Article Details

Study of Error Estimate of Fractional Differential Equation by Mobius Change | Original Article

Anil Saini*, in Journal of Advances and Scholarly Researches in Allied Education | Multidisciplinary Academic Research

ABSTRACT:

The Mobius transformation of the fractional differential equation (Riccati type) is used to create updated solutions for any non-linear fractional differential equations. Fraction operators are used as modified Srivastava-Owa fractal within the unit disk. I continued to take revenge by providing this problem of biological, economic and physical problems. Integration and separation in broken order reflects an increasing space for real problem both in theory and in implements. In the analysis of fractional integration, Euler followed the first phase. Liouville and the Swedish mathematician Holmgren were instrumental in expanding the area of fractions in 1865. Today there are different types of fractional integral operati, ranging from types with divided differences to types with infinite sums. The Riemann-Liouville operation remains the most used after fractional integration is completed.3 Caputo described a useful way to obtain a derivative of a function.