A hilbert transform.. plese please... I am sure it msut mean soemthing economy.... :)
A pleasure I therefore claim to show, not how men think in myths, but how myths operate in men's minds without their being aware of the fact. Levi-Strauss, Claude
A zero Lyapunov Exponent means no information is gained or lost.
Therefore no information is gained by using the Hilbert Transfrom.
je je je je / 8^0
In this way a certain output is afunctional of the input and not a pure linear relation...
I will start int his way to make the problem look more like the real world.
Problem is thsi works ina purely amterialsitic world.. but material are mostly irrelevant.. except fro energy..
So maybe thismodel coudl eb useful to energy..
It was a weird though... in anyc ase.
a pleasure I therefore claim to show, not how men think in myths, but how myths operate in men's minds without their being aware of the fact. Levi-Strauss, Claude
I want a non-local functional of the input where it can describe that the dependence of the different outputs is not linear.
How do you see the Hilbert Transform accomplishing this?
I'm not being snarky here. I'm really interested.
So variblae Output z= Hilbert[f(Inputy)](on INput y)
So the output is actually an integral over the dumb variable y and where y_o is the actual value of the input being y_o the varialbe after the integral.
This is what I mena by non-local in the sense that output z depends on all possible values of input y.
it is not local because the funcionality is not linear at all.. SO non-local in the sense of the dependence... although I do not know if this would be of any use at all... do outputs may depend on all possible variable of the input?
I am also interested in how the economic sector "transportation" is modelled. With so many economists in the house, it would be depressing (but maybe not entirely surprising) if nobody could answer that question according to current economic practice. Those whom the Gods wish to destroy They first make mad. -- Euripides
