SSRN Author: Marek BerezowskiMarek Berezowski SSRN Content
https://privwww.ssrn.com/author=4073963
https://privwww.ssrn.com/rss/en-usTue, 10 Nov 2020 01:31:08 GMTeditor@ssrn.com (Editor)Tue, 10 Nov 2020 01:31:08 GMTwebmaster@ssrn.com (WebMaster)SSRN RSS Generator 1.0New: Is Our Brain a Computer?The brain, just like a computer, accumulates and transforms information. So, may it be claimed that the brain is just a very complicated computer? The author would like to ensure the reader that this is not so- the answer is negative. The brain is not a computer. It is said that due to the fact that someone died, it ended his suffering. What does this mean? Suffering can end only when the sufferer is aware of this. If the brain was a computer, a man never found out that he had died. Awareness would die with it. Unless that the brain is not a computer.
https://privwww.ssrn.com/abstract=3694112
https://privwww.ssrn.com/1959846.htmlMon, 09 Nov 2020 11:32:09 GMTNew: The ‘Twins Paradox’ Is Not a ParadoxWhen two individuals move at high speed relative to each other, each of them will say that the individual they are observing is aging more slowly. Paradox? What will they say when they meet? It depends on which one will change its reference system and go to your colleague's system.
https://privwww.ssrn.com/abstract=3630467
https://privwww.ssrn.com/1920073.htmlMon, 13 Jul 2020 08:50:11 GMTNew: Chaotic Distribution of Prime Numbers and Digits of πIn the paper the distribution of prime numbers and digits of π were presented as chaotic. The analysis was based on the amplitude spectrum plots of the prime number distribution and the amplitude spectrum plots of the π digit distribution. From the chaos of prime numbers a certain regularity emerges, similar to Ulam's spiral. It has also been shown that prime numbers are arranged just above a certain line. A similar analysis was also made for the distribution of digits of the number π. From the distribution of these digits, as well as from the nature of the amplitude spectrum, one can conclude about the chaotic nature of this distribution.
https://privwww.ssrn.com/abstract=3562793
https://privwww.ssrn.com/1909168.htmlMon, 15 Jun 2020 14:19:04 GMTNew: Consideration about Relativity of Changes without Time and Velocity. Solving the Problem of the Relativistic Shortening the Length of the PlanckThe smallest physically available range of distance is a quantum of distance, i.e. the so called: “Planck length” which will be assumed in the paper as a measure of changes. It is assumed that Planck length is the basic element (quant) of linear dimension (ie, length, distance, etc.). Space on a scale comparable to size of Planck length is grainy, quantized. This leads to developping fundamental relationship valid in the Special Theory of Relativity, without use of the concept of time and speed. The time and speed are unnecessary. It can be assumed that there is only the concept of change, rather than the concept of time. Time is only a measure of change. Introduction quantum distance solves the problem of reducing the object length when it is equal to the Planck length. This is shown at the end of this paper.
https://privwww.ssrn.com/abstract=3583104
https://privwww.ssrn.com/1899059.htmlTue, 19 May 2020 17:11:46 GMTNew: Journey to the Moon and the Sun on a SnowflakeThe article shows that even a small number of iterations give a very large length of the Koch Curve. As examples, the distance from the Earth to the Moon and from the Earth to the Sun was considered.
https://privwww.ssrn.com/abstract=3583076
https://privwww.ssrn.com/1898987.htmlTue, 19 May 2020 15:41:49 GMTNew: Negative Sums of Positive Numbers, About Grandi’s Series and a Certain Recurrence of Prime NumbersAlready in the 18th century, Euler was known to the following account: ∑n = −1/12 (Ramanujan summation). The above infinite sum of natural numbers applies to certain physical issues, including quantum field theory and string theory (e.g. Casimir effect). From a mathematical point of view, it is associated with the so-called Riemann's zeta function. This article derives the above relationship without referring to the Riemann zeta function and the Ramanujan summation method.
https://privwww.ssrn.com/abstract=3560560
https://privwww.ssrn.com/1887640.htmlMon, 20 Apr 2020 11:39:33 GMT