Detailed Description
Basis of Chebyshev polynomials of the first kind https://en.wikipedia.org/wiki/Chebyshev_polynomials#First_kind These are typically denoted with the symbol T_n, where n is the degree.
The parameter N is the number of coefficients, i.e., N = n+1.
Static Public Member Functions | |
| static Weights | CalculateWeights (size_t N, double x, double a=-1, double b=1) |
| Evaluate Chebyshev Weights on [-1,1] at x up to order N-1 (N values). | |
| static Weights | DerivativeWeights (size_t N, double x, double a=-1, double b=1) |
| Evaluate Chebyshev derivative at x. | |
| Static Public Member Functions inherited from gtsam::Basis< Chebyshev1Basis > | |
| static Matrix | WeightMatrix (size_t N, const Vector &X) |
| Calculate weights for all x in vector X. | |
Public Attributes | |
| Parameters | parameters_ |
Public Types | |
| using | Parameters = Eigen::Matrix<double, -1, 1 > |
Member Function Documentation
◆ CalculateWeights()
|
static |
Evaluate Chebyshev Weights on [-1,1] at x up to order N-1 (N values).
- Parameters
-
N Degree of the polynomial. x Point to evaluate polynomial at. a Lower limit of polynomial (default=-1). b Upper limit of polynomial (default=1).
◆ DerivativeWeights()
|
static |
Evaluate Chebyshev derivative at x.
The derivative weights are pre-multiplied to the polynomial Parameters.
From Wikipedia we have D[T_n(x),x] = n*U_{n-1}(x) I.e. the derivative fo a first kind cheb is just a second kind cheb So, we define a second kind basis here of order N-1 Note that it has one less weight.
The Parameters pertain to 1st kind chebs up to order N-1 But of course the first one (order 0) is constant, so omit that weight.
- Parameters
-
N Degree of the polynomial. x Point to evaluate polynomial at. a Lower limit of polynomial (default=-1). b Upper limit of polynomial (default=1).
- Returns
- Weights
The documentation for this struct was generated from the following files:
- /tmp/gtsam-4.2-docs.H5EUbA/src/gtsam/basis/Chebyshev.h
- /tmp/gtsam-4.2-docs.H5EUbA/src/gtsam/basis/Chebyshev.cpp
