We introduce the space of twisted modular forms, a strict class of holomorphicfunctions governed exclusively by non-arithmetic, infinite-covolume discrete groups.By severing the geometric domain from arithmetic commensurability, the space ismathematically purged of Hecke multiplicativity and Euler products. We rigorouslydefine the automorphic trace and prove its absolute convergence via PattersonSullivan bounds. We introduce the modular difference operator to map the exactarithmetic fracture when external matrices are applied, proving that the resultingcompanion twist generates an infinite-dimensional parabolic 1-cocycle bounded byintersecting Cantor sets. All theorems are supplemented with explicit step-by-stepalgebra and numerical verification to guarantee structural rigidity.
Rayyan Hussain (Sat,) studied this question.