1,2

a(n) is the minimal number m such that the symmetric group S_m has an element of order n - Ahmed Fares (ahmedfares(AT)my-deja.com), Jun 26 2001

a(A000961(n)) = A000961(n); a(A005117(n)) = A001414(A005117(n)).

If gcd[u,w]=1, then a[u.w]=a[u]+a[w]; behaves like logarithm; compare A001414 or A056239. - Labos E. (labos(AT)ana.sote.hu), Mar 31 2003

J. Bamberg, G. Cairns and D. Kilminster, The crystallographic restriction, permutations and Goldbach's conjecture, Amer. Math. Monthly, 110 (March 2003), 202-209.

F. J. Budden, The Fascination of Groups, Cambridge, 1972; pp. 322, 573.

T. D. Noe, Table of n, a(n) for n=1..10000

Additive with a(p^e) = p^e.

a(180) = a(2^2 * 3^2 * 5) = 2^2 + 3^2 + 5 = 18.

Prepend[ Array[ Plus @@ Map[ Power @@ #1&, FactorInteger[ # ] ]&, 100, 2 ], 0 ]

ffi[x_] := Flatten[FactorInteger[x]] lf[x_] := Length[FactorInteger[x]] ba[x_] := Table[Part[ffi[x], 2*w-1], {w, 1, lf[x]}] ep[x_] := Table[Part[ffi[x], 2*w], {w, 1, lf[x]}] supo[x_] := Apply[Plus, ba[x]^ep[x]] Table[A008475[w], {w, 1, 25}]

(PARI) for(n=1, 100, print1(sum(i=1, omega(n), component(component(factor(n), 1), i)^component(component(factor(n), 2), i)), ", "))

(PARI) a(n)=local(t); if(n<1, 0, t=factor(n); sum(k=1, matsize(t)[1], t[k, 1]^t[k, 2])) /* Michael Somos Oct 20 2004 */

Cf. A001414, A000961, A005117, A051613.

Cf. A081402-A081404.

Sequence in context: A049448 A130044 A082081 this_sequence A073137 A131233 A136623

Adjacent sequences: A008472 A008473 A008474 this_sequence A008476 A008477 A008478

nonn,nice

Olivier Gerard (ogerard(AT)ext.jussieu.fr)