Bosonic and Fermionic Singularities in Diffeology

Abstract

We explore the differential geometry of the quadrant C2 = [0,∞[2, equipped with the subset diffeology of R2. We show a striking dichotomy between differential forms and symmetric tensors. While differential forms on C2 are simply restrictions of smooth forms on R2 (a "Fermionic" behavior where singularities are hidden), symmetric tensors exhibit a "Bosonic" behavior where singularities accumulate. We prove a decomposition theorem identifying exactly the singular parts: they are purely axial. Surprisingly, the mixed interaction term is forced to be regular by the symmetries of the corner. Finally, we introduce the notion of singular capacity to quantify the order of singularity a tensor can support.