Introduction to Kertsopoulos' invention: "Magnetic System of Multiple Interactions" with one word: "MAGNAPEIRON"

How "magnetic containment" relates to the invention and the state of the art.
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Introduction to Kertsopoulos' invention: "Magnetic System of Multiple Interactions" with one word: "MAGNAPEIRON"

Post by georkertsopoulos » Mon May 27, 2019 7:19 pm

Introduction to Kertsopoulos' invention: "Magnetic System of Multiple Interactions" with one word: "MAGNAPEIRON"

More than 96 completely new types of polarities and interactions are carried out by the invention "Magnetic System of Multiple Interactions" which is patented worldwide in more than 11 countries. Instead of observing a unique interaction between opposing magnetic interactions, we can construct multiple polarities interchangeable according to the spacing between constructions and thus obtain interchangeable multiple interactions as a result of polarity interactions. The opposing interacting structures repel each other with the like polarity in the greater distance and when approaching they attract strongly each other and at the critical distance where the poles are "like" and "unlike" at the same time, staying motionless in "unstable balance". The state of the art does not have three interactions depending on the variable distance, it can not change the polarity and hence the interactions and can not have like and unlike poles at the same time.

Also, the opposite of the above three interactions occurs with a change of polarity in the symmetry of the constructions, and at the longest distance we can see the structures attracting strongly each other and when they come closer they strongly repel one another, having a gap of air unable to unite and at the critical distance where the poles are unlike and like at the same time stay immobile on a "stable balance". The state of the art can not simultaneously hold unlike and like as polarity.

In addition, the three interactions with their opposites can be constructed with two more interactions and become 5 and if we continue to add two, we can obtain 7 or 9 or 11 or 13 interactions and even more ...

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