-
1
-
-
0042639049
-
Stability barriers to the construction of {ρ,σ} -reducible and fractional quadrature rules
-
H. Braß, G. Hämmerlin (Eds.), Birkhäuser, Basel
-
C.T.H. Baker, M.S. Derakhshan, Stability barriers to the construction of {ρ,σ} -reducible and fractional quadrature rules, in: H. Braß, G. Hämmerlin (Eds.), Numerical Integration III, Vol. 85 of Internat. Ser. Numer. Math., Birkhäuser, Basel, 1988, pp. 1-15.
-
(1988)
Numerical Integration III, Vol. 85 of Internat. Ser. Numer. Math.
, vol.85
, pp. 1-15
-
-
Baker, C.T.H.1
Derakhshan, M.S.2
-
2
-
-
0003369375
-
Numerical treatment of differential equations of fractional order
-
Manchester Centre for Computational Mathematics
-
L. Blank, Numerical treatment of differential equations of fractional order, Numerical Analysis Report 287, Manchester Centre for Computational Mathematics, 1996.
-
(1996)
Numerical Analysis Report
, vol.287
-
-
Blank, L.1
-
3
-
-
0001618393
-
An algorithm for the numerical solution of differential equations of fractional order
-
Diethelm K. An algorithm for the numerical solution of differential equations of fractional order. Elect. Transact. Numer. Anal. 5:1997;1-6.
-
(1997)
Elect. Transact. Numer. Anal.
, vol.5
, pp. 1-6
-
-
Diethelm, K.1
-
4
-
-
84966227123
-
Fractional linear multistep methods for Abel-Volterra integral equations of the second kind
-
Lubich C. Fractional linear multistep methods for Abel-Volterra integral equations of the second kind. Math. Comp. 45:1985;463-469.
-
(1985)
Math. Comp.
, vol.45
, pp. 463-469
-
-
Lubich, C.1
-
6
-
-
0012899160
-
Numerical solution of the Bagley-Torvik equation
-
Diethelm K., Ford N.J. Numerical solution of the Bagley-Torvik equation. BIT. 42:2002;490-507.
-
(2002)
BIT
, vol.42
, pp. 490-507
-
-
Diethelm, K.1
Ford, N.J.2
-
7
-
-
0012897479
-
Numerical solution of linear multi-term differential equations of fractional order
-
in press
-
K. Diethelm, Y. Luchko, Numerical solution of linear multi-term differential equations of fractional order, J. Comput. Anal. Appl., in press.
-
J. Comput. Anal. Appl.
-
-
Diethelm, K.1
Luchko, Y.2
-
10
-
-
0002795136
-
On the solution of nonlinear fractional differential equations used in the modeling of viscoplasticity
-
F. Keil, W. Mackens, H. Voß, & J. Werther. Heidelberg: Springer
-
Diethelm K., Freed A.D. On the solution of nonlinear fractional differential equations used in the modeling of viscoplasticity. Keil F., Mackens W., Voß H., Werther J. Scientific Computing in Chemical Engineering II - Computational Fluid Dynamics, Reaction Engineering, and Molecular Properties. 1999;217-224 Springer, Heidelberg.
-
(1999)
Scientific Computing in Chemical Engineering II - Computational Fluid Dynamics, Reaction Engineering, and Molecular Properties
, pp. 217-224
-
-
Diethelm, K.1
Freed, A.D.2
-
14
-
-
0028878140
-
A fractional calculus approach to self-similar protein dynamics
-
Glöckle W.G., Nonnenmacher T.F. A fractional calculus approach to self-similar protein dynamics. Biophys. J. 68(1):1995;46-53.
-
(1995)
Biophys. J.
, vol.68
, Issue.1
, pp. 46-53
-
-
Glöckle, W.G.1
Nonnenmacher, T.F.2
-
15
-
-
0001983732
-
Fractional calculus: Some basic problems in continuum and statistical mechanics
-
A. Carpinteri, & F. Mainardi. Wien: Springer
-
Mainardi F. Fractional calculus: Some basic problems in continuum and statistical mechanics. Carpinteri A., Mainardi F. Fractals and Fractional Calculus in Continuum Mechanics. 1997;291-348 Springer, Wien.
-
(1997)
Fractals and Fractional Calculus in Continuum Mechanics
, pp. 291-348
-
-
Mainardi, F.1
-
17
-
-
84977255207
-
Linear models of dissipation whose Q is almost frequency independent, II
-
Caputo M. Linear models of dissipation whose. Q is almost frequency independent, II Geophys. J. Royal Astronom. Soc. 13:1967;529-539.
-
(1967)
Geophys. J. Royal Astronom. Soc.
, vol.13
, pp. 529-539
-
-
Caputo, M.1
-
18
-
-
0037113861
-
The numerical solution of linear multi-term fractional differential equations: Systems of equations
-
Edwards J.T., Ford N.J., Simpson A.C. The numerical solution of linear multi-term fractional differential equations: Systems of equations. J. Comput. Appl. Math. 148:2002;401-418.
-
(2002)
J. Comput. Appl. Math.
, vol.148
, pp. 401-418
-
-
Edwards, J.T.1
Ford, N.J.2
Simpson, A.C.3
-
19
-
-
0037081673
-
Analysis of fractional differential equations
-
Diethelm K., Ford N.J. Analysis of fractional differential equations. J. Math. Anal. Appl. 265:2002;229-248.
-
(2002)
J. Math. Anal. Appl.
, vol.265
, pp. 229-248
-
-
Diethelm, K.1
Ford, N.J.2
-
20
-
-
0010186169
-
The FracPECE subroutine for the numerical solution of differential equations of fractional order
-
S. Heinzel, T. Plesser (Eds.), no. 52 in GWDG-Berichte, Gesellschaft für wissenschaftliche Datenverarbeitung, Göttingen
-
K. Diethelm, A.D. Freed, The FracPECE subroutine for the numerical solution of differential equations of fractional order, in: S. Heinzel, T. Plesser (Eds.), Forschung und wissenschaftliches Rechnen 1998, no. 52 in GWDG-Berichte, Gesellschaft für wissenschaftliche Datenverarbeitung, Göttingen, 1999, pp. 57-71.
-
(1999)
Forschung und Wissenschaftliches Rechnen 1998
, pp. 57-71
-
-
Diethelm, K.1
Freed, A.D.2
-
21
-
-
0036650479
-
A predictor-corrector approach for the numerical solution of fractional differential equations
-
Diethelm K., Freed A.D., Ford N.J. A predictor-corrector approach for the numerical solution of fractional differential equations. Nonlinear Dyn. 29:2002;3-22.
-
(2002)
Nonlinear Dyn.
, vol.29
, pp. 3-22
-
-
Diethelm, K.1
Freed, A.D.2
Ford, N.J.3
-
23
-
-
0035625795
-
The numerical solution of fractional differential equations: Speed versus accuracy
-
Ford N.J., Simpson A.C. The numerical solution of fractional differential equations: Speed versus accuracy. Numer. Algorithms. 26:2001;333-346.
-
(2001)
Numer. Algorithms
, vol.26
, pp. 333-346
-
-
Ford, N.J.1
Simpson, A.C.2
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