I didn't know about symbolic regression, but it seems from your responses to @sand15 that you might also be interested in automatic selection from a class of models. He has provided a nice summary of the issues. Since he mentioned AIC and provided nice code for rational function fitting, I thought I would illustrate the principle of AIC for those functions.

Basically the idea is that more fitting parameters generally improve the fit but after a while the extra parameters are not meaningful (overfitting). AIC quantifies this tradeoff into one parameter, AIC. I recklessly ignored the full rank warnings; this is just to give you some idea of the method.

One can also use an F-ratio test to see whether a model with another parameter is statistically significant. Here you need to choose a confidence level, and it is not always clear what to use. I used to use F-ratio (at the 1% level), but more recently switched to AIC, though I have the impression that it still overfits more that I would like; that may just prove I'm too cautious. AIC can select between different classes of models, but you have to generate them in some way, which I guess is what symbolic regression does.

At the end of the day your data looks suspiciously noise-free, and the key issue may be more of finding what type of function would look like that (with less that the 16 parameters AIC decided on) than the regression itself. That still seems like a human endeavour.

Download RationalFractionFitAIC.mw

I didn't try to figure out which solutions you might want; most of them have many a[i] and b[i] zero, so you may want to solve for different variables.

Download test-F-p2.mw

@sand15 I think you meant rhs(sol) in unapply. Then the second step can be simpler:

Sol := unapply(rhs(sol), x);
eval(IC, y = Sol);

Edit: handling of terms like ln(r) improved.

Download CollectSymbolicExponents.mw

sqrt(1-cos(x)^2);
simplify(%,{cos(x)^2=1-sin(x)^2});

For some reason, the original simplify gives a numerator/denominator, with sqrt(1-t^2) in both.  If expand is used first then we don't have numerator/denominator, Then simplify can deal with the diffs. As well the denominator sqrt(1-t^2) might cancel or be simpler. So simplify(expand(B)) works here. The collect serves the same purpose as expand - giving priority to the diffs means we get a polynomial in diffs and not numerator/denominator, which then simplifies. The collect can be just wrt diff, so simplify(collect(B,diff))works.

As far as I can see, there is some error in the paper. Maybe one of the other case(s) works.

Download pde.mw

For the numbers.

Download Numbers.mw

For the calling of previous commands by referring to them by the equation labels on the right-hand side, use ctrl-L to insert the number in the appropriate place.

If you seach for "slow" on this site, there are mentions that having the context panel - the panel on the right - closed can increase performance; you might also try closing the palettes on the left when you are not using them.

[Edited]

parametrization is good for finding the first rational point (not necessarily integer) on genus 0, but doesn't work for genus 1.

I assumed at first you wanted integer solutions. My usual attacks here were not that successful. For the first equation 1 found 1 more solution, but rather trivial, and then the addition process gives the infinity point. For the second case, it seems to be working nicely in producing rational solutions.

Elliptic.mw (first equation)

Second equation:

Download Elliptic2.mw

A few of points:

1. Sometimes a calulation can be fast but displaying the complicated expression can be slow, so it is better then to store the answer without displaying it, e.g. use ans := pdetest(eqv2, pde): then if it completes you can attempt to display it (perhaps check its length first).

2. You can use ans := timelimit(20, pdetest(eqv2, pde)): to limit the attempt to 20 s.

3. If you suspect a complicated expression might simplify to zero you can set random numerical values for parameters and see if the numerical value is nearly zero. In your case you have functions beta(t) etc, so you might give simple functions to these, e.g.,

params := {beta=(t->t^2), k[1] = 0.35, ...};
ans := eval(eval(pde, params), eval(eqv2, params)):

I didn't undertand what you said. It looks as though you were trying to manually make a first order system. I fixed this and get the same result as convertsys.

systems.mw

Download find-parameter.mw

Someone else found a similar problem here and I reported this bug to Maple. The same workaround might work here - put simplify(...) around the expression with the square root.

You can use the output=Array option of dsolve to do this.

Download dsolveArray.mw