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The fractional derivative is a natural generalization of the classical derivative to an arbitrary real or complex order.

It has applications in pure and applied mathematics, physics, engineering, chemistry,  biology and even in economics.

Recent developments in the field show that fractional derivatives successfully extend the existing results.

  Fractional Calculus


Departmental Seminars

Speaker - Neil Moore, Graduate student

  1. Introduction to Fractional Calculus - March 20, 2013
  2. The Riemann- Liouville Derivative - April 3, 2013 
  3. The Caputo Derivative - April 24, 2013