# Fortran Function explanation

I have this function in Fortran and i'm trying to recode it in C#

``````C ****************************************************************
C    FUNCTION   POLY
C*****************************************************************
FUNCTION POLY(N,A,X)
DIMENSION A(N)
C
POLY    = 0.
L       = N
DO 1 K  = 1,N
POLY    = POLY*X + A(L)
1     L       = L-1
RETURN
END
C*****************************************************************
``````

I found out that `DIMENSION A(N)` creates a vector of `N` values, but we already have a variable `A` from the function parameters, does this means that the array values all equal to `A`? If so then what is the use of `A(N)`. By the way can anyone just explain what does this function do so i can re-implement it in C#

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``````      FUNCTION POLY(N,A,X)      ! implicitly real (float) function poly(int n,int a,real x)
DIMENSION A(N)            ! shape A as 1d array of n values in this scope
C                               ! say nothing (blank comment)
POLY    = 0.              ! initialise return variable to float value 0
L       = N               ! set L (implicitly integer) to n
DO 1 K  = 1,N             ! for(int k=1; k<=n; ++k)
POLY    = POLY*X + A(L)   !    update return variable
1     L       = L-1             !    decrement L
RETURN                    ! return current value for poly
END
``````

so in c-like syntax:

``````float poly(int n, int a, float x) {
// redim a(n)
float result = 0;
int l = n;
for(int k=1; k <= n; ++k) {
result = result*x + a(l);
--l;
}
return result;
}
``````

The bit that doesn't translate is redimensioning A as an array. In C you would pass a pointer and use it as an array, and in C++/C# you'd probably pass a vector-like structure with its own length property.

In C#, using a list:

``````float poly(List<float> coeffs, float x) {
float result = 0;
for(int i=coeffs.Count-1; i >= 0; --i) {
result = result*x + coeff[i];
}
return result;
}
``````
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The commenting of the FORTRAN code is nice, but the C# and Python code you present are incorrect. –  David Heffernan Apr 16 '12 at 13:46
@DavidHeffernan: ...in what way? –  Phil H Apr 16 '12 at 13:55
In the way that they give the wrong answers. In the C# code you mean `=` rather than `+=`. And you iterate over the coefficients in the wrong order. You want to `coeff[n-1]`, `coeff[n-2]` etc. And the Python code bears no relation to polynomial evalutation. You can fix it by replacing the `+` with a `*` but then it's not Horner's method and it inefficient. It's pretty enough, it just gives the wrong answers. The only code in your answer that is correct is the C pseudo code. I'm sure you can correct it easily enough, but as it stands this answer is down-vote bait. –  David Heffernan Apr 16 '12 at 13:57
@DavidHeffernan: Thanks, I spotted the order mistake after your first comment, but not the +=. Removed the python code because the point was more a sensible way to achieve the result in python, rather than replicate the algorithm, since python has its overheads. –  Phil H Apr 16 '12 at 14:06
OK, it was getting hard to do this in comments. I corrected your code properly now. –  David Heffernan Apr 16 '12 at 14:16

It evaluates a polynomial in `x` of the form:

``````a[1] + a[2]x + a[3]x^2 + ... a[N]x^(N-1)
``````

Remember that Fortran uses 1-based array indices and I have followed that convention in this equation.

You could write it in C# like this:

``````double EvaluatePolynomial(double[] a, double x)
{
double result = 0.0;
int i = a.Length;
while (i>0)
{
i--;
result = result*x + a[i];
}
return result;
}
``````

Here we are using 0-based array indexing appropriate to C#. And so this function evalutates a polynomial in `x` of the form:

``````a[0] + a[1]x + a[2]x^2 + ... a[N-1]x^(N-1)
``````
-

guessing slightly I think this is specifying that the parameter `A` itself is an array of `N` elements.

So for the C# equivalent you wouldn't need a separate `N` parameter; you would only need to pass `A` as a `double[]`, as in .NET arrays can tell you their `.Length`.

The function evaluates polynomials using Horner's method.

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The line `DIMENSION A(N)` just declares details of the A dummy argument (`PARAMETERs` are something very different in Fortran), i.e. it says it is an array from 1 to N. The other ones are not declared this way, because the function uses implicit typing.