Analytical model of inverse memelement with fractional order kinetic (2022)

 

Title              :   Analytical model of inverse memelement with fractional order kinetic

Researcher       : Banchuin, R.
Department      : Faculty of Engineering & Graduated School of IT, Siam University, Bangkok, Thailand
Email                     :  rawid.ban@siam.edu

Abstract            :  In this work, the analytical model of inverse memelement with fractional order kinetic has been proposed. The classical yet noncontroversial Caputo fractional derivative has been adopted for modeling such fractional order kinetic due to its simplicity yet accuracy. Based on the proposed model, the analysis of fractional order kinetic inverse memristor has been thoroughly performed where both nonperiodic and periodic excitations have been considered. Analytical formulations of the related parameters, for example, the rate of changes of inverse memristance, area of inverse memristance loop, and area of pinched hysteresis loop, and so on, have been performed. The extension of the proposed model to the fractional inverse memelement has been performed where the fractional inverse memristor has been analyzed. We have found that the inverse memristor still behaves in an opposite manner to the memristor even with the fractional order kinetic. All obtained results have been found to be intuitively applicable to any inverse memelement. The equivalent circuit models of both fractional inverse memristor and fractional inverse memelement have also been presented. This work provides a comprehensive understanding on both inverse memelement with fractional order kinetic and fractional inverse memelement. The realization of the emulator of such inverse memelement with fractional order kinetic and the fractional inverse memelement emulator has been found to be interesting opened research questions.


Link to article  :  International Journal of Circuit Theory and Applications, 2022, 50(7), pp. 2342–2377. https://doi.org/10.1002/cta.3264

Journal            :  International Journal of Circuit Theory and Applications / in Scopus

Bibliography     : Banchuin, R. (2022). Analytical model of inverse memelement with fractional order kinetic. International Journal of Circuit Theory and applications, 50(7), 2342-2377. https://doi.org/10.1002/cta.3264


ฐานข้อมูลงานวิจัย มหาวิทยาลัยสยาม : https://e-research.siam.edu/kb/analytical-model-of-inverse/