# Mathematica Findroot Exploring the parameter space

I am solving three non-linear equations in three variables (H0D,H0S and H1S) using FindRoot. In addition to the three variables of interest, there are four parameters in these equations that I would like to be able to vary. My parameters and the range in which I want to vary them are as follows:

CF∈{0,15} , CR∈{0,8} , T∈{0,0.35} , H1R∈{40,79}

The problem is that my non-linear system may not have any solutions for part of this parameter range. What I basically want to ask is if there is a smart way to find out exactly what part of my parameter range admits real solutions.

I could run a FindRoot inside a loop but because of non-linearity, FindRoot is very sensitive to initial conditions so frequently error messages could be because of bad initial conditions rather than absence of a solution.

Is there a way for me to find out what parameter space works, short of plugging 10^4 combinations of parameter values by hand and playing around with the initial conditions and hoping that FindRoot gives me a solution?

Thanks a lot,

-
If the equations are algebraic then you might be able to use FindInstance to rule out existance of solutions in some regions of parameter space. – Daniel Lichtblau Jan 25 '12 at 19:06
Hi Daniel, Thanks for commenting. My equations are certainly polynomial-like. The variables (say x,y,z) in my equation have powers (x^k where k is one of the roots of a quartic) which are not integers (they may be rational, since mathematica is giving me numbers which are finite in their expression) and I get sums and products of things like x^{k_1}, y^{k_2} etc. I'm not sure if polynomial powers need to be integers for an equation to be algebraic or are expressions with rational powers also algebraic? All the coefficients in my equations are certainly integers. – user1169757 Jan 25 '12 at 19:47
Rational powers are fine. Algebraics such as sqrt(2) are not. But if you have such bad powers, and moreover all powers in x are "nicely" related, e.g. are rational multiples of one another, then you could do variable substitution. Something like x^sqrt(2) --> y is what I have in mind. Then solve for the new variables, last convert back. Obviously this tactic is only applicable in limited circumstances. – Daniel Lichtblau Jan 25 '12 at 20:29
I did try to do substitutions but I'm not sure it helped. The same original variable showed up exponentiated by three to four different numbers so x^k1,x^k2,x^k3 terms will become y,y^(k2/k1),y^(k3/k1) and that wouldn't really simplify things too much. Right now what I am trying to do it start with a solution that I know works and then loop the parameter and enter the previous solution as the new starting point for FindRoot hoping that the solution with the new parameter is not too far off from the solution with the old parameter. – user1169757 Jan 26 '12 at 0:21
I'll check to see if the solution to the quartic is indeed rational and then I'll try to use Findistance to rule out stuff. Thanks – user1169757 Jan 26 '12 at 0:21