In fact, the past is a closed curve. Present(s) is(are) singularity(ies) in the curve. Singularities can be avoided by going around and leaving all the singularities outside. The singular present will be used for a single universe while multiple presents will be used for the multiverse. Suppose that there are infinitely infinite presents. The curve... Continue Reading →
Goldbach Conjecture
According to Golbach's conjecture, every even greater than 2 is the sum of two primes. Here we experimentally demonstrate that it is only true if there are infinitely many primes. Theorem: There are infinitely many primes. Proof: We prove this using Goldbach conjecture. Suppose a finite set of prime numbers P = {p1, p2, …,... Continue Reading →
د اددونو علم
په ساده ټکو کښې د اددونو علم د کزرتی اددنو (۱، ۲، ۳، ۴، ۵، ...) زدکړی ته واې. مشؤر ریاذی پوه لیپولډ کرانیکر (۱۸۲۳-۱۸۹۱) یو زل ویلی وو چه کزرتی اددونه خدائ جوړ کړی دی، دا باکی خو د انسان تخلیک دئ. یو تن به دا اوای چه د اددونو علم به ډیر اسان... Continue Reading →
Uncertainty Relation (UR)
I don't know why My predictions have uncertainties And that is 1 In quantum mechanics though UR has a minimum And that is half-hbar hbar, therefore, is 2 Note the 2 It is the first prime Note again the 2! In language ! is for feelings It is factorial in math though hbar, therefore, is... Continue Reading →
Universe Is Language
Universe is a language And that language is everything And let everything be E And geometry, upto first letter, is gravity And let gravity be g g is in E And, upto first letter, that math is mass And let mass be m m, too, is in E And then so on E is, thus,... Continue Reading →
Seven Proofs of Riemann’s Hypothesis: A Short Story
In Mathematics, Riemann's hypothesis (RH) is one of the unsolved problems. It is one of the Millennium Prize Problems. Whoever solved this problem would be awarded one million dollars by Clay Mathematics Institute. It states that all the non-trivial zeros of the ‘zeta function’ lie where the real part of the argument of the zeta... Continue Reading →
Theorem of the Day
Let PNT be the prime number theorem and let FLT be Fermat last theorem, then PNT implies FLT and FLT implies PNT. If this theorem were fully proved it would bridge algebraic number theory and analytic number theory. According to FLT xa + ya = za has no solution for a > 2 According to... Continue Reading →
What Is A Question?
This post is based on my article at https://arxiv.org/abs/1006.2481. References therein. According to Richard T. Cox, a question is the set of assertions that answer it. Following R.T. Cox, we identify a question with a topology on a given set of irreducible assertions. It appears that a question is expressed in the form of multiple... Continue Reading →
Can We Define God?
Any definition of God would is circular. If He is defined as the Creator of the universe, then who created Him. Or if He is someone who watches everyone, then who watches Him. This definition is in plain text. This kind of definition given in the form of a statement is subtle. A more workable... Continue Reading →
More On Afterlife
In an earlier post, we prove the fundamental theorem of life and death (FTLD). Here we would like to further expand on it. Before we speak of the afterlife, a concrete definition is required of what life and death are. As stated in FTLD. life and death are not separate entities. They come in different... Continue Reading →
Mr. Monologue 