Excited String States and D-branes from Infinite Width Neural Networks

Abstract

We explore recent proposal to represent worldsheet string path integrals by integrating over parameters of a wide random-feature neural network whose output is identified with the embedding field Xμ. In this paper we extend it focusing on scattering with excited states insertions and for worldsheets with boundaries introducing fixed-feature Gaussian normal-ordering prescription for derivative composites (removing the neural contact term at finite width), and propose realization of mixed Neumann/Dirichlet boundary conditions interpreted as a neural Dp-brane. As concrete outputs, we derive the sphere four-point integrand with a single (1,1) insertion and the disk four-tachyon amplitude on a Dp-brane, recovering the expected derivative prefactors, boundary exponents, and momentum-conservation limits after renormalization.