Class describing a cylindrical coordinate system based on eta (pseudorapidity) instead of z. The base coordinates are rho (transverse component) , eta and phi Phi is restricted to be in the range [-PI,PI) @ingroup GenVector
Double32_t | fEta | |
Double32_t | fPhi | |
Double32_t | fRho |
Set internal data based on an array of 3 Scalar numbers
get internal data into an array of 3 Scalar numbers
Set internal data based on 3 Scalar numbers
get internal data into 3 Scalar numbers
setters (only for data members) set the rho coordinate value keeping eta and phi constant
set all values using cartesian coordinates
scale by a scalar quantity a -- for cylindrical eta coords, as long as a >= 0, only rho changes!
Exact component-by-component equality Note: Peculiar representaions of the zero vector such as (0,1,0) will not test as equal to one another.
{return !(operator==(rhs));}
============= Compatibility section ================== The following make this coordinate system look enough like a CLHEP vector that an assignment member template can work with either
{ return X();}
============= Specializations for improved speed ================== (none) ====== Set member functions for coordinates in other systems =======