(axial vector). As a result force F
springs up (polar vector). The interactions are subject to vector
product miltiplication rules pa=P or v
F. SYMMETRY OF INTERACTING VECTOR QUANTITIES
Yu.M. Smirnov and R.M. Grechishkin
Tver State University,
Zheliabova Str., 33, 170000 Tver, Russia
The Magnus effect is known to be brought about
by the interaction of two quantities: stream velocity v (polar
vector) and cylinder rotation velocity in the stream (axial vector). As a result force F
springs up (polar vector). The interactions are subject to vector
product miltiplication rules pa=P or vF.
Consider now the Hall effect from the same
point of view. The electric current in a conductor, with a
density j (polar vector), upon interaction with the
magnetic field 
(axial vector) produces
an electric field E (polar vector). The F and E
quantities may be compared to v and j,
respectively, assuming E increasing and j
associated with the electron motion. Then it follows that 
and 
should
correspond to each other. Consequently some kind of 
rotation should be
assumed in analogy to the clockwise rotation of 
. From the viewpoint of
crystal physics the above interactions may be expressed as
,
with infinite symmetry axes being mutually perpendicular.
An existence of four groups of interaction may
be supposed when the infinite axes are either mutually
perpendicular or when two axes are coinciding. The corresponding
examples are known well enough.