This paper presents a homotopy theoretic classification of fermionic strongly fusion 2-categories using the concept of group graded extensions.
The article presents a series solution approach for the "deformed" double-confluent Heun equation, which arises from the radial part of the Klein-Gordon equation in the background of the Nutku-Ghezelbash-Kumar metric. The method involves the convolution of series expansions to handle the non-polynomial coefficients in the equation.
The authors present a general algorithm to compute the spectrum and pseudospectrum of short-range, discrete, infinite-volume operators with finite local complexity, with rigorous error control.