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Simplify symbolic functions: remove terms

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Francesco Mela
Francesco Mela le 28 Nov 2016
Commenté : Walter Roberson le 29 Nov 2016
Hi I want to simplify a symbolic function in this way:
this is my function:
a*b+dx*dy+dx^2*dy+a*dx+a+dy*dz+dt*da
I want that Matlab:
  1. Remove the terms in which there is a product between dx*dy, dy*dx, dt*da, dx^2*dy etc.
  2. Make two function: In the first there are all terms that are multiplied by dx, dy, dt and in the other, the other terms.
Thanks!
  1 commentaire
bio lim
bio lim le 28 Nov 2016
I think your best bet is to check simplify

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Réponses (2)

Hildo
Hildo le 29 Nov 2016
Do you want to remove a specific variable
You can use
new_equation = subs(equation,var,0);
new_equation2 = simplify(equation); % Maybe is not necessary simplify in this case
Of all the cross multiplication between variables?
Walter Roberson
Walter Roberson le 29 Nov 2016
Note: for this purpose I exclude all squared terms such as dx^2, guessing that your rule was that multiplying two or more derivatives together was going to give a result too small to matter.
syms a b dx dy dz dt da
r = a*b+dx*dy+dx^2*dy+a*dx+a+dy*dz+dt*da;
[A,B] = coeffs(r,[dx,dy,dz,da,dt], 'all');
[tf, idx] = ismember([dx,dy,dz,da,dt],B);
just_constants = cellfun(@(C) isempty(symvar(C)), num2cell(B));
first_term = sum(A(idx(tf)) .* B(idx(tf)));
second_term = sum(A(just_constants) .* B(just_constants));
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Francesco Mela
Francesco Mela le 29 Nov 2016
Modifié(e) : Francesco Mela le 29 Nov 2016
Both things: the term should be removed if the total order of derivatives is more than 1 and if if there are multiple derivative variables involved. I want to remove both dx^2 both dx*dy both dx*dy^2, but not a*dx, x*dy ....
Another thing: the code works if I replace this
[A,B] = coeffs(r,[dx,dy,dz,da,dt], 'all');
with this
[A,B] = coeffs(r,[dx,dy,dz,da,dt]);
Walter Roberson
Walter Roberson le 29 Nov 2016
I did test the code with the expression you gave.
My expression originally involved some positional computations, but in mentally reviewing, I think that you are correct that the 'all' is not actually necessary, but it should not hurt.

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