On tt*-structures from ADE-type Stokes data

Abstract

Cecotti and Vafa introduced the topological anti-topological fusion (tt*)-equation, whose solutions describe massive deformations of supersymmetric conformal field theories. We provide a rigorous analytic formulation of the ADE classification of tt*-structures. Under natural structural assumptions, a tt*-structure over C* can be described via isomonodromic deformations with upper unitriangular real Stokes matrices. Two fundamental issues arise: the ambiguities of Stokes matrices, governed by an action of a group Brn, which is generated by reordering operations, and the solvability of the associated Riemann-Hilbert problem. Our first main result shows that the classification reduces to admissible Stokes matrices modulo Brn-action, and that the Brn-orbit of a Stokes matrix determines a tt*-structure over C*. Our second main result establishes that upper unitriangular matrices whose symmetrizations coincide with Cartan matrices of type An, Dn, E6, E7, or E8 give rise to tt*-structures over C*. This provides a direct analytic realization of the ADE classification and clarifies the interplay between Stokes phenomena, Brn-symmetry, and positivity of Cartan-type matrices.

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