Exponential Quadrature Rules for Linear Fractional Differential Equations

The generalized di!erential quadrature rule (GDQR) proposed recently by the authors is applied here to solve initial-value di!erential equations of the 2nd to 4th order. Di!erential quadrature expressions are derived based on the GDQR for these equations. The Hermite interpolation functions are used

## Abstract The generalized differential quadrature rule (GDQR) proposed here is aimed at solving high‐order differential equations. The improved approach is completely exempted from the use of the existing __δ__‐point technique by applying multiple conditions in a rigorous manner. The GDQR is used

An automatic quadrature method is presented for approximating fractional derivative D q f (x) of a given function f (x), which is defined by an indefinite integral involving f (x). The present method interpolates f (x) in terms of the Chebyshev polynomials in the range [0, 1] to approximate the frac