hi all~
How to evaluate the performance of a set of nonorthogonal basis?
Like one in Hibert space which is most likely to be a nonorthongal set.
Does it have any advantage compared with orthogonal ones in any aspects?
i dont even know every to get started:confused:
HallsofIvy
Jul30-08, 08:25 AM
I am not sure what you mean by "evaluate". "Orthonormal" bases have the nice property that the coefficient of the basis vector \vec{e}_i in the expansion of \vec{v} is just the dot product: \vec{e}_i\cdot\vec{v}.
Other than that, there is nothing special about orthogonal bases.
marshall.L
Jul30-08, 09:52 AM
I am not sure what you mean by "evaluate". "Orthonormal" bases have the nice property that the coefficient of the basis vector \vec{e}_i in the expansion of \vec{v} is just the dot product: \vec{e}_i\cdot\vec{v}.
Other than that, there is nothing special about orthogonal bases.
thx:)
i mean whether there is any kind of measurement which can be used to evaluate any aspect of a set of basis vectors.
i.e. we can use reconstruction error to evaluate the descriptive ability of a set of basis vectors.(The only way i know)
i havnt learned much on this aspect and i have searched on wikipedia for a long time with no progress.:frown:
i dont know whether i have made my question clear.
sry for my poor eng.:biggrin: