fractals and superfunctions for f(x,y) ?

[tommy1729]

Consider the function f(x,y) being a mapping from R^2 to R^2 such that

f(x,y) = ( taylor1(x,y) , taylor2(x,y) )

where taylor1 and taylor 2 do not satisfy the cauchy riemann equations , hence f(x,y) is not isomorphic to an analytic function f(z) with real x and im y.

f^[2](x,y) = ( taylor1(f(x,y)) , taylor2(f(x,y)) ) = ( taylor1( taylor1(x,y),taylor2(x,y) ) , taylor2( taylor1(x,y),taylor2(x,y) ) )

and in general for t >= 0 

f^[0](x,y) = (x,y)
 
f^[t](x,y) = ( taylor1( f^[t-1](x,y) ) , taylor2( f^[t-1](x,y) ) )

(with some abuse notation sorry )

How about fractals and superfunctions for these f(x,y) ?

Maybe take taylors to be real polynomials to start.

many analogues must exist to ideas from complex dynamics.

Leo considered a rotation.

fixpoints might occur.

but also saddle points.

inversion might be troublesome : e.g. x^2 + y^2 = 1 has uncountable solutions.

In particular consider the case from a region A to region B by f(x,y) such that the mapping is injective.

btw i use taylor to avoid piecewise functions ( even c^oo can be piecewise ! ) which imo is too general.

So basically dynamics of mappings on a plane that are injective but not holomorphic or antiholomorphic.

it relates to dynamics , chaos and differential equations ofcourse.

but i want to know what you think and know. 

the semi-group property is slightly desired 

regards

tommy1729