Tag Archives: Andrew Wiles

The Title and its Storyline

Continued from the preceding post…

Foremost, we can’t keep from commemorating the 2016 Abel prize awarded to Andrew Wiles of Oxford University, for proving that the Fermat’s Last Theorem is indeed true (in the year 1995). Congratulations to Andrew Wiles, and Pierre de Fermat! Fermat did claim (in the 17th century) to have surmounted proving his own elegant equation by noting “I have discovered a truly marvelous proof of this, which this margin is too narrow to contain.” The methodology Andrew Wiles employed is too advanced for the time of Fermat. Inspired at the age of ten, Andrew Wiles decoded the mystery of Fermat’s Last Theorem in the year 1995, a truly uphill task that was interspersed with a humiliating pitfall that ultimately lead to the glory and catharsis, as his humbled tears rolled out upon meeting the wish.

Whether or not did he have the proof (we will never know), Fermat would have cheered the breakthrough, and recognition.

Here is my take on it:

Well, I am more excited than many, first because of the Oxford University backdrop in the recognition, but mostly because it involves the elegance and depth of Fermat’s Last theorem, and seeing it to be accurate.

I delight in the simplicity of its statement (the equation), yet the far reaching and deep insights it casts. I include the insightful cadence of this equation in my book.

The excerpt from the book, following which is the award link:

Excerpt, Pg. 56: Physical Laws of the Mathematical Universe: Who Are We? (about the book: www.magnifieduniverse.com/aboutbook)

“Fermat’s Last Theorem: An Enigma, or Not

For its blunt accuracy and transparency, even though we didn’t have a valid proof at the time it was stated, Fermat’s last theorem became a cliché mathematical citation, appearing regularly in didactic and popular genres alike.5,6 The statement is elegantly simple, but the meaning conveyed is both sharp and profound. Drafted by a French mathematician, Pierre de Fermat, in the year 1637, it states,

FigVI

              where n is the exponent of 3and up. The phrasing tells us that the sum of two exponentiations cannot give rise to an exponentiated entirety for the powers of three and up. For example, 32 plus 42 structures into 52, but 33 plus 43, in accordance with Fermat’s theorem, does not evolve into an entirety of x33-D-fold. Fermat’s equation applies for any numerical grade—in fact, tellingly, for any digital combination—as long as the power is 3 or higher.”

The award; The recognition

Cheers everyone!
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Back to the storyline, and the central points of discussions:

Universe Needing to Inflate

The abrupt inflation of universe in our cosmic history, its interrelatedness with the detection of gravitational waves, and seeing the necessity and order of the event of inflation itself

            “As enigmatic as it may sound, the scenario of expeditious growth does have healthy outlooks to support of the way we envisage the universe based on scientific judgments.”

In the Name of Science

The question of how do we amass interest and enthusiasm in science, its concepts and methodology. Then move further to have us all interested in seeking the true order of reality.

Interstellar

Do not miss out, if you like edutainment, especially with small dosages of science. You might pick up serious bits without having to try!

Grothendieck’s Deep Visions

The gravity of mathematics, and its followers: Alexander Grothendieck as an ardent devotee of anything deep and mysterious in mathematics

Continued in the next…

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