What's the best way to check if a system of one equation and one inequality has any solution?

3 vues (au cours des 30 derniers jours)
Richárd Tóth
Richárd Tóth le 9 Août 2019
Commenté : Torsten le 9 Août 2019
Hello
I've tried the solve function, but it gave me empty result:
syms x y
>> cond1 = x^2/25 + y^2/25 == 1;
>> cond2 = y <= x-4;
>> conds = [cond1 cond2];
>> sol = solve(conds, [x y], 'ReturnConditions', true);
Tried it on wolframalpha which shows that there is solution : https://www.wolframalpha.com/input/?i=x%5E2%2F25+%2B+y%5E2%2F25+%3D+1+and+y+%3C%3D+x-4
So what do you recommend if I'm not interested in the solutions only want to know if there is any solution or not?

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Réponse acceptée

Torsten
Torsten le 9 Août 2019
Use "fmincon" with an arbitrary objective function (e.g. 0).
  2 commentaires
Richárd Tóth
Richárd Tóth le 9 Août 2019
nice, if exitflag=-2 that means that there is no solution, otherwise there is at least one solution, right?
Torsten
Torsten le 9 Août 2019
Usually yes.
To be sure, just evaluate "nonlcon" for the solution fmincon returns.
ceq should be 0 and c should be <=0.

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Plus de réponses (1)

Bruno Luong
Bruno Luong le 9 Août 2019
Modifié(e) : Bruno Luong le 9 Août 2019
In your case use first Euler-Lagrange condition gives one solution if it exists
meaning find lambda, x, y, st
[2*x/25, 2*y/25] = lambda * [-1,1]
x^2/25 + y^2/25 = 1
That gives 2 solutuions
(x,y) = sqrt(1/2)*5*[1,-1];
and
(x,y) = sqrt(1/2)*5*[-1,1];
Then check for the inequalities. The first solution meets the inequalities
y <= x-4
This solution does not require any toolbox or numerical calculation. Just pencil and paper. If you take some care with Kuhn Turker condition with the sign of lambda, you can even discard one of the two solutions before the last step.

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