S
Shantanu Das
Researcher at Bhabha Atomic Research Centre
Publications - 164
Citations - 3488
Shantanu Das is an academic researcher from Bhabha Atomic Research Centre. The author has contributed to research in topics: Fractional calculus & PID controller. The author has an hindex of 24, co-authored 152 publications receiving 2925 citations. Previous affiliations of Shantanu Das include University of Chicago & Jadavpur University.
Papers
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Journal ArticleDOI
An Online Identification Algorithm to Determine the Parameters of the Fractional-Order Model of a Supercapacitor
TL;DR: An online FOM for supercapacitors is presented, which employs a two-stage least square fitting algorithm for identifying the parameters in real time and is implemented using Grunwald–Letnikov derivative in a DSP and the effectiveness is verified.
Journal ArticleDOI
Analytical Formulation for Power, Energy, and Efficiency Measurement of Ultracapacitor Using Fractional Calculus
TL;DR: This paper has focused on fractional calculus-based analytical formulation for power, energy, and efficiency measurement of ultracapacitor and has deployed an upgraded model of the ultracAPacitor, which provides a better estimation of its energy efficiency.
Journal ArticleDOI
Time independent fractional Schrödinger equation for generalized Mie-type potential in higher dimension framed with Jumarie type fractional derivative
TL;DR: In this article, the authors obtained approximate bound state solutions of an N-dimensional fractional time independent Schrodinger equation for a generalised Mie-type potential, namely, V(rα)=Ar2α+Brα+C.
Proceedings ArticleDOI
Revisiting oustaloup's recursive filter for analog realization of fractional order differintegrators
TL;DR: The Oustaloup's recursive filter which gives a band-limited realization of FO elements is the focus of the present study and its another variant, commonly known as modified OustAloup's filter is analyzed in the same light, so as to produce low order analog approximation of FO differ-integrators.
Analytic Solution of Linear Fractional Differential Equation with Jumarie Derivative in Term of Mittag- Leffler Function
TL;DR: In this article, the authors developed an algorithm to solve the linear fractional differential equation composed via Jumarie fractional derivative in terms of Mittag-Leffler function; and show its conjugation with ordinary calculus.