...
...
Next Story

Vigyan Yuva awardee Mahesh Ramesh Kakde: Studying equations, not solving them

The number theorist has proved various conjectures relating functions and other objects attached to polynomial equations

Published on: Aug 24, 2024 04:16 PM IST
Advertisement

Mahesh Ramesh Kakde, winner of this year’s Vigyan Yuva Shanti Swarup Bhatnagar award for Mathematics, is a number theorist at the Indian Institute of Science, Bengaluru, who studies polynomial equations. He explains how, rather than look for solutions to the equations, he studies the relations between different objects attached to the equations.

Vigyan Yuva awardee Mahesh Ramesh Kakde
Vigyan Yuva awardee Mahesh Ramesh Kakde

What I do

My area of research is algebraic number theory. The main goal of number theory is solving polynomial equation for integer solutions. The most familiar equation of this kind is the Pythagoras theorem, which can be expressed as x² + y² = z², and we know there are infinitely many integer solutions for (x, y, z), which are known as Pythagorean triplets.

Other equations of this kind, however, can be very difficult. For example, take the Fermat equation ‘xⁿ + yⁿ = zⁿ’. Today, it has been proved that no integer solutions exist for the Fermat equation if n is greater than 2. But to find out whether a solution exists or not, mathematicians could not have proceeded by just checking in the hope of hitting upon a solution. Since there are infinitely many integers, we cannot simply substitute values of x, y and z and keep checking if there is a solution. Even if we checked for 100 billion values and found no solutions, it would not mean there are no solutions.

How I do it

What we need is a conceptual way of studying these polynomial equations. It is not easy to describe these concepts in very simple terms, but we study these equations by attaching different mathematical “objects” to them. Objects are different kinds of mathematical structures that can be algebraic, analytical, or complex functions called L-functions.

One can attach some geometric objects and some algebraic objects to the same equation. Now, rather than look for integer solutions, we observe these objects. If there is a solution, these attached objects will satisfy some properties, so you would also expect these objects to be related to each other. And that’s the kind of thing that I work on—proving the relationships between different kinds of objects.

Some of the objects we attach to equations are L-functions, class groups, and Selmer groups. There are very general conjectures relating L-functions and class groups, or Selmer groups. I have proved some of these conjectures over the years.

A subtopic that I work in is called Iwasawa theory. It is a systematic way of proving conjectures relating to L functions and arithmetic. My first major work proved the non-commutative main conjecture of the Iwasawa theory. More recently, I proved (jointly with Samit Dasgupta from Duke University) the Brumer-Stark conjecture.

 
ABOUT THE AUTHOR
Kabir Firaque

Puzzles Editor Kabir Firaque is the author of the weekly column Problematics. A journalist for three decades, he also writes about science and mathematics.

Check India news real-time updates, latest news on Hindustan Times and more across India.
Check India news real-time updates, latest news on Hindustan Times and more across India.
SHARE THIS ARTICLE ON
Hindustantimes wants to start sending you push notifications. Click allow to subscribe