If A is stronger than B and B is stronger than C, in general A is considered stronger than C.
However, it may not be established. For example, rock, paper, scissors game.
Rock wins Scissors, Scissors wins Paper, but Rock loses to Paper.
This is a three-part relationship that there are three snakes, a snake A bites a snake B's tail, a snake B bites a snake C's tail, and a snake C bites a snake A's tail.
In other words, the ordered rows are not straight, but they are bent, connected, and annular.
In a world with such a ring structure, common sense in a world with a straight structure hardly goes to pass.
If a rabbit and a turtle race at a track in a stadium, no matter how much a rabbit overtails a turtle, what is in front of a rabbit is always a turtle.
Also, in logic with a circular structure, a proposition is established that is true and false.
That is, contradiction is allowed.
There is a complete sword. That sword will penetrate anyhow anyhow.
There is also a perfect shield. That shield will play anything anyway.
And if sword and shield collide, sword penetrates the shield and shield plays sword.
Like two snakes engaging each other's tail.
The identity of the inconsistent contradiction is a snake biting its own tail.