Recent work has shown that for
,
a Liouville quantum gravity (LQG) surface can be endowed with a canonical
metric. We prove several results concerning geodesics for this metric. In
particular, we completely classify the possible networks of geodesics from a
typical point on the surface to an arbitrary point on the surface, as well
as the types of networks of geodesics joining two points which occur for
a dense set of pairs of points on the surface. This latter result is the
-LQG
analog of the classification of geodesic networks in the Brownian map due to Angel,
Kolesnik, and Miermont (2017). We also show that there is a deterministic
such that almost surely any two points are joined by at most
distinct LQG geodesics.