We consider 3+1-dimensional fluids with U(1)^3 anomalies. We use Ward
identities to constrain low-momentum Euclidean correlation functions and obtain
differential equations that relate two and three-point functions. The solution
to those equations yields, among other things, the chiral magnetic
conductivity. We then compute zero-frequency functions in hydrodynamics and
show that the consistency of the hydrodynamic theory also fixes the
anomaly-induced conductivities.Comment: 4+epsilon pages, REVTeX 4.1; v2: updated reference
