There is a conjecture by Pólya & Szegő (~1950, stated in p. 159 of their book Isoperimetric Inequalities in Mathematical Physics) which is as follows:
"Of all $n$-gons of a fixed area, the regular $n$-gon minimizes the first Dirichlet eigenvalue."
Surprisingly, this is still open (to my knowledge) for the general case. The only settled cases are the triangles and the quadrilaterals (see Henrot's survey). Is there any progress on the general case?
I'm pretty sure that this is still open for $n$-gons (with $n\geq 5$). As far as I know, basically no progress has been made since the original proofs for triangles/quadrilaterals.
There have been some numerics as well as some refined inequalities for triangles. This article might point you towards some of these results.
Interestingly, a related conjecture of Pólya & Szegő is resolved "the regular $n$-gon has least logarithmic capacity among $n$-gons of a fixed area" http://www.ams.org/mathscinet-getitem?mr=2052355.
Together with D. Bucur we propose a strategy which could prove the conjecture for a fixed $n \geq 5$ using a finite number of certified numerical computations.
Our paper can be found here: On the polygonal Faber-Krahn inequality The key points are:
The second shape derivative is computed for a simple eigenvalue of a polygon. Classical shape derivative formulas do not apply directly due to the lack of regularity.
The Hessian matrix of $(x_i,y_i) \mapsto \lambda_1(P)$ is computed explicitly for general $n$-gons
For regular $n$-gons the eigenvalues of the Hessian matrix for $|P|\lambda_1(P)$ (scale-invariant version) are computed explicitly. They depend on solutions to 3 PDEs.
Positivity of eigenvalues of the regular $n$-gon is not obvious. We prove that four eigenvalues are $0$ (corresponding to translations, rotations, homotheties which do not change the scale invariant objective). If the remaining $2n-4$ eigenvalues are strictly positive, the local minimality holds.
We develop explicit numerical estimates for piecewise linear finite elements allowing to guarantee positivity of the remaining $2n-4$ eigenvalues on meshes which are fine enough.
In the final section we show that the optimal polygon should verify various bounds on geometric elements which can narrow the search space for admissible optimal polygons.
We also show that the eigenvalues of the Hessian are stable around the regular $n$-gon (fixing two vertices to eliminate the zero eigenvalues). Therefore there exists a quantifiable region of local minimality around the regular $n$-gon (not fully computed).
Thus the proof could be reduced to a finite number of verified computations: one computation for local minimality and for finding a local minimality neighborhood. A finite number of computations could exhaust the region between the regular $n$-gon and arbitrary $n$-gons verifying the geometric constraints (diameter, inradius, lower bound on smallest side, etc).
We also have a preprint concerning a complete proof for the local minimality of the regular $n$-gon for $n \leq 6$ using validated computing (interval arithmetics). The arxiv version can be found here
