The normal methods of explanation, and the standard definitions, for 'information', such as the 'resolution of uncertainty' are especially difficult to put into practice.
As these presuppose having knowledge already comprised, and/or formed from, a large quantity of information. Such as the concepts of 'uncertainty' and 'resolution'.
How does one know they've truly learned these concepts, necessary for recognizing information, without already understanding the nature of information?
This seems to produce a recursive problem, a.k.a, a 'chicken and egg' problem.
Additionally, the capability to recognize information and differentiate it from random noise must already exist, in order to recognize and understand any definition of information, in fact to understand any sentence at all. So it's a multiply recursive problem.
Since, presumably, most members of this forum can understand sentences, how does this occur?
And since presumably no one could do so at birth, how does this capability arise in the intervening period from birth to adulthood?
’=‘ is usually used to denote strict equality, as in x = y. If you had some non-standard meaning in mind, I‘m not sure unless you spell it out explicitly.
For example, if by ‘=‘ you mean ‘often reduces to’, as in:
’pattern matching’ often reduces to an algorithm
Then you could skip the equals sign to reduce ambiguity.
If you really intended to literally equate ’pattern matching’ with ’algorithims’ then you need to actually prove it, or reference someone else who does.