We study the fragility of spin glasses to small temperature perturbations
numerically using population annealing Monte Carlo. We apply thermal boundary
conditions to a three-dimensional Edwards-Anderson Ising spin glass. In thermal
boundary conditions all eight combinations of periodic versus antiperiodic
boundary conditions in the three spatial directions are present, each appearing
in the ensemble with its respective statistical weight determined by its free
energy. We show that temperature chaos is revealed in the statistics of
crossings in the free energy for different boundary conditions. By studying the
energy difference between boundary conditions at free-energy crossings, we
determine the domain-wall fractal dimension. Similarly, by studying the number
of crossings, we determine the chaos exponent. Our results also show that
computational hardness in spin glasses and the presence of chaos are closely
related.Comment: 4 pages, 4 figure