|
Browse All Reviews > Mathematics Of Computing (G) > Numerical Analysis (G.1) > Approximation (G.1.2) > Nonlinear Approximation (G.1.2...)
|
|
|
|
|
|
|
|
|
1-7 of 7
Reviews about "Nonlinear Approximation (G.1.2...)":
|
Date Reviewed |
|
Optimal state estimation: Kalman, H infinity, and nonlinear approaches Simon D., Wiley-Interscience, 2006. 526 pp. Type: Book (9780471708582)
State estimation theory has developed since the middle of the twentieth century and has become a topic of great interest in all domains of engineering and science concerned with the mathematical modeling of systems. This book provides ...
|
Dec 4 2006 |
|
Adaptive optimal observers for dynamic nonlinear systems Fayaz A., Salem F. Systems Analysis Modelling Simulation 42(12): 1763-1781, 2002. Type: Article
Fayaz and Salem consider the problem of designing adaptive procedures for tracking, estimating, and predicting the states of a process based on input and output measurements. A mathematical model for the system is given, and the author...
|
Dec 30 2003 |
|
Approximation of solution curves of underdetermined systems of nonlinear equations Neubert R. Computing 59(4): 285-306, 1997. Type: Article
A function-based iterative scheme for approximating the solution curves of underdetermined systems of nonlinear equations is described. The techniques that make up the scheme are well known. First, the nonlinear system is converted to ...
|
Jun 1 1998 |
|
Real values of the W-function Barry D., Culligan-Hensley P., Barry S. ACM Transactions on Mathematical Software 21(2): 161-171, 1995. Type: Article
The W-function is defined by the equation W ( x ) exp ( W ( x ) ) = x , which should appear earlier in the paper than it does. There are two parts to thi...
|
Nov 1 1996 |
|
Algorithm 743: WAPR--a Fortran routine for calculating real values of the W-function Barry D., Barry S., Culligan-Hensley P. ACM Transactions on Mathematical Software 21(2): 172-181, 1995. Type: Article
The -function is defined by the equation which should appear earlier in the paper than it does. There are two parts to thi...
|
Nov 1 1996 |
|
A modification of Talbot’s method for the simultaneous approximation of several values of the inverse Laplace transform Rizzardi M. ACM Transactions on Mathematical Software 21(4): 347-371, 1995. Type: Article
This intriguing paper extends a method introduced by Talbot in 1979 for numerically inverting a Laplace transform F ( s ) at a fixed point t. Talbot’s method uses the inversion integral f...
|
Aug 1 1996 |
|
Nonlinear Lp-norm estimation Gonin R., Money A., Marcel Dekker, Inc., New York, NY, 1989. Type: Book (9789780824781255)
This book is written for the mathematical statistician in the field of statistical computing. It covers numerical solution procedures and statistical analysis of the nonlinear L1-norm and L ∞
|
Apr 1 1990 |
|
|
|
|
|
|