Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

I have this equation here and then find the polynomial from here

I am trying to implement it like this:

for (int n=0;n<order;n++){
    df[n][0]=y[n];
    for (int i=0;i<N;i++){ //N number of points

        df[n][i]+=factorial(n,i)*y[i+n-1];
    }

    }

for (int i=0;i<N;i++){

    term=factorial(s,i);
    result*=df[0][i]*term;
    sum+=result;
    }

return sum;

1) I am not sure how to implement the sign of every argument in the function.As you can see it goes 'positive' , 'negative', 'positive' ...

2) I am not sure for any mistakes...

Thanks!

----------------------factorial-----------------------------

int fact(int n){
//3!=1*2*3
if (n==0) return 1;
else
return n*fact(n-1);

}

double factorial(double s,int n){
//(s 3)=s*(s-1)*(s-2)/6
if ((n==0) &&(s==0)) return 1;
else
    return fact(s)/fact(n);


}
share|improve this question
1  
if(n%2==0) result *= -1.0 you need a line like this just after result*=df[0][i]*term. Alternatively you can use result*=df[0][i]*term*(n%2==0?-1.0:1.0) – Dan Jan 14 '13 at 17:19
1  
@Dan Nice example of obfuscation. – James Kanze Jan 14 '13 at 17:42
    
@Dan:The positive-negative concept is in df argument and not in the result (which is df*term).So (and correct me if i mistake) i should out " if((i+n)%2!=0) y[i+n-1]= -1.0;" after the line "df[n][i]+=factorial(n,i)*y[i+n-1];", right? – George Jan 14 '13 at 17:46
    
@George oh, perhaps. I'm afraid I didn't pay too much attention to the actual equation. – Dan Jan 14 '13 at 18:38
    
@Dan, do you have a reference (bibliogr, WWW) to yours formulas. I cant understan your code, sorry, but I'm curious. – qPCR4vir Jan 14 '13 at 18:54
up vote 1 down vote accepted

Well, I understand you want to approximately calculate the value f(x) for a given x=X, using Newton Interpolation polynomial with equidistant points (more specifically Newton-Gregory forward difference interpolation polynomial). Assuming s=(X-x0)/h, where x0 is the first x, and h the step to obtain the rest of the x for which you know the exact value of f : Considere:

double coef (double s, int k)
{
    double c(1);
    for (int i=1; i<=k ; ++i)
        c *= (s-i+1)/i ;
    return c;
}

double P_interp_value(double s, int Num_of_intervals , double f[] /* values of f in these points */)    // P_n_s
{

    int N=Num_of_intervals ;

    double *df0= new double[N+1]; // calculing df only for point 0

    for (int n=0 ; n<=N ; ++n)  // n here is the order
    {
        df0[n]=0;
        for (int k=0, sig=-1; k<=n; ++k, sig=-sig) // k here is the "x point"
        {
            df0[n] += sig * coef(n,k) * f[n-k];
        }
    }

    double P_n_s = 0;

    for (int k=0; k<=N ; ++k )   // here k is the order
    {
        P_n_s += coef(s,k)* df0[k];
    }
    delete []df0;

    return P_n_s;
}


int main()
{
    double s=0.415, f[]={0.0 , 1.0986 , 1.6094 , 1.9459 , 2.1972 };

    int n=1; // Num of interval to use during aproximacion. Max = 4 in these example
    while (true)
    {
    std::cin >> n; 
    std::cout << std::endl << "P(n=" << n <<", s=" << s << ")= " << P_interp_value(s, n, f)  << std::endl ;
    }
}

it print:

1

P(n=1, s=0.415)= 0.455919

2

P(n=2, s=0.415)= 0.527271

3

P(n=3, s=0.415)= 0.55379

4

P(n=4, s=0.415)= 0.567235

compare with: http://ecourses.vtu.ac.in/nptel/courses/Webcourse-contents/IIT-KANPUR/Numerical%20Analysis/numerical-analysis/Rathish-kumar/rathish-oct31/fratnode8.html

It works. Now we can start to optimize these code.

share|improve this answer
    
:One question,Where you have df0[n] += sig * coef(n,k) * f[n-k]; , according to the equation i have above ,where it says f_i+n,f_i+n-1,f_i+n-2...If i have i=0 i am taking "f_n,f_n-1,f_n-2..".For i=1 f_n+1,f_n,f_n-1..For i=2 f_n+2,f_n+1,f_n,f_n-1...You have "n-k" which results to n-1,n-2,n-3..The n+1,n+2 values?I am a bit confused .thanks for the help! – George Jan 15 '13 at 10:39
    
I have noted, to calcule the result we need only df0 (point 0), and in these formula it corresponde to i=0. I calcule only these first term. – qPCR4vir Jan 15 '13 at 10:54
    
I added some comments to make the things clear – qPCR4vir Jan 16 '13 at 9:54
    
@ qPCR4vir:Ok , thank you! – George Jan 16 '13 at 10:05
    
:I forgot.At the coef function are you sure it's ok?Because as i understand the (s k) = (s(s-1)..s-k+1)! / k! . The way you have it is (s k) = (s(s-1)..s-k+1)! / (s-k)!k!. Check my factorial function. – George Jan 16 '13 at 10:11

The simplest solution is probably to just keep the sign in a variable, and multiply it in each time through the loop. Something like:

sign = 1.0;
for ( int i = 0; i < N; ++ i ) {
    term = factorial( s, i );
    result *= df[0][i] * term;
    sum += sign * result;
    sign = - sign;
}
share|improve this answer
    
:Thanks for the tip.But can you check my comment above?I think i must use " if((i+n)%2!=0 " . – George Jan 14 '13 at 17:49
2  
The results will be exactly the same. Anytime you need to toggle the sign, toggle the sign, as above. Testing whether the index is even or odd, using i % 2 != 0, is an alternative, but it should be reserved for cases where the difference in treatment is more than just toggling the sign. – James Kanze Jan 14 '13 at 18:27
    
:Ok for the first question.Do you think from the code i have done that it solves right the equatio?Thank you! – George Jan 14 '13 at 20:55
    
@James Kanze : I could not understand yours: result *= ... some optimization? – qPCR4vir Jan 15 '13 at 9:24
    
@qPCR4vir Copied from the original. The example is just that: it shows sign being toggled. I've not done any real analysis of the original code compared to the equations. – James Kanze Jan 15 '13 at 9:39

You cannot do pow( -1, m ).

You can write your own:

inline int minusOnePower( unsigned int m )
{
    return (m & 1) ? -1 : 1;
}

You may want to build up some tables of calculated values.

share|improve this answer

just for the sign ;-)

inline signed int minusOnePower( unsigned int m )
{
    return 1-( (m & 1)<<1 );
}
share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.