Quadrature rule for Abel’s equations: Uniformly approximating fractional derivatives

A numerical method to solve higher-order fractional differential equations

Almeida, Ricardo
Bastos, Nuno R. O.

June 2017

In this paper, we present a new numerical method to solve fractional differential equations. Given ...

A fractional Gauss–Jacobi quadrature rule for approximating fractional integrals and derivatives

Jahanshahi, S.
Babolian, E.
Torres, D. F. M.
Vahidi, A. R.

We introduce an efficient algorithm for computing fractional integrals and derivatives and apply it ...

Some Optimal Quadrature Formulas and Error Bounds

Maria Acu, Ana
Babos, Alina

September 2012

The corrected quadrature rules are considered and the estimations of error involving the second deri...

Quadrature rule for Abel’s equations: uniformly approximating fractional derivatives

SUGIURA, Hiroshi
HASEGAWA, Takemitsu

January 2009

An automatic quadrature method is presented for approximating fractional derivative D^qf(x) of a gi...

Quadrature rule for Abel’s equations: Uniformly approximating fractional derivatives

Sugiura, Hiroshi
Hasegawa, Takemitsu

January 2009

AbstractAn automatic quadrature method is presented for approximating fractional derivative Dqf(x) o...

An approximation method for high-order fractional derivatives of algebraically singular functions

Hasegawa, Takemitsu
Sugiura, Hiroshi

August 2011

AbstractThe fractional derivative Dqf(s) (0≤s≤1) of a given function f(s) with a positive non-intege...

Uniform approximation to fractional derivatives of functions of algebraic singularity

Hasegawa, Takemitsu
Sugiura, Hiroshi

June 2009

AbstractFractional derivative Dqf(x) (0<q<1,0≤x≤1) of a function f(x) is defined in terms of an inde...

Quadrature rule for indefinite integral of algebraic–logarithmic singular integrands

Hasegawa, Takemitsu
Sugiura, Hiroshi

August 2007

AbstractAn automatic quadrature method is presented for approximating the indefinite integral of fun...

High-accuracy numerical integration methods for fractional order derivatives and integrals computations

Brzeziński, Dariusz W.
Ostalczyk, Piotr

January 2014

In this paper the authors present highly accurate and remarkably efficient computational methods for...

A Chebyshev Quadrature Rule for One Sided Finite Part Integrals

Kim, Philsu

August 2001

AbstractThis paper is concerned with a Chebyshev quadrature rule for approximating one sided finite ...

On the Chebyshev quadrature rule of finite part integrals

Kim, Philsu
Ahn, Soyoung
Choi, U. Jin

August 2005

AbstractThe stability and the convergence of the Chebyshev quadrature rule of one-sided finite part ...

Mechanical quadrature methods and their extrapolation for solving first kind Abel integral equations

Liu, Ya-ping
Tao, Lü

April 2007

AbstractThis paper presents high accuracy mechanical quadrature methods for solving first kind Abel ...

Approximation of fractional integrals by means of derivatives

Pooseh, Shakoor
Almeida, Ricardo
Torres, Delfim F.M.

November 2012

AbstractWe obtain a new decomposition of the Riemann–Liouville operators of fractional integration a...

Three algorithms for Hadamard finite-part integrals and fractional derivatives

Elliott, David

September 1995

AbstractThree algorithms for the evaluation of the Hadamard finite-part integral of the form ∫1-1(f(...

Exponential Quadrature Rules for Linear Fractional Differential Equations

GARRAPPA, Roberto
Popolizio M.

January 2015

This paper focuses on the numerical solution of initial value problems for fractional differential e...

A numerical method to solve higher-order fractional differential equations

Almeida, Ricardo
Bastos, Nuno R. O.

June 2017

In this paper, we present a new numerical method to solve fractional differential equations. Given ...

A fractional Gauss–Jacobi quadrature rule for approximating fractional integrals and derivatives

Jahanshahi, S.
Babolian, E.
Torres, D. F. M.
Vahidi, A. R.

We introduce an efficient algorithm for computing fractional integrals and derivatives and apply it ...

Some Optimal Quadrature Formulas and Error Bounds

Maria Acu, Ana
Babos, Alina

September 2012

The corrected quadrature rules are considered and the estimations of error involving the second deri...

Quadrature rule for Abel’s equations: uniformly approximating fractional derivatives

SUGIURA, Hiroshi
HASEGAWA, Takemitsu

January 2009

An automatic quadrature method is presented for approximating fractional derivative D^qf(x) of a gi...

Quadrature rule for Abel’s equations: Uniformly approximating fractional derivatives

Sugiura, Hiroshi
Hasegawa, Takemitsu

January 2009

AbstractAn automatic quadrature method is presented for approximating fractional derivative Dqf(x) o...

An approximation method for high-order fractional derivatives of algebraically singular functions

Hasegawa, Takemitsu
Sugiura, Hiroshi

August 2011

AbstractThe fractional derivative Dqf(s) (0≤s≤1) of a given function f(s) with a positive non-intege...

Uniform approximation to fractional derivatives of functions of algebraic singularity

Hasegawa, Takemitsu
Sugiura, Hiroshi

June 2009

AbstractFractional derivative Dqf(x) (0<q<1,0≤x≤1) of a function f(x) is defined in terms of an inde...

Quadrature rule for indefinite integral of algebraic–logarithmic singular integrands

Hasegawa, Takemitsu
Sugiura, Hiroshi

August 2007

AbstractAn automatic quadrature method is presented for approximating the indefinite integral of fun...

High-accuracy numerical integration methods for fractional order derivatives and integrals computations

Brzeziński, Dariusz W.
Ostalczyk, Piotr

January 2014

In this paper the authors present highly accurate and remarkably efficient computational methods for...

A Chebyshev Quadrature Rule for One Sided Finite Part Integrals

Kim, Philsu

August 2001

AbstractThis paper is concerned with a Chebyshev quadrature rule for approximating one sided finite ...

On the Chebyshev quadrature rule of finite part integrals

Kim, Philsu
Ahn, Soyoung
Choi, U. Jin

August 2005

AbstractThe stability and the convergence of the Chebyshev quadrature rule of one-sided finite part ...

Mechanical quadrature methods and their extrapolation for solving first kind Abel integral equations

Liu, Ya-ping
Tao, Lü

April 2007

AbstractThis paper presents high accuracy mechanical quadrature methods for solving first kind Abel ...

Approximation of fractional integrals by means of derivatives

Pooseh, Shakoor
Almeida, Ricardo
Torres, Delfim F.M.

November 2012

AbstractWe obtain a new decomposition of the Riemann–Liouville operators of fractional integration a...

Three algorithms for Hadamard finite-part integrals and fractional derivatives

Elliott, David

September 1995

AbstractThree algorithms for the evaluation of the Hadamard finite-part integral of the form ∫1-1(f(...

Exponential Quadrature Rules for Linear Fractional Differential Equations

GARRAPPA, Roberto
Popolizio M.

January 2015

This paper focuses on the numerical solution of initial value problems for fractional differential e...

A numerical method to solve higher-order fractional differential equations

Almeida, Ricardo
Bastos, Nuno R. O.

June 2017

In this paper, we present a new numerical method to solve fractional differential equations. Given ...

A fractional Gauss–Jacobi quadrature rule for approximating fractional integrals and derivatives

Jahanshahi, S.
Babolian, E.
Torres, D. F. M.
Vahidi, A. R.

We introduce an efficient algorithm for computing fractional integrals and derivatives and apply it ...

Some Optimal Quadrature Formulas and Error Bounds

Maria Acu, Ana
Babos, Alina

September 2012

The corrected quadrature rules are considered and the estimations of error involving the second deri...

Quadrature rule for Abel’s equations: Uniformly approximating fractional derivatives

Abstract

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Quadrature rule for Abel’s equations: Uniformly approximating fractional derivatives

Abstract

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