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This is an example. I want to know if there is a general way to deal with this kind of problems.

Suppose I have a function (a ε ℜ) :

f[a_, n_Integer, m_Integer] := Sum[a^i k[i],{i,0,n}]^m  

enter image description here

And I need a closed form for the coefficient a^p. What is the better way to proceed?

Note 1:In this particular case, one could go manually trying to represent the sum through Multinomial[ ], but it seems difficult to write down the Multinomial terms for a variable number of arguments, and besides, I want Mma to do it.

Note 2: Of course

 Collect[f[a, 3, 4], a]  

Will do, but only for a given m and n.

Note 3: This question is related to this other one. My application is different, but probably the same methods apply. So, feel free to answer both with a single shot.

Note 4:

You can model the multinomial theorem with a function like:

f[n_, m_] := 
  Sum[KroneckerDelta[m - Sum[r[i], {i, n}]] 
   (Multinomial @@ Sequence@Array[r, n]) 
     Product[x[i]^r[i], {i, n}], 
  Evaluate@(Sequence @@ Table[{r[i], 0, m}, {i, 1, n}])];

So, for example

f[2,3]    

is the cube of a binomial

x[1]^3+ 3 x[1]^2 x[2]+ 3 x[1] x[2]^2+ x[2]^3
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  • Do you know the roots of the resulting polynomial? If so, the answer is trivial.
    – abcd
    May 16, 2011 at 15:11
  • @Yoda the k[i] are in general functions that I wish to found later using relations for these coefficients coming from other approximations. So, no, the roots are not known :( May 16, 2011 at 15:14
  • Collect[f[a, 3, 4], a] does nothing because you have defined f to take a Real as first argument, not a symbol. May 16, 2011 at 15:25
  • @Sjoerd Just remove the _Real part, and it does. I'm editing for clarity May 16, 2011 at 15:27

1 Answer 1

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The coefficient by a^k can be viewed as derivative of order k at zero divided by k!. In version 8, there is a function BellY, which allows to construct a derivative at a point for composition of functions, out of derivatives of individual components. Basically, for f[g[x]] and expanding around x==0 we find Derivative[p][Function[x,f[g[x]]][0] as

BellY[ Table[ { Derivative[k][f][g[0]], Derivative[k][g][0]}, {k, 1, p} ] ]/p!

This is also known as generalized Bell polynomial, see wiki.

In the case at hand:

f[a_, n_Integer, m_Integer] := Sum[a^i k[i], {i, 0, n}]^m

With[{n = 3, m = 4, p = 7}, 
  BellY[ Table[{FactorialPower[m, s] k[0]^(m - s), 
      If[s <= n, s! k[s], 0]}, {s, 1, p}]]/p!] // Distribute

(*
Out[80]= 4 k[1] k[2]^3 + 12 k[1]^2 k[2] k[3] + 12 k[0] k[2]^2 k[3] + 
 12 k[0] k[1] k[3]^2
*)

With[{n = 3, m = 4, p = 7}, Coefficient[f[a, n, m], a, p]]

(*
Out[81]= 4 k[1] k[2]^3 + 12 k[1]^2 k[2] k[3] + 12 k[0] k[2]^2 k[3] + 
 12 k[0] k[1] k[3]^2
*)  

Doing it this way is more computationally efficient than building the entire expression and extracting coefficients.


EDIT The approach here outlined will work for symbolic orders n and m, but requires explicit value for p. When using it is this circumstances, it is better to replace If with its Piecewise analog, e.g. Boole:

With[{p = 2}, 
 BellY[Table[{FactorialPower[m, s] k[0]^(m - s), 
     Boole[s <= n] s! k[s]}, {s, 1, p}]]/p!]

(* 1/2 (Boole[1 <= n]^2 FactorialPower[m, 2] k[0]^(-2 + m)
     k[1]^2 + 2 m Boole[2 <= n] k[0]^(-1 + m) k[2]) *)
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  • @Sasha: I think belisarius wanted an expression for a general unknown m and n, not with values substituted.
    – abcd
    May 16, 2011 at 18:34
  • @yoda I realize that, m and n do not have to be explicit, only p has to be. For instance, With[{p = 7}, BellY[Table[{FactorialPower[m, s] k[0]^(m - s), Boole[s <= n] s! k[s]}, {s, 1, p}]]/p!] /. FactorialPower[m_, k_Integer] :> Product[m - i, {i, 0, k - 1}]
    – Sasha
    May 16, 2011 at 18:38
  • @Sasha: That is really neat. I can't try it as I don't have mma8, but I'm deleting my answer, as my claim that it probably couldn't be done was incorrect.
    – abcd
    May 16, 2011 at 18:55
  • @belisarius For p==2 I am getting (1/2)*((-1 + m)*m*Boole[1 <= n]^2*k[0]^(-2 + m)*k[1]^2 + 2*m*Boole[2 <= n]*k[0]^(-1 + m)*k[2]), which does not depend on s.
    – Sasha
    May 17, 2011 at 15:31
  • @belisarius The issue is that If is HoldAll and s lingers around. Using equivalent formulation with Boole or Piecewise will work fine: With[{p = 2}, BellY[Table[{FactorialPower[m, s] k[0]^(m - s), Boole[s <= n] s! k[s]}, {s, 1, p}]]/p!]
    – Sasha
    May 18, 2011 at 5:38

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