Hi Michel,
Thank you for your informative comments and helpful suggestions in your earlier
post (which I happened to have deleted by accident). In any case I have a copy
of the post so I can answer your questions raised therein.
(1) I am defining the Planckian information, I_P, as the

Dear Karl,
In my reply to Sung I was dealing with the asymmetry of probability
distributions.
Probability distributions are presented on the Wikipedia page:
https://en.wikipedia.org/wiki/Probability_distribution
Don't read all this page, the beginning should suffice.
Then, the skewness is

Dear Karl,
Yes I can hear you.
About symmetry, I shall soon send you an explaining email, privately,
because I do not want to bother the FISers with long explanations
(unless I am required to do it).
However, I confess that many posts that I receive from the FIS list
are very hard to read, and

Dear Michel and Sung,
Your discussion is way above my head in the jargon and background
knowledge. Please bear with me while a non-mathematician tries to express
some observations that regard symmetry.
Two almost symmetrical spaces appear as Gestalts, expressed by numbers, if
one orders and

Dear Sung,
The formula of the Planckian information in Table 1 is intriguing.
The argument of the log_2 function was proposed in 1895 by Karl Pearson as
a measure of asymmetry of a distribution (see [1], p. 370).
In general the mean can be smaller than the mode (so the log cannot exist),
but I

Caro Sung e cari tutti,
"I think information and energy are inseparable in reality": è vero anche
in economia.
La Parte Terza--Teoria del valore: energia e informazione-- di "Valore e
valutazioni. La scienza dell'economia o l'economia della scienza"
(FrancoAngeli, Milano, 1995-1999) è