In this paper inviscid flows in the three-dimensional space are
studied. A PDE system (the Euler system) describing such flows is considered.
We also formulate this system in special coordinates corresponding to a model
of a pipe. The Lie algebra of symmetries of this system is described. Then
we give an algebra of differential invariants, in particular, in coordinate-free
form. Finally, we present the Euler system describing flows along a circular
helix, discuss its symmetries and invariants.