• Fractional calculus is a branch of mathematical analysis that studies the several different possibilities of defining real number powers or complex number...
    51 KB (6,546 words) - 21:23, 29 October 2024
  • mathematical analysis, initialization of the differintegrals is a topic in fractional calculus, a branch of mathematics dealing with derivatives of non-integer...
    2 KB (378 words) - 00:10, 13 September 2024
  • In fractional calculus, an area of mathematical analysis, the differintegral is a combined differentiation/integration operator. Applied to a function...
    11 KB (1,553 words) - 19:17, 4 May 2024
  • definitions of the fractional Laplace operator". Fractional Calculus and Applied Analysis. 20. arXiv:1507.07356. doi:10.1515/fca-2017-0002. "Fractional Laplacian"...
    3 KB (552 words) - 04:24, 29 August 2024
  • integrator as part of the control system design toolkit. The use of fractional calculus (FC) can improve and generalize well-established control methods...
    3 KB (380 words) - 08:13, 29 September 2023
  • went further and defined fractional power of p, thus establishing a connection between operational calculus and fractional calculus. Using the Taylor expansion...
    16 KB (1,734 words) - 04:52, 12 August 2024
  • time-scale calculus is a unification of the theory of difference equations with that of differential equations, unifying integral and differential calculus with...
    13 KB (1,756 words) - 07:25, 10 June 2024
  • In mathematics, the Caputo fractional derivative, also called Caputo-type fractional derivative, is a generalization of derivatives for non-integer orders...
    15 KB (2,321 words) - 16:13, 26 September 2024
  • Prabhakar function (category Fractional calculus)
    Later the function was found to have applications in the theory of fractional calculus and also in certain areas of physics. The one-parameter and two-parameter...
    7 KB (1,290 words) - 14:55, 22 January 2024
  • Fractal derivative (category Non-Newtonian calculus)
    contrast to the similarly applied fractional derivative. Fractal calculus is formulated as a generalization of standard calculus. Porous media, aquifers, turbulence...
    15 KB (2,939 words) - 12:25, 23 August 2024