1,435 reputation
645
bio website
location India
age
visits member for 3 years
seen 4 hours ago

I am Iyengar, and I hail from South India, from a rural city. I have completed my engineering in computer science, but I was always interested in advanced physics, mathematics, philosophy and cognition and evolutionary theories. Because I barely have any teacher along with me to teach me, and no proper library, I did quite a bit of self learning from the internet, and roughly learned many diverse concepts, starting from Quantum mechanics, to Algebraic geometry, Galois theory, philosophy and cognition. I didn't have a path so I dumped down all the knowledge that was available before me. I had generated some ideas to solve Millennium prize problems and some ideas in Quantum mechanics, which have to be made concrete, and since I didn't have a proper channeling, all my ideas and work went unnoticed.

Nevertheless I continue to go further, seeking knowledge. Knowledge is power.


Mar
13
comment Can someone explain Gödel's incompleteness theorems in layman terms?
@oxinabox, Very good answer for layman. It's absolutely understandable and please continue to go further posting such things. :)
Oct
3
comment Concrete Example of the Birch and Swinnerton-Dyer Conjecture
+1. Why such a beautiful , clear, explanatory answer of Alvaro Lozano-Robledo got neglected ? . Very informative, the PCMI lecture book written by Alvaro Lozano - Robledo, is very interesting and the most elegantly written article I ever saw , which gives a gentle introduction about the conjecture for almost naive persons. Example : Me . Here is it . I downloaded it for free, but may be it got removed.
Oct
3
comment Concrete Example of the Birch and Swinnerton-Dyer Conjecture
+1. Why such a beautiful , clear, explanatory answer got neglected ? . Very informative, the PCMI lecture book written by Alvaro Lozano - Robledo, is very interesting , which gives a gentle introduction about the conjecture for almost naive persons. Example : Me . Here is it . I downloaded it for free, but may be it got removed.
Sep
6
comment An elegant non-technical account on the work of Joseph Fourier.
@MichaelGreinecker : Elegant Master !! , very great link sir. Why can't you post it below ? . Thanks a ton.
Aug
24
comment Is analytic capacity continuous from below?
@timur : Thanks a lot sir. But everyone are not like you, people are narrow minded. Sometimes, due to people like you, I will realize that not everyone are brusque, there are quite a few who are ethical .
Aug
20
comment Popular math books with depth
Thank you FYI .
Aug
20
comment Popular math books with depth
Thank you FYI .
Aug
16
comment If $a^2$ divides $b^2$, then $a$ divides $b$
+1. Really very simple proof, that makes no appeal to the Funda-Theorem of Arithmetic.
Aug
13
comment Apollonius' circle
My dear, its an assumption ( I think so, may be or may not be, the other MO users will step within a few time and help you in detailed manner ) . First you need to assume that they intersect at some point and then proceed further. In order to prove something, you need to assume something. BTW, its good that you mention the theorem name and link if possible.
Aug
13
comment A tricky but silly doubt regarding the solutions of $x^2/(y-1)^2=1$
@J.M. : Yes sir. But tricky for me, silly for you ( learned people ) , is the meaning I wanted to express.
Aug
13
comment A tricky but silly doubt regarding the solutions of $x^2/(y-1)^2=1$
It was really useful. I never thought it that way. Your explanation was clear and clean. It reflects your experience and grip in mathematics. Thank you again.
Aug
13
comment A tricky but silly doubt regarding the solutions of $x^2/(y-1)^2=1$
Thank you, it was nice .+1.
Aug
13
comment A tricky but silly doubt regarding the solutions of $x^2/(y-1)^2=1$
It was really good one. +1
Aug
13
comment A tricky but silly doubt regarding the solutions of $x^2/(y-1)^2=1$
Thank you for your information. +1.
Aug
13
comment A tricky but silly doubt regarding the solutions of $x^2/(y-1)^2=1$
Thank you. It was useful and good. +1.
Aug
13
comment A tricky but silly doubt regarding the solutions of $x^2/(y-1)^2=1$
@anon : Thank you, I always have trouble with homophones.
Aug
13
comment A tricky but silly doubt regarding the solutions of $x^2/(y-1)^2=1$
@RahulNarain : Thank you for your edit.
Aug
13
comment On Albanese varieties
@MakotoKato : Yes sir, it happened to me many times. Many people here are filled with grudges and I think you too know it and experienced it . But Thank you for your response. We never care about the reputation, and we should make it explicit. Either they must change or we must. I think the latter is better.
Aug
13
comment On Albanese varieties
@MakotoKato : Its common in MO and Math.SE , to down-vote without any reason. I have shouted, requested , begged and did everything , to explain the reason for down voting , but no one cared. Apart from reducing the reputation, if users post the reason its useful for constructing good questions next time. But I don't know why everyone is not that CIVIC. Thank you sir.
Aug
7
comment Rain droplets falling on a table
+1, Really salute to your efforts in posting such a lengthy answer.