b); prod(i=1, #f~, b = binary(f[i, 2]); prod(k=1, #b, if(b[k], 1+f[i, 1]^(2^(#b-k)), 1)))} ;
isab(n) = isigma(n) > 2*n;
isprim(n) = select(x -> x<n && isigma(x) >= 2*x, idivs(n)) == [];
lista(kmax) = {my(is1 = 0, is2); for(k = 2, kmax, is2 = isab(k); if(is1 && is2, if(isprim(k-1) && isprim(k), print1(k-1, ", "))); is1 = is2); }
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CROSSREFS
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KEYWORD
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nonn,new
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AUTHOR
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STATUS
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approved
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A372311
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Triangle read by rows: T(n, k) = n^k * Sum_{j=0..n} binomial(n - j, n - k) * Eulerian1(n, j).
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1, 1, 1, 1, 6, 8, 1, 21, 108, 162, 1, 60, 800, 3840, 6144, 1, 155, 4500, 48750, 225000, 375000, 1, 378, 21672, 453600, 4354560, 19595520, 33592320, 1, 889, 94668, 3500658, 60505200, 536479440, 2371803840, 4150656720
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OFFSET
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0,5
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LINKS
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EXAMPLE
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Triangle begins:
[0] 1;
[1] 1, 1;
[2] 1, 6, 8;
[3] 1, 21, 108, 162;
[4] 1, 60, 800, 3840, 6144;
[5] 1, 155, 4500, 48750, 225000, 375000;
[6] 1, 378, 21672, 453600, 4354560, 19595520, 33592320;
[7] 1, 889, 94668, 3500658, 60505200, 536479440, 2371803840, 4150656720;
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MAPLE
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S := (n, k) -> local j; add(eulerian1(n, j)*binomial(n-j, n-k), j = 0..n):
row := n -> local k; seq(S(n, k) * n^k, k = 0..n):
seq(row(n), n = 0..8);
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PROG
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(SageMath)
x = polygen(ZZ, 'x')
A = []
for m in range(0, n + 1, 1) :
A.append((-x)^m)
for j in range(m, 0, -1):
A[j - 1] = j * (A[j - 1] - A[j])
return [n^k*c for k, c in enumerate(A[0])]
for n in (0..7) : print(A372311_row(n))
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CROSSREFS
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KEYWORD
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AUTHOR
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STATUS
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approved
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1, 2, 15, 292, 10845, 653406, 58018051, 7123041416, 1155276253305, 239189245299010, 61550396579410431, 19268616527909790636, 7210621330821550184725, 3178541959877575827583334, 1630110354806890680999093435, 962286069560027427207269245456
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OFFSET
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0,2
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LINKS
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MAPLE
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S := (n, k) -> local j; n^k*add(eulerian1(n, j)*binomial(n-j, n-k), j = 0..n):
seq(add(S(n, k), k = 0..n), n = 0..15);
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CROSSREFS
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KEYWORD
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nonn,new
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AUTHOR
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STATUS
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approved
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A372310
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Number of permutations of length n avoiding the pattern 1324 and with 1 appearing before n.
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1, 3, 11, 45, 198, 919, 4446, 22239, 114347, 601722, 3229614, 17632437, 97707195, 548538588, 3115293151, 17875151109, 103511938302, 604392787819, 3555410248782, 21057224371290, 125484804821226, 752020468811244, 4530163818778839, 27419805899781843, 166694596163875206
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OFFSET
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2,2
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COMMENTS
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This sequence counts the number of permutations of size n written in one-line notation that avoid the pattern 1324 and have the 1 appearing before the n.
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LINKS
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FORMULA
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G.f.: A(x) = (x*(B(x)-2))/(3-B(x)), where B(x) is the g.f. for A000139. (See arxiv paper by Gil, Lopez, Weiner).
G.f. satisfies 0 = x^4*(8*x-1)+x^2*(9*x-1)*(4*x-1)*A(x)+x*(6*x-1)*(9*x-2)*A(x)^2+(27*x^2-9*x+1)*A(x)^3.
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EXAMPLE
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For n=4, a(4)=11 is counting the permutations (in one-line notation): 1234, 1243, 1342, 1423, 1432, 2134, 2143, 2314, 3124, 3142, 3214.
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MAPLE
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f:= proc(n) f(n):= 2*(3*n)!/((2*n+1)!*(n+1)!) end:
a:= proc(n) option remember; `if`(n=1, 1,
add(a(n-i)*f(i), i=1..n))
end:
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CROSSREFS
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KEYWORD
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nonn,new
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AUTHOR
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STATUS
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approved
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A372195
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Number of labeled simple graphs covering n vertices with a unique undirected cycle of length > 2.
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OFFSET
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0,5
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COMMENTS
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An undirected cycle in a graph is a sequence of distinct vertices, up to rotation and reversal, such that there are edges between all consecutive elements, including the last and the first.
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LINKS
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EXAMPLE
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The a(4) = 15 graphs:
12,13,14,23
12,13,14,24
12,13,14,34
12,13,23,24
12,13,23,34
12,13,24,34
12,14,23,24
12,14,23,34
12,14,24,34
12,23,24,34
13,14,23,24
13,14,23,34
13,14,24,34
13,23,24,34
14,23,24,34
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MATHEMATICA
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cyc[y_]:=Select[Join@@Table[Select[Join@@Permutations/@Subsets[Union@@y, {k}], And@@Table[MemberQ[Sort/@y, Sort[{#[[i]], #[[If[i==k, 1, i+1]]]}]], {i, k}]&], {k, 3, Length[y]}], Min@@#==First[#]&];
Table[Length[Select[Subsets[Subsets[Range[n], {2}]], Union@@#==Range[n]&&Length[cyc[#]]==2&]], {n, 0, 5}]
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CROSSREFS
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A002807 counts cycles in a complete graph.
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KEYWORD
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nonn,more,new
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AUTHOR
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STATUS
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approved
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A372193
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Number of labeled simple graphs on n vertices with a unique cycle of length > 2.
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OFFSET
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0,5
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COMMENTS
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An undirected cycle in a graph is a sequence of distinct vertices, up to rotation and reversal, such that there are edges between all consecutive elements, including the last and the first.
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LINKS
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EXAMPLE
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The a(4) = 19 graphs:
12,13,23
12,14,24
13,14,34
23,24,34
12,13,14,23
12,13,14,24
12,13,14,34
12,13,23,24
12,13,23,34
12,13,24,34
12,14,23,24
12,14,23,34
12,14,24,34
12,23,24,34
13,14,23,24
13,14,23,34
13,14,24,34
13,23,24,34
14,23,24,34
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MATHEMATICA
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cyc[y_]:=Select[Join@@Table[Select[Join@@Permutations /@ Subsets[Union@@y, {k}], And @@ Table[MemberQ[Sort/@y, Sort[{#[[i]], #[[If[i==k, 1, i+1]]]}]], {i, k}]&], {k, 3, Length[y]}], Min@@#==First[#]&];
Table[Length[Select[Subsets[Subsets[Range[n], {2}]], Length[cyc[#]]==2&]], {n, 0, 5}]
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CROSSREFS
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A002807 counts cycles in a complete graph.
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KEYWORD
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nonn,more,new
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AUTHOR
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STATUS
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approved
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A372176
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Irregular triangle read by rows where T(n,k) is the number of labeled simple graphs on n vertices with exactly 2k directed cycles of length > 2.
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1, 1, 2, 7, 1, 38, 19, 0, 6, 0, 0, 0, 1, 291, 317, 15, 220, 0, 0, 70, 55, 0, 0, 0, 0, 30, 15, 0, 0, 0, 0, 0, 0, 0, 0, 10, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1
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OFFSET
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0,3
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COMMENTS
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A directed cycle in a simple (undirected) graph is a sequence of distinct vertices, up to rotation, such that there are edges between all consecutive elements, including the last and the first.
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LINKS
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EXAMPLE
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Triangle begins (zeros shown as dots):
1
1
2
7 1
38 19 . 6 ... 1
291 317 15 220 .. 70 55 .... 30 15 ........ 10 ............... 1
The T(4,3) = 6 graphs:
12,13,14,23,24
12,13,14,23,34
12,13,14,24,34
12,13,23,24,34
12,14,23,24,34
13,14,23,24,34
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MATHEMATICA
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cyc[y_]:=Select[Join@@Table[Select[Join@@Permutations/@Subsets[Union@@y, {k}], And@@Table[MemberQ[Sort/@y, Sort[{#[[i]], #[[If[i==k, 1, i+1]]]}]], {i, k}]&], {k, 3, Length[y]}], Min@@#==First[#]&];
Table[Length[Select[Subsets[Subsets[Range[n], {2}]], Length[cyc[#]]==2k&]], {n, 0, 4}, {k, 0, Length[cyc[Subsets[Range[n], {2}]]]/2}]
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CROSSREFS
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Cf. A000272, A053530, A137916, A144958, A213434, A367863, A372168, A372169, A372171, A372172, A372191.
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KEYWORD
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nonn,tabf,more,new
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AUTHOR
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STATUS
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approved
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A372175
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Irregular triangle read by rows where T(n,k) is the number of labeled simple graphs covering n vertices with exactly 2k directed cycles of length > 2.
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1, 0, 1, 3, 1, 19, 15, 0, 6, 0, 0, 0, 1, 155, 232, 15, 190, 0, 0, 70, 50, 0, 0, 0, 0, 30, 15, 0, 0, 0, 0, 0, 0, 0, 0, 10, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1
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OFFSET
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0,4
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COMMENTS
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A directed cycle in a simple (undirected) graph is a sequence of distinct vertices, up to rotation, such that there are edges between all consecutive elements, including the last and the first.
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LINKS
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EXAMPLE
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Triangle begins (zeros shown as dots):
1
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1
3 1
19 15 . 6 ... 1
155 232 15 190 .. 70 50 .... 30 15 .......... 10 .............. 1
Row n = 4 counts the following graphs:
12,34 12,13,14,23 . 12,13,14,23,24 . . . 12,13,14,23,24,34
13,24 12,13,14,24 12,13,14,23,34
14,23 12,13,14,34 12,13,14,24,34
12,13,14 12,13,23,24 12,13,23,24,34
12,13,24 12,13,23,34 12,14,23,24,34
12,13,34 12,13,24,34 13,14,23,24,34
12,14,23 12,14,23,24
12,14,34 12,14,23,34
12,23,24 12,14,24,34
12,23,34 12,23,24,34
12,24,34 13,14,23,24
13,14,23 13,14,23,34
13,14,24 13,14,24,34
13,23,24 13,23,24,34
13,23,34 14,23,24,34
13,24,34
14,23,24
14,23,34
14,24,34
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MATHEMATICA
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cycles[g_]:=Join@@Table[Select[Join@@Permutations /@ Subsets[Union@@g, {k}], Min@@#==First[#]&&And@@Table[MemberQ[Sort/@g, Sort[{#[[i]], #[[If[i==k, 1, i+1]]]}]], {i, k}]&], {k, 3, Length[g]}];
Table[Length[Select[Subsets[Subsets[Range[n], {2}]], Union@@#==Range[n]&&Length[cycles[#]]==2k&]], {n, 0, 5}, {k, 0, Length[cycles[Subsets[Range[n], {2}]]]/2}]
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CROSSREFS
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The non-covering version is A372176.
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KEYWORD
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nonn,more,tabf,new
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AUTHOR
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STATUS
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approved
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