Winding Topology of Multifold Exceptional Points

Abstract

Despite their ubiquity, a systematic classification of multifold exceptional points, n-fold spectral degeneracies (EPns), remains a significant unsolved problem. In this article, we characterize the Abelian eigenvalue topology of generic EPns and symmetry-protected EPns for arbitrary n. The former and the latter emerge in a (2n-2)- and (n-1)-dimensional parameter space, respectively. By introducing topological invariants called resultant winding numbers, we elucidate that these EPns are stable due to topology of a map from a base space (momentum or parameter space) to a sphere defined by resultants. In a D-dimensional parameter space (D≥ c), the resultant winding number topologically characterize a (D-c)-dimensional manifold of generic [symmetry-protected] EPns whose codimension is c=2n-2 [c=n-1]. Our framework implies fundamental doubling theorems for both generic EPns and symmetry-protected EPns in n-band models.