English

Super Higher-Teichm\"uller Geometry and Loop Amplitudes

Mathematical Physics 2025-10-28 v1 High Energy Physics - Theory math.MP

Abstract

We construct a supersymmetric extension of the Fock-Goncharov cluster ensemble associated with a split basic classical Lie supergroup GG and a marked bordered surface SS. The resulting structure defines a super higher-Teichm\"uller geometry: a split super--thickening of (AG,S,XG,S)(\mathscr A_{G,S}, \mathscr X_{G,S}) equipped with a mutation atlas preserving a canonical super log-symplectic form. Each super seed carries an integer weight matrix WW encoding Cartan weights of an abelian odd slice, transforming by the column gg--vector rule and giving rise to a flat logarithmic superconnection and a canonical super volume form. On this geometric foundation we define a canonical logarithmic superform Ωsuper(L)\Omega_{\mathrm{super}}^{(L)} on a loop fibration πL:XG,S(L) ⁣ ⁣XG,S\pi_L : \mathscr X^{(L)}_{G,S} \!\to\! \mathscr X_{G,S} as the relative lift of the base super volume. For G=PGL(44)G = PGL(4|4), the corresponding super period Psuper=CΩsuper(L)P_{\mathrm{super}} = \int_{C} \Omega_{\mathrm{super}}^{(L)} encodes the loop amplitude data of planar N=4N = 4 super Yang--Mills, expressed through a unified and triangulation-independent formula that satisfies Steinmann and cluster adjacency, with the even sector given by Chen iterated integrals and the odd sector captured by an invariant BCFW delta.

Keywords

Cite

@article{arxiv.2510.22769,
  title  = {Super Higher-Teichm\"uller Geometry and Loop Amplitudes},
  author = {Chaoming Song},
  journal= {arXiv preprint arXiv:2510.22769},
  year   = {2025}
}
R2 v1 2026-07-01T07:06:41.199Z