JINR Document Server 3,673 records found  1 - 15nextend  jump to record: Search took 0.12 seconds. 
1.
On a spline approximation method for solving the ordinary differential equations / Zhanlav, T. [JINR-P5-92-111]
2.
THE CORE SPLINE METHOD FOR SOLUTION OF QUANTUM MECHANICAL SYSTEMS OF DIFFERENTIAL EQUATIONS FOR BOUND STATES / Aleksandrov, L. ; Drenska, M. ; Karadzhov, D. [JINR-E5-86-713]
3.
Spline approximation in the stabilization method for solving nonlinear boundary value problems / Zhanlav, T. [ams.org/mathscinet:MR1171725]
4.
A Method for solving differential equations via approximation theory / Zhidkov, P.E. [JINR-E11-2002-61]
Fulltext: PDF
External link: Fulltext
5.
APPLICATION OF BICUBIC SPLINES TO SOLVING FADDEEV'S INTEGRODIFFERENTIAL EQUATIONS. (IN RUSSIAN) / Pupyshev, V.V.
6.
GIBBS EFFECT FOR SPLINE INTERPOLATION AND FOR SOLVING INTEGRAL EQUATIONS BY THE SPLINE COLLOCATION METHOD / Zhidkov, E.P. ; Andreev, A.S. ; Popov, V.A. [JINR-P5-83-785]
7.
ON GENERALIZED METHODS FOR INTEGRATION OF ORDINARY DIFFERENTIAL EQUATIONS / Banchev, V.Ts. [JINR-P5-12174]
8.
IMPROVING DIFFERENCE SOLUTIONS BY CUBIC SPLINE APPROXIMATION OF TABLE POTENTIALS OF THE SCHRODINGER EQUATION / Vinitsky, S.I. ; Puzynina, T.P. ; Puzynin, I.V. [JINR-P11-82-428]
9.
APPLICATION OF CORE SPLINES METHOD TO SOLUTION OF SCHRODINGER EQUATION / Aleksandrov, L. ; Drenska, M. ; Karadzhov, D. [JINR-P5-80-751]
10.
ON FUNCTION MINIMIZATION BY MEANS OF GENERALIZED METHODS FOR INTEGRATION OF ORDINARY DIFFERENTIAL EQUATIONS / Banchev, V.Ts. [JINR-P5-12167]
11.
SOLUTION OF THREE PARTICLE DIFFERENTIAL EQUATIONS BY USING BICUBIC B SPLINES / Pupyshev, V.V. [JINR-P4-86-85]
12.
DISCRETIZATION ERRORS OF PERTURBATION NUMERICAL METHODS FOR INITIAL VALUE PROBLEMS IN ORDINARY DIFFERENTIAL EQUATIONS / Adam, G. [FT-207-1981]
13.
SPSOL PROGRAM FOR SOLUTION OF RADIAL EQUATION OF SCHRODINGER'S TYPE BY MEANS OF CORE SPLINES METHOD / Aleksandrov, L. ; Drenska, M. ; Ivanov, Mikhail A. ; Karadzhov, D. [JINR-P11-80-752]
14.
The core-splines method for solution of quantum-mechanical systems of differential equations for bound states / Aleksandrov, L A ; Drenska, M ; Karadzhov, D [JINR-E5-86-713]
15.
(anti-L(n), g)-spaces. ordinary and tensor differentials / Manoff, S. ; Dimitrov, B. [JINR-E5-98-183]

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