I investigate the viability of ontic structural realism (OSR) in loop quantum gravity (LQG) (in both its canonical and covariant formulations). This is done through the introduction of two tests for the viability of OSR: the intrinsic properties test and the intrinsic identity test. A list of candidates for the fundamental structure of LQG is identified. The application of the aforementioned tests demonstrates that structuralism is possible in each of the options for fundamental structures in LQG. This establishes a prima facie case for ontic structural realism in LQG. I then discuss potential objections to OSR in LQG. These objections include the problem that the existence of highly symmetric structures poses for OSR, as well as an objection based on the status of the Immirzi parameter (a key parameter in LQG). I argue that, with some caveats, OSR has the resources to address these objections.