A324158 -id:A324158 - cp's OEIS frontend

A167531 a(n) = Sum_{d divides n} d*(n/d)^(d-1).

1, 3, 4, 9, 6, 25, 8, 49, 37, 101, 12, 373, 14, 477, 496, 1313, 18, 3907, 20, 6941, 5272, 11309, 24, 49321, 3151, 53301, 59320, 144789, 30, 468181, 32, 657473, 649936, 1114181, 121416, 5124961, 38, 4980813, 6909280, 13756761, 42, 44768725, 44

Offset: 1

Franklin T. Adams-Watters, Nov 05 2009

nonn

Seiichi Manyama, Table of n, a(n) for n = 1..5000

Cf. A055225, A324158.

PARI
```
a(n)=sumdiv(n,d,d*(n/d)^(d-1))
```

N=66; x='x+O('x^N); Vec(sum(k=1, N, x^k/(1-k*x^k)^2)) \\ Seiichi Manyama, Sep 03 2019

G.f.: Sum{k>0} x^k/(1-k*x^k)^2.

A157020 a(n) = Sum_{d|n} d*binomial(n/d+d-2,d-1).

Original entry on oeis.org

1, 3, 4, 9, 6, 22, 8, 33, 28, 46, 12, 131, 14, 78, 136, 177, 18, 307, 20, 456, 302, 166, 24, 1149, 376, 222, 568, 1177, 30, 2387, 32, 1761, 958, 358, 2556, 5224, 38, 438, 1496, 7851, 42, 8317, 44, 4863, 9136, 622, 48, 20169, 6518, 11451, 3112, 8516, 54, 23734

Offset: 1

R. J. Mathar, Feb 21 2009

Equals row sums of triangle A157497. [Gary W. Adamson & Mats Granvik, Mar 01 2009]

Seiichi Manyama, Table of n, a(n) for n = 1..10000

Cf. A081543, A132065, A156833 (Mobius transform), A324158, A324159.

add( d*binomial(n/d+d-2,d-1),d=numtheory[divisors](n) ) ;

N=66; x='x+O('x^N); Vec(sum(k=1, N, k*x^k/(1-x^k)^k)) \\ Seiichi Manyama, Sep 03 2019

G.f.: Sum_{n>=1} n*x^n/(1-x^n)^n.

A324159 Expansion of Sum_{k>=1} k * x^k / (1 - k * x^k)^k.

Original entry on oeis.org

1, 3, 4, 13, 6, 58, 8, 137, 172, 296, 12, 2063, 14, 1254, 5536, 7697, 18, 25201, 20, 68976, 70862, 23882, 24, 607485, 218776, 108720, 918568, 1810089, 30, 6746147, 32, 9408545, 11779582, 2233172, 19935756, 102405280, 38, 9968370, 145283360, 393585971, 42, 730233631, 44, 1296043651, 2718300016

Offset: 1

Ilya Gutkovskiy, Sep 02 2019

nonn

Seiichi Manyama, Table of n, a(n) for n = 1..5000

Cf. A055225, A087909, A157019, A157020, A324158.

nmax = 45; CoefficientList[Series[Sum[k x^k/(1 - k x^k)^k, {k, 1, nmax}], {x, 0, nmax}], x] // Rest
Table[Sum[(n/d)^d Binomial[n/d + d - 2, d - 1], {d, Divisors[n]}], {n, 1, 45}]

a(n) = sumdiv(n, d, (n/d)^d * binomial(n/d+d-2, d-1)); \\ Michel Marcus, Sep 02 2019

N=66; x='x+O('x^N); Vec(sum(k=1, N, k*x^k/(1-k*x^k)^k)) \\ Seiichi Manyama, Sep 03 2019

a(n) = Sum_{d|n} (n/d)^d * binomial(n/d+d-2,d-1).

a(p) = p + 1, where p is prime.

A338661 a(n) = Sum_{d|n} d^n * binomial(d+n/d-2, d-1).

Original entry on oeis.org

1, 5, 28, 289, 3126, 49036, 823544, 17040385, 387538588, 10048833246, 285311670612, 8929334253419, 302875106592254, 11116754387182648, 437894348359764856, 18448995959423107073, 827240261886336764178, 39347761059781438793815, 1978419655660313589123980

Offset: 1

Seiichi Manyama, Apr 22 2021

nonn

Seiichi Manyama, Table of n, a(n) for n = 1..386

Cf. A023887, A157019, A157020, A324158, A324159, A339481, A339482, A339712, A343573.

a[n_] := DivisorSum[n, #^n * Binomial[# + n/# - 2, #-1] &]; Array[a, 20] (* Amiram Eldar, Apr 22 2021 *)

a(n) = sumdiv(n, d, d^n*binomial(d+n/d-2, d-1));

my(N=20, x='x+O('x^N)); Vec(sum(k=1, N, (k*x/(1-(k*x)^k))^k))

G.f.: Sum_{k >= 1} (k * x/(1 - (k * x)^k))^k.
If p is prime, a(p) = 1 + p^p.
a(n) ~ n^n. - Vaclav Kotesovec, Aug 04 2025

A343573 a(n) = Sum_{d|n} d^d * binomial(d+n/d-2, d-1).

Original entry on oeis.org

1, 5, 28, 265, 3126, 46750, 823544, 16778257, 387420652, 10000015646, 285311670612, 8916100731047, 302875106592254, 11112006831322846, 437893890380906656, 18446744073843774497, 827240261886336764178, 39346408075300025340205

Offset: 1

Seiichi Manyama, Apr 20 2021

nonn

Seiichi Manyama, Table of n, a(n) for n = 1..386

Cf. A023887, A157019, A157020, A324158, A324159, A338661, A339481, A339482, A339712, A343567, A343574.

a[n_] := DivisorSum[n, #^#*Binomial[# + n/# - 2, # - 1] &]; Array[a, 20] (* Amiram Eldar, Apr 20 2021 *)

a(n) = sumdiv(n, d, d^d*binomial(d+n/d-2, d-1));

my(N=20, x='x+O('x^N)); Vec(sum(k=1, N, (k*x/(1-x^k))^k))

G.f.: Sum_{k >= 1} (k * x/(1 - x^k))^k.

If p is prime, a(p) = 1 + p^p.

A339481 a(n) = Sum_{d|n} d^(n-d) * binomial(d+n/d-2, d-1).

Original entry on oeis.org

1, 2, 2, 10, 2, 131, 2, 1282, 4376, 16907, 2, 1138272, 2, 5793475, 154455992, 469893122, 2, 49501130330, 2, 1318441711177, 19001093813466, 3138439911059, 2, 15989399214596398, 6675720214843752, 3937376603803099, 6754271297694102092, 47097064577536888014, 2

Offset: 1

Seiichi Manyama, Apr 24 2021

nonn

Cf. A157019, A157020, A324158, A324159, A338661, A339482, A339712, A343573.

a[n_] := DivisorSum[n, #^(n - #) * Binomial[# + n/# - 2, # - 1] &]; Array[a, 30] (* Amiram Eldar, Apr 25 2021 *)

a(n) = sumdiv(n, d, d^(n-d)*binomial(d+n/d-2, d-1));

my(N=40, x='x+O('x^N)); Vec(sum(k=1, N, (x/(1-(k*x)^k))^k))

G.f.: Sum_{k >= 1} (x/(1 - (k * x)^k))^k.

If p is prime, a(p) = 2.

A339712 a(n) = Sum_{d|n} d^(d+n/d-1) * binomial(d+n/d-2, d-1).

Original entry on oeis.org

1, 5, 28, 273, 3126, 46948, 823544, 16781441, 387421948, 10000078446, 285311670612, 8916102176891, 302875106592254, 11112006865913416, 437893890382064056, 18446744074783625217, 827240261886336764178, 39346408075327954053967, 1978419655660313589123980

Offset: 1

Seiichi Manyama, Apr 24 2021

nonn

Cf. A157019, A157020, A324158, A324159, A338661, A339481, A339482, A343573.

a[n_] := DivisorSum[n, #^(# + n/# - 1) * Binomial[# + n/# - 2, # - 1] &]; Array[a, 20] (* Amiram Eldar, Apr 25 2021 *)

a(n) = sumdiv(n, d, d^(d+n/d-1)*binomial(d+n/d-2, d-1));

my(N=20, x='x+O('x^N)); Vec(sum(k=1, N, (k*x/(1-k*x^k))^k))

G.f.: Sum_{k >= 1} (k * x/(1 - k * x^k))^k.

If p is prime, a(p) = 1 + p^p.

A339482 a(n) = Sum_{d|n} d^(n-d+1) * binomial(d+n/d-2, d-1).

Original entry on oeis.org

1, 3, 4, 21, 6, 346, 8, 4617, 13132, 80696, 12, 4903847, 14, 40410966, 756336736, 2416181265, 18, 306560794753, 20, 6941876836216, 132964265599502, 34522735212626, 24, 116720277621236637, 33378601074218776, 51185893450298400, 60788365423272068968

Offset: 1

Seiichi Manyama, Apr 24 2021

nonn

Cf. A157019, A157020, A324158, A324159, A338661, A339481, A339712, A343573.

a[n_] := DivisorSum[n, #^(n - # + 1) * Binomial[# + n/# - 2, # - 1] &]; Array[a, 30] (* Amiram Eldar, Apr 25 2021 *)

a(n) = sumdiv(n, d, d^(n-d+1)*binomial(d+n/d-2, d-1));

my(N=40, x='x+O('x^N)); Vec(sum(k=1, N, k*(x/(1-(k*x)^k))^k))

G.f.: Sum_{k >= 1} k * (x/(1 - (k * x)^k))^k.

If p is prime, a(p) = 1 + p.

A360794 Expansion of Sum_{k>0} x^k / (1 - k * x^k)^(k+1).

Original entry on oeis.org

1, 3, 4, 11, 6, 43, 8, 109, 100, 281, 12, 1507, 14, 1863, 3376, 6937, 18, 26245, 20, 53211, 63022, 67739, 24, 572413, 78776, 372945, 1087048, 1761719, 30, 7362871, 32, 9947953, 16897486, 10027349, 8011116, 123101515, 38, 49807779, 241823440, 361722421, 42

Offset: 1

Seiichi Manyama, Feb 21 2023

nonn

Cf. A360782, A360783.

Cf. A081543, A324158.

a[n_] := DivisorSum[n, #^(n/# - 1) * Binomial[# + n/# - 1, #] &]; Array[a, 40] (* Amiram Eldar, Jul 31 2023 *)

my(N=50, x='x+O('x^N)); Vec(sum(k=1, N, x^k/(1-k*x^k)^(k+1)))

a(n) = sumdiv(n, d, d^(n/d-1)*binomial(d+n/d-1, d));

a(n) = Sum_{d|n} d^(n/d-1) * binomial(d+n/d-1,d).

If p is prime, a(p) = 1 + p.

A360811 Expansion of Sum_{k>=0} ( x / (1 - k * x^3) )^k.

Original entry on oeis.org

1, 1, 1, 1, 2, 5, 10, 18, 38, 91, 211, 472, 1108, 2754, 6881, 17101, 43443, 113565, 300142, 797191, 2147414, 5883976, 16293712, 45471429, 128285353, 366266188, 1055534118, 3066483484, 8989837397, 26602652605, 79370560477, 238606427241, 722973445270

Offset: 0

Seiichi Manyama, Feb 21 2023

nonn

Robert Israel, Table of n, a(n) for n = 0..1000

Cf. A324158, A360783.

N:= 100:
F:= 1 + add((x/(1-k*x^3))^k, k=1..N):
S:= series(F,x,N+1):
seq(coeff(S,x,k),k=0..N); # Robert Israel, Feb 21 2024

my(N=40, x='x+O('x^N)); Vec(sum(k=0, N, (x/(1-k*x^3))^k))

a(n) = sum(k=0, n\3, (n-3*k)^k*binomial(n-2*k-1, k));

a(n) = Sum_{k=0..floor(n/3)} (n-3*k)^k * binomial(n-2*k-1,k).

cp's OEIS Frontend

A167531 a(n) = Sum_{d divides n} d*(n/d)^(d-1).

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A157020 a(n) = Sum_{d|n} d*binomial(n/d+d-2,d-1).

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A324159 Expansion of Sum_{k>=1} k * x^k / (1 - k * x^k)^k.

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PARI

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A338661 a(n) = Sum_{d|n} d^n * binomial(d+n/d-2, d-1).

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A343573 a(n) = Sum_{d|n} d^d * binomial(d+n/d-2, d-1).

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PARI

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A339481 a(n) = Sum_{d|n} d^(n-d) * binomial(d+n/d-2, d-1).

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PARI

PARI

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A339712 a(n) = Sum_{d|n} d^(d+n/d-1) * binomial(d+n/d-2, d-1).

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Mathematica

PARI

PARI

Formula

A339482 a(n) = Sum_{d|n} d^(n-d+1) * binomial(d+n/d-2, d-1).

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