Is there an example where model building that is motivated only by Naturalness, has led to experimentally verified observations?
If the question is unclear, or if the reader wants more elaboration, then continue reading.
Naturalness is defined by 't Hooft as: "A theory with a parameter $m$ is natural if the limit where $m \rightarrow 0$ results in an enhancement of the symmetry of the theory."
For example, take fermions in the Standard Model, if you set their masses to zero then you restore chiral symmetry. And the log-divergent radiative corrections will vanish.
Now, take the Higgs boson (a scalar), if you calculate the loop correction the Higgs squared mass parameter, you'll get quadratic divergence. If you set the mass to zero, this won't help as you still have quadratic divergence. And no symmetry is restored.
If the scale of new physics is at the Planck scale or GUT scale, then you'll have to tune the mass of the Higgs by something like $10^{30}$.
If Supersymmetry exists, then the quadratic divergence cancels out. Also, the limit where the Higgs mass goes to zero will result in restoring SUSY. So, SUSY will give you a "natural" model.
However, I came across this article: "Is Naturalness Unnatural?" by Nobel laureate Prof. Burton Richter. It addresses three things: Naturalness (which what I'm concerned about), the cosmological anthropic principle, and the landscape in string theory.
Concerning Naturalness, in his view, in balancing between having a natural theory with extra parameters, and having a theory with huge fine-tuning (or as he says: somethings are simply initial conditions) but fewer parameter, the latter is more important, while the former can be misleading.
Hence, I'm tempted to ask, are there examples in the past where naturalness considerations led to experimentally verified results?
