Browse by Person (creator, editor, contributor, etc.)
Number of items: 36. Article
Mansfield, Elizabeth L. and Hydon, Peter E.
(2008)
Difference forms.
Foundations of Computational Mathematics,
8
(4).
pp. 427467.
ISSN 16153375.
(doi:10.1007/s1020800790158)
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Mansfield, Elizabeth L.
(2006)
Noether's Theorem for Smooth, Difference and Finite Element Schemes.
Foundations of Computational Mathematics, Santander 2005,
London Mathematical Society Lecture Notes Series 331
.
pp. 230254.
ISSN 0521681612.
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Mansfield, Elizabeth L. and Quispel, R.
(2005)
Towards a variational complex for the finite element method.
Group Theory and Numerical Analysis,
39
.
pp. 207232.
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Hydon, Peter E. and Mansfield, Elizabeth L.
(2004)
A variational complex for difference equations.
Foundations of Computational Mathematics,
4
(2).
pp. 187217.
ISSN 16153375.
(doi:DOI not available)
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Mansfield, Elizabeth L.
(2001)
Algorithms for symmetric differential systems.
Foundations of Computational Mathematics,
1
(4).
pp. 335383.
ISSN 16153375.
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Mansfield, Elizabeth L. and Hydon, Peter E.
(2001)
On a variational complex for difference equations.
Contemporary Mathematics,
285
.
pp. 195205.
ISSN 02714132.
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Mansfield, Elizabeth L. and Webster, Helen N.
(1998)
On oneparameter families of Painleve III.
Studies in Applied Mathematics,
101
(3).
pp. 321341.
ISSN 00222526.
(doi:10.1111/14679590.00096)
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Mansfield, Elizabeth L.
(1996)
A simple criterion for involutivity.
Journal of the London Mathematical Society,
54
.
pp. 323345.
ISSN 00246107.
(doi:10.1112/jlms/54.2.323)
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Clarkson, Peter and Mansfield, Elizabeth L. and Milne, Alice E.
(1996)
Symmetries and exact solutions of a 2+1 dimensional sineGordon equation.
Philosophical Transactions of the Royal Society A: Mathematical, Physical & Engineering Sciences.,
354
.
pp. 18071835.
ISSN 02610523.
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Mansfield, Elizabeth L.
(1996)
The differential algebra package diffgrob2.
Mapletech,
3
(2).
pp. 3337.
ISSN 10615733.
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Book section
Mansfield, Elizabeth L. and Zhao, Jun
(2011)
On the modern notion of a moving frame.
In: Dorst, Leo and Lasenby, Joan, eds.
Guide to Geometric Algebra in Practice.
Springer, London, pp. 411434.
ISBN 9780857298102.
(doi:10.1007/9780857298119_20)
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Mansfield, Elizabeth L.
(2002)
Moving frames and differential algebra.
In: Guo, Li and Cassidy, Phyllis J. and Keigher, William F. and Sit, William Y., eds.
Differential Algebra and Related Topics.
World Scientific Press, Singapore, pp. 257279.
ISBN 9789810247034.
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Clarkson, Peter and Mansfield, Elizabeth L. and Webster, Helen N.
(2002)
On Discrete Painleve Equations as Backlund Transformations.
In: Coley, Alan and Levi, Decio and Milson, Robert and Rogers, Colin and Winternitz, Pavel, eds.
Backlund and Darboux Transformations: The Geometry of Solitons.
CRM Proceedings and Lecture Notes
(29).
American Mathematical Society, United States, pp. 129139.
ISBN 9780821828038 .
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Clarkson, Peter and Mansfield, Elizabeth L.
(2002)
Open problems in symmetry analysis.
In: Leslie, Joshua, ed.
The Geometrical Study of Differential Equations.
Contemporary Mathematics
(285).
American Mathematical Society, United Kingdom, pp. 195205.
ISBN 0821829645.
(Full text available)

Preview 

Conference or workshop item
Shemyakova, Ekaterina and Mansfield, Elizabeth L.
(2008)
Moving Frames for Laplace Invariants.
In: International Symposium in Symbolic and Algebraic Manipulation 2008, 20th 23rd July 2008, Hagenburg, Austria.
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Mansfield, Elizabeth L. and Hydon, Peter E.
(2001)
Towards approximations which preserve integrals.
In: International Symposium in Symbolic and Algebraic Manipulation , July 2225, 2001, London, Ontario, Canada.
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


Book
Mansfield, Elizabeth L.
(2010)
A Practical Guide to the Invariant Calculus.
Cambridge Monographs on Applied and Computational Mathematics, 26
.
Cambridge University Press, Cambridge, 260 pp.
ISBN 9780521857017.
(The full text of this publication is not currently available from this repository. You may be able to access a copy if URLs are provided)


This list was generated on Thu Jan 19 04:56:31 2017 GMT.
