05/24/2008, 08:44 AM
Gottfried Wrote:Ah -yes. If he matrix-operator is triangular, then the diagonal is the sequence of consecutive powers of f'(0)/1! . So, in matrix-lingo it is the statement:
- assume functions f and g having their associated matrix-operators FM and GM triangular (f(0),g(0)=0)
- Then both operators have sets of eigenvalues, which consist of the consecutive powers of base-parameter, say u for FM and v for GM
- if f°g = g°f then the operators FM and GM commute.
- if FM and GM commute, their eigenvectors are the same (statement extrapolated from finite matrices)
- so the only different characteristic of FM and GM is the value of their second eigenvalue u^1 and v^1
- but v can be expressed as x'th power of u: v=u^x (or if v is negative and u is positive u=v^y)
- this exponent of the eigenvalue u (resp v) is just the height-parameter, so g=f°x or f=g°y
Yes! (However "height" sounds strange when used for iteration of functions which are not exponentials)
Quote:[*] remark: this argumentation seems to include, that f and g have the same base-parameter
There is no base. \( f \) and \( g \) are arbitrary analytic functions with development and fixed point at 0.
