Partitions: Exact Approximations

… there is something strange going on with Primes
Paul Erdös


Never mind the mock theta, Ramanujan’s gap, Namagiri dreams.


When Srinivasa Ramanujan wrote to G. H. Hardy in the 16th of January 1913, he had some remarkable formulas in that letter.  So remarkable are some of his formulas that mathematicians have been studying Ramanujan’s notebooks of formulas for new mathematical insights to this day, more than a hundred years later.
I beg to introduce myself to you as a clerk in the Accounts Department of the Port Trust Office at Madras… I have no University education but I have undergone the ordinary school course. After leaving school I have been employing the spare time at my disposal to work at Mathematics. I have not trodden through the conventional regular course which is followed in a University course, but I am striking out a new path for myself. I have made a special investigation of divergent series in general and the results I get are termed by the local mathematicians as “startling”. 
Hardy invited him to England because some of the formulas “had to be true, because no one could have the imagination to make them up”.   But there were no proofs.  However, when this poor vegetarian Indian Hindu came to England, eventually Hardy showed Ramanujan (thru Littlewood) that his formula on Primes was not EXACTLY correct. So Ramanujan had to bend to Hardy and work on his proofs of some of his formulas, so when they tackled the function of Partitions P(n), Ramanujan with the help of Hardy got to point where they “cracked” Partitions (and could prove it). They developed a direct formula that computed the number of partitions pretty accurately, and at the limit (infinity) it was “perfect” — and, could by truncating the number for high partition number to an integer could guarantee to be exact: since the number of partitions of integers is an whole number (i.e., the real number series “formula” converges with an deceasing error rate). Together they “cracked” the problem where neither man could do it alone. Ramanujan supplied the “intuition” (the finding of the hidden pattern) and Hardy provided the rigor to explain why the pattern is true.  The method they created, in this instance, was called the “circle method” — and it has been used ever since by numerous mathematicians for various other results.

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The Functional

Paul Adrien Maurice Dirac

It worked.  It served it’s function.

Actually, to be technical about it, it was a functional, not a function. Big distinction. Never mind why.  It’s works.————  ?

Dirac’s Equation

But Why?

What did it imply?  Well, something very profound.  They didn’t want to believe it at first.

“Where is my Dirac?” — Albert Einstein


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Me!? Arrogant..

Although most people do not take glee in being perceived as being “arrogant,”  however, many male Rationals will admit they are not particularly bothered as being perceived as arrogant – well, because they are arrogant. No sense in denying the facts. Female Rationals sometimes get a moniker (deserved or undeserved – depending on your political religion) such as the Iron Lady, because of this perceived arrogance. With that arrogance, I suspect political religion was why Hollywood did such a hatchet job on Margaret Thatcher in the now playing biographical movie.

Rationals are wont to think of themselves as the prime movers who must pit their utilitarian ways and means against custom and tradition, in an endless struggle to bring efficiency and goal-directness to enterprise, an attitude regarded by many as arrogant” [Please Understand Me II, page 169]

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