Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods

Research output: Chapter in Book/Report/Conference proceedingChapterResearch

Standard

Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods. / Harker, Matthew; O'Leary, Paul.
Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods. 2014. p. 43-64.

Research output: Chapter in Book/Report/Conference proceedingChapterResearch

Harvard

Harker, M & O'Leary, P 2014, Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods. in Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods. pp. 43-64.

APA

Harker, M., & O'Leary, P. (2014). Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods. In Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods (pp. 43-64)

Vancouver

Harker M, O'Leary P. Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods. In Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods. 2014. p. 43-64

Author

Harker, Matthew ; O'Leary, Paul. / Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods. Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods. 2014. pp. 43-64

Bibtex - Download

@inbook{8d1490876599478ea733715bb9706c7c,
title = "Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods",
author = "Matthew Harker and Paul O'Leary",
year = "2014",
language = "English",
pages = "43--64",
booktitle = "Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods",

}

RIS (suitable for import to EndNote) - Download

TY - CHAP

T1 - Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods

AU - Harker, Matthew

AU - O'Leary, Paul

PY - 2014

Y1 - 2014

M3 - Chapter

SP - 43

EP - 64

BT - Numerical Solution of Fractional Order Differential Equations Via Matrix-Based Methods

ER -