15990 - Perfection and completeness
N. Lygeros
Translated from the Greek by Athena Kehagias
Quite often we assume that happy is he, who is complete. The mathematics have solved this problem since 1931, there is no completion. It is in fact the incompleteness theorem. The other thing that we say very often is that “we are people and we are not perfect.” But nobody is saying that we are perfect, but why should we assume that people can not produce perfection? So definitely Archimedes was not perfect, but he found π, this is perfect and we can not say anything else. Therefore the idea is, when we realize that we are nothing, we can produce a project. How? What is the figure? The figure is very simple, is related to the mosaic. When you have a single tile its a monochrome. When you put multiple monochrome tiles, they all create a mosaic which is colorful.If you were to ask in every chip who has multicolourism- polichrome? Nobody. It is only due to placing them whithin the choros, and then later in chronos, that something that is colorful is created . Which did not exist in entity at a single unit level. This means what.? It’s just like Leibniz did it when he talked about monadology. The unit sometimes is so important that we do not understand something very simple that double, the triple etc could have properties that can not be found in the unit. So when we give great importance to the unit and we believe that this is the panacea, is definitely some qualities that don’t exist anymore and they have no meaning.