In general, a homogeneous coordinate system is one where only the ratios of the coordinates are significant and not the actual values.
This procedure does not always make sense, for example there are no coordinate curves in a homogeneous coordinate system.
Heterogeneous computing systems present new challenges not found in typical homogeneous systems.
Indeed much more can be said about the correspondence between homogeneous systems of imprimitivity and cocycles.
This simplified definition holds for a homogeneous and isotropic system.
From this viewpoint, the null space of A is the same as the solution set to the homogeneous system.
Metallasilsesquioxanes have found wide use as catalysts for both homogeneous and heterogeneous systems.
The homogeneous system is much easier to design and manage.
Dynamic equilibria can also exist in a homogeneous system.
This means that, for homogeneous systems, the enthalpy is proportional to the size of the system.