Universal neighborhood topology and geometry of exceptional points in physical systems

Exceptional points (EPs) occurring in non-Hermitian systems at certain physical parameters are intensively studied in many areas of physics, including diffraction optics, lasers, atomic and polaritonic condensates, often in the context of sensing. Recent discoveries of EPs in nonlinear systems open the door for an even larger parameter space, raising the question of whether the geometric structure of EPs is universal and independent of the physical model. We show that this is the case for nonlinear perturbations of an isolated 2nd-order linear EP which becomes the organizing point of a universal elementary catastrophe (elliptic umbilic). This clarifies not only the neighborhood's topology but also its geometric shape (cone with quasi-deltoid cross section). Thus, the position and characteristics of EPs can be predicted in nonlinear non-Hermitian parameter space; e.g., at a 2nd-order linear EP four nonlinear eigenvectors coalesce. These fundamental insights on universal topological structures and phase boundaries accompanying EPs in nonlinear physical systems will pave the way for the purposeful design of such systems with novel functionalities and control possibilities.