Partial classification of spectrum maximizing products for pairs of 22 matrices

Experiments suggest that typical finite families of square matrices admit spectrum maximizing products (SMPs), that is, products that attain the joint spectral radius (JSR). Furthermore, those SMPs are often combinatorially "simple. " In this paper, we consider pairs of real 2 2 matrices. We identify regions in the space of such pairs where SMPs are guaranteed to exist and to have a simple structure. We also identify another region where SMPs may fail to exist (in fact, this region includes all known counterexamples to the finiteness conjecture), but nevertheless a Sturmian maximizing measure exists. Though our results apply to a large chunk of the space of pairs of 2 2 matrices, including for instance all pairs of non-negative matrices, they leave out certain "wild" regions where more complicated behavior is possible.