# Recursive realtion solution in terms of variable(p)

``````u[0, 0] =1
u[m, n] =(1/(p + m + m^2)) (m*u[(m - 1), n] + n*u[(m + 1), (n - 2)] + m*(m - 1)*u[(m - 2), (n + 2)])
``````

I want `u[m,n]` in terms of `p`; don't want answer like `u[0,2]=2u[1,0]/p` only in terms of `p`; like I want value of `u[m,n]` for different value of `m` and `n`.

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Which is it it? Matlab or Mathematica? –  arshajii Sep 1 '13 at 1:07
it is in mathematica –  sam Sep 1 '13 at 1:42
If the second line of code is intended to be a function definition it is seriously flawed. Read the documentation of basic function definition, figure out patterns for argument matching and study `SetDelayed` –  High Performance Mark Sep 1 '13 at 6:49
u[0,0]=1 is intial condition; I want algorithm for u[m,n], and function is right there is no problem with that, could you help me for algorithm? –  sam Sep 1 '13 at 13:04
let m = 1, n = 1. The function then goes for u[(m-2), (n+2)] which is u[-1, 3]. That then goes and fetches u[-3, 5] and so on infinitely. Function IS flawed. and High Performance Mark means your syntax for a function declaration is flawed. Use `u[m_, n_] := ` –  Jonie Shih Sep 2 '13 at 3:03

## 1 Answer

As stated by Jonie Shih your recursion doesn't terminate. Perhaps you want to terminate for either argument less than one:

``````u[x_, y_] /; x < 1 || y < 1 = 1;

u[m_, n_] :=
(1/(p + m + m^2)) (m*u[(m - 1), n] + n*u[(m + 1), (n - 2)] +
m*(m - 1)*u[(m - 2), (n + 2)])

p = 4;
u[3, 5]
``````
``````593037/1392640
``````
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