Solving complex nonpolynomial equation and find all complex roots

2 Oct. 2016
1 Respuesta
Actualizado a las 25 Oct. 2018
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I am trying to solve a nonpolynomial equation like z^n*exp(a*(1-z))+a_0z^0+a_1z^1+...+a_nz^n=0. z is within or on the unit circle in complex plane. When using the solve(eqn,var) function, it only returns one numeric solution. Actually, the above equation will have n roots in z<=1. I checked the feature of "solve" function:"The numeric solver does not try to find all numeric solutions for this equation. Instead, it returns only the first solution it finds."
Can anyone help me solve all n roots of complex nonpolynomial equations?

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Walter Roberson
Walter Roberson el 3 de Oct. de 2016
In the exp(a*(1-z)) part, is that a vector a like in the a_* part? So that each a_k would occur twice in the sum, once multiplied by z^k and once z^n*exp(a_k*(1-z)) ?
Xiang Zhong
Xiang Zhong el 3 de Oct. de 2016
Hi Walter, the variable 'a' in the exponential term is not a vector. The solve function has no problem solving z^n*exp(a*(1-z))=1 (lambert W function helps). However, when the rhs is replaced by a polynomial term it is somehow unsolvable.
Walter Roberson
Walter Roberson el 4 de Oct. de 2016
The coefficients that I tested with had more than n roots for this, even if you filtered down to abs(z) <= 1 . The exp() term introduces the possibility of two values (possibly related by LambertW in theory) modifying the normal n roots you would expect for order n.
Is there a specific limited range for the a_[i] coefficients?
sasahan mawani
sasahan mawani el 17 de Oct. de 2018
Editada: Walter Roberson el 25 de Oct. de 2018

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Massimo Zanetti
Massimo Zanetti el 3 de Oct. de 2016

3 votos

To find all solutions you need global solvers, but they don't exist.. One thing that you can do is trying to initialize fsolve with different guesses, so that at least you can try to find some different solutions. Suggestion: try to start the solver with points equally spaced on the unit circle boundary.

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Preguntada:

Xiang Zhong
Xiang Zhong
el 2 de Oct. de 2016

Editada:

Walter Roberson
Walter Roberson
el 25 de Oct. de 2018

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