In this paper, we prove several results concerning Polish group topologies on groups of non-singular transformation. We first prove that the group of measure-preserving transformations of the real line whose support has finite measure carries no Polish group topology.
 We then characterize the Borel $\sigma$-finite measures $\lambda$ on a standard Borel space for which the group of $\lambda$-preserving transformations has the automatic continuity property.
 We finally show that the natural Polish topology on the group of all non-singular transformations is actually its only Polish group topology.

Polish group, Non-singular transformation; infinite measure-preserving transformation; Automatic continuity