Giant gravitons and the emergence of geometric limits in β-deformations of N=4 SYM

Abstract

We study a one parameter family of supersymmetric marginal deformations of N=4 SYM with U(1)3 symmetry, known as β-deformations, to understand their dual AdS× X geometry, where X is a large classical geometry in the gYM2N ∞ limit. We argue that we can determine whether or not X is geometric by studying the spectrum of open strings between giant gravitons states, as represented by operators in the field theory, as we take N∞ in certain double scaling limits. We study the conditions under which these open strings can give rise to a large number of states with energy far below the string scale. The number-theoretic properties of β are very important. When (iβ) is a root of unity, the space X is an orbifold. When (iβ) close to a root of unity in a double scaling limit sense, X corresponds to a finite deformation of the orbifold. Finally, if β is irrational, sporadic light states can be present.