The Elementary Four values of Gayane Logic - B, C, D, E.
Humanitarian and “technical” logic.
Creating three-digit, four-digit, five-digit, and n-digit systems is not a difficult task. For these systems, it is easy to write functions for addition, exponentiation, cyclic operations, and various types of inversions. These systems can be made basic for computers.
Yes, these systems can become the logic of the computers created for them. However, when we say "logic", we primarily mean human thinking. Logic, as we know it, is the result of human mental activity and is a science separated from philosophy. And in our world, as far as we know, only people philosophize.
Thus, logic, as we understand it, must be humanitarian, have its own philosophy at a deep level. Otherwise, we will get a technical system of symbols, operators and operands for devices and virtual systems. Without diminishing the role of technical systems, let us move on to Gayane Logic, or rather, to its four-valued system - GL4.
At a fundamental level, Gayane Logic 4 is also a polarized logic.
In classical logic, there are only two statuses of truth: "true" and "false". But such a division into two extremes cannot satisfy humanity, because practice gives us other answers. I will get straight to the point. Gayane Logic does not soften this polarization, but on the contrary, makes it even more pronounced. However, it offers a new approach - it introduces another status, which allows us to consider intermediate values.
Unlike other logical systems that use uncertainty or degree of certainty to obtain intermediate and ambiguous answers, Gayane Logic excludes these values at the elementary level. We are convinced that in areas related to quantitative data, it is necessary to use mathematics and its tools. Mathematics was created and developed precisely on the basis of quantitative data, which makes it the only and indispensable tool in this area. In Gayane Logic, there is no separate value of uncertainty. Ambiguity in this system is achieved through a combination of (fundamental) elementary values.
Elementary values of GL4.
Elementary values of GL4.
GL4 is a four-digit implementation of Gayane Logic, which has two states, each of which is divided into two opposite segments. These two states - truth and inevitability - form the elementary values of Gayane Logic through their positive and negative components.
Let's give examples.
E. (IT) Inevitable, unconditional, unavoidable, inescapable TRUE.
It's night in New York, so it's day in Yerevan.
5+5=10. These two statements are always true, at least in our known world. Even if we use another number system instead of decimal, the sum of 5 and 5 will be equal to the number that is equivalent to 10 in this system.
D. (PT) Probable, possible, conditional, randomly, likely TRUE.
3) Today I was riding the subway. 4) The capital of the Republic of Armenia is Yerevan. 5) I met my classmate on the way.
Yes, judgment 3 was not inevitable, but it is 100% true in any case. I could have not used the subway, but I did. Yerevan is indeed the capital of the Republic of Armenia, this is 100% true. But the capital of the Republic of Armenia could have been another city.
I met my classmate on the way, this is also 100% true, but we met by chance. If we assume that there are no accidents and everything is predetermined, then for me it was still an accident. As you may have noticed, there is no concept of "degree of truth" in GL4. Each elementary statement is either 100% true or false. As for uncertainties, they are considered within the framework of Gayane's logic, which we will discuss later.
C. (PF) Probable, possible, conditional, randomly, likely FALSE.
7) Today I left the city. 8) Armavir is the capital of the Republic of Armenia. 9) Today I met my teacher. These statements are not true, they are false. However, under certain circumstances they could be true. Today I could leave the city. Armavir could be the capital of the Republic of Armenia. Today I could meet my teacher.
B. (IF) Inevitable FALSE, (impossible, unfeasible, excluded, impracticable).
10) Socrates is Kant's student. 11) 5 + 5 = 1. 12) Washington is the capital of the Roman Empire.
Even if Socrates had come to Prussia from Greece, the time factor would not have allowed him to meet Immanuel Kant, let alone become his student. The same applies to the city of Washington and the Roman Empire. The incompatibility of space and time makes it impossible for Washington to have been the capital of the Roman Empire. No matter what we call numbers, no matter what system of calculation we choose, 5 + 5 equals the number we have agreed to call ten.
The status of inevitability has two ranges I, P. Inevitable – I (Inevitable, unconditional). Not inevitable – P (Probable, possible, conditional, accidental). The status of truth: also two ranges T, F - True, False.
I = Inevitable, unconditional, unavoidable, inescapable. P = Probable, possible, conditional, randomly, likely. F = False, lie, incorrect, untruth. T = True, just, veridical, correct.
(IF) - B (PF) - C (PT) - D (IT) - E
| |F|T| | |-+-| |I|B|E| |P|C|D|











