BPS Dendroscopy on Local P2

Abstract

The spectrum of BPS states in type IIA string theory compactified on a Calabi-Yau threefold famously jumps across codimension-one walls in complexified K\"ahler moduli space, leading to an intricate chamber structure. The Split Attractor Flow Conjecture posits that the BPS index z(γ) for given charge γ and moduli z can be reconstructed from the attractor indices *(γi) counting BPS states of charge γi in their respective attractor chamber, by summing over a finite set of decorated rooted flow trees known as attractor flow trees. If correct, this provides a classification (or dendroscopy) of the BPS spectrum into different topologies of nested BPS bound states, each having a simple chamber structure. Here we investigate this conjecture for the simplest, albeit non-compact, Calabi-Yau threefold, namely the canonical bundle over the projective plane P2. Since the K\"ahler moduli space has complex dimension one and the attractor flow preserves the argument of the central charge, attractor flow trees coincide with scattering sequences of rays in a two-dimensional slice of the scattering diagram in the space of stability conditions on the derived category of compactly supported coherent sheaves on KP2. We combine previous results on the scattering diagram of KP2 in the large volume slice with new results near the orbifold point C3/Z3, and prove that the Split Attractor Flow Conjecture holds true on the physical slice of -stability conditions. In particular, while there is an infinite set of initial rays related by the group 1(3) of auto-equivalences, only a finite number of possible decompositions γ=Σiγi contribute to the index z(γ) for any γ and z, with constituents γi related by spectral flow to the fractional branes at the orbifold point.