Mysterious Triality and the Exceptional Symmetry of Loop Spaces

Abstract

In previous work, we introduced Mysterious Triality, extending the Mysterious Duality of Iqbal, Neitzke, and Vafa between physics and algebraic geometry to include algebraic topology in the form of rational homotopy theory. Starting with the rational Sullivan minimal model of the 4-sphere S4, capturing the dynamics of M-theory via Hypothesis H, this progresses to the dimensional reduction of M-theory on torus Tk, k 1, with its dynamics described via the iterated cyclic loop space Lck S4 of the 4-sphere. From this, we also extracted data corresponding to the maximal torus/Cartan subalgebra and the Weyl group of the exceptional Lie group/algebra of type Ek. In this paper, we discover much richer symmetry by extending the data of the Cartan subalgebra to a maximal parabolic subalgebra pkk(k) of the split real form ek(k) of the exceptional Lie algebra of type Ek by exhibiting an action, in rational homotopy category, of pkk(k) on the slightly more symmetric than Lck S4 toroidification Tk S4. This action universally represents symmetries of the equations of motion of supergravity in the reduction of M-theory to 11-k dimensions. Along the way, we identify the minimal model of the toroidification Tk S4, generalizing the results of Vigu\'e-Poirrier, Sullivan, and Burghelea, and establish an algebraic toroidification/totalization adjunction.