Triple Summation in Matlab

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Jalal Hassan 2020 年 6 月 28 日

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https://jp.mathworks.com/matlabcentral/answers/556144-triple-summation-in-matlab

編集済み: Jalal Hassan 2020 年 6 月 29 日

Following Formula uses triple index summation.

How can I achieve this in matlab. All of the terms being summed are row vectors ( coefficients of polynomial ) except f(xi , yj , zk) is a row vector of numbers.

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Jalal Hassan 2020 年 6 月 29 日

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f(xi ,yj ,zk) is a row vector of function values evaluated from x =[1 2 3] , y = [4 5 6] and z = [7 8 9]

size of f(xi ,yj ,zk) is equal to (size of x) * (size of y) * (size of z)

x ,y ,z contain only numeric values whereas L(x), L(y) and L(z) are Lagrange Coefficients i.e., L(x) contains coefficients of Lagrange Polynomial. Lagrange Coefficients are calculated from following code.

w=length(x);
l=w-1;
L=zeros(w,w);
for k=1:l+1
   A=1;
   for j=1:l+1
      if k~=j
         A=conv(A,poly(x(j)))/(x(k)-x(j));
      end
   end
   L(k,:)=A;
end
L

L is a w*w matrix containg all of the Lagrange coefficeints. For example, it may be

L = 2×2

-100.0000 6.0000

100.0000 -5.0000

1st row represents ( -100x + 6 ) whereas 2nd row represents ( 100x - 5x ).

If L was a 3x3 matrix then all of the rows represent ( ax^2 + bx +c ) polynomials.

Now coming to the value of p q & r

Consider following three vectors

x = [x0 x1 x2]

y = [y0 y1 y2]

z = [z0 z1 z2]

in this case p=2, q=2, r=2

And if

x = [x0 x1 x2 x3]

y = [y0 y1 y2 y3]

z = [z0 z1 z2 z3]

then p=3, q=3, r=3

We can imply that in summation, we wil be having 3 terms. So, it is simply equal to

p=length(x)

q=length(y)

r=length(z)

So, we can use Summation from 1 to length(x or any vector being used).

For Lp,i(x), consider length(x) = 3 then p=3 so, L3,i(x). In loop first value of i will be 1, then L3,1(x). This simply means that from lagrange coefficients matrix we have to use first row which is a polynomial. Therefore, L3,2(x) means 2nd row and similarly L3,3(x) means 3rd row.

From this explaination, I hope you can get the whole picture of what I wanted to ask.

Walter Roberson 2020 年 6 月 29 日

MATLAB Online で開く

size of f(xi ,yj ,zk) is equal to (size of x) * (size of y) * (size of z)

That means that given scalar xi, yj, zk, then f(xi, yj, zk) is a 3 dimensional array. A 3 dimensional array is not a "row vector"

p=length(x)

That disagrees with p=2 for x = [x0 x1 x2] . It looks to me as if p is the degree of the polynomial implied by x, which would be length(x)-1

This simply means that from lagrange coefficients matrix we have to use first row which is a polynomial. 

As in sum(L3(1,:) .* x.^(length(x)-1:-1:0)) ?

Jalal Hassan 2020 年 6 月 29 日

編集済み: Jalal Hassan 2020 年 6 月 29 日

MATLAB Online で開く

I calculated all of the possible combinations of f(xi ,yj ,zk) by using following code

syms x y z
f = @(x,y,z)x.*y+z;               % Insert your function
x  = [ 0.05 0.06 ];
y =  [ 1.23 1.41 ];
z = [ 0.1 0.2];
[XX,YY,ZZ] = meshgrid(x,y,z);     % Create all possible combinations
Q = f(XX(1:end),YY(1:end),ZZ(1:end))

It gives a 1x8 matrix containg all of the function values. These are just numbers.

For value of p, I'll give an example

consider following matrix

x = [x0 x1 x2 x3]

As you can see last entry is x3, so p=3. Similarly, if last entery is x2 or x4, p will be 2 and 4 respectively.

Now consider

x = [x1 x2 x3 x4]

we will sum from 1 to 4, thereby p=4 whereas in above example p=3 but we are going to sum from 0 to 3, both of which are same i.e., number of terms which are being summed are 4.

For Lagrange coefficients, I think we can use conv to multiply them beacause these are Lagrange Polynomials.

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