INT_EXACTNESS_GEN_LAGUERRE is a FORTRAN90 program which investigates the polynomial exactness of a generalized Gauss-Laguerre quadrature rule for the semi-infinite interval [0,oo) or [A,oo).
Standard generalized Gauss-Laguerre quadrature assumes that the integrand we are considering has a form like:
Integral ( A <= x < +oo ) x^alpha * exp(-x) * f(x) dxwhere the factor x^alpha * exp(-x) is regarded as a weight factor.
A standard generalized Gauss-Laguerre quadrature rule is a set of n positive weights w and abscissas x so that
Integral ( A <= x < +oo ) x^alpha * exp(-x) * f(x) dxmay be approximated by
Sum ( 1 <= I <= N ) w(i) * f(x(i))
It is often convenient to consider approximating integrals in which the weighting factor x^alpha * exp(-x) is implicit. In that case, we are looking at approximating
Integral ( A <= x < +oo ) f(x) dxand it is easy to modify a standard generalized Gauss-Laguerre quadrature rule to handle this case directly.
A modified generalized Gauss-Laguerre quadrature rule is a set of n positive weights w and abscissas x so that
Integral ( A <= x < +oo ) f(x) dxmay be approximated by
Sum ( 1 <= I <= N ) w(i) * f(x(i))
When using a generalized Gauss-Laguerre quadrature rule, it's important to know whether the rule has been developed for the standard or modified cases. Basically, the only change is that the weights of the modified rule have been divided by the weighting function evaluated at the corresponding abscissa.
For a standard generalized Gauss-Laguerre rule, polynomial exactness is defined in terms of the function f(x). That is, we say the rule is exact for polynomials up to degree DEGREE_MAX if, for any polynomial f(x) of that degree or less, the quadrature rule will produce the exact value of
Integral ( 0 <= x < +oo ) x^alpha * exp(-x) * f(x) dx
For a modified generalized Gauss-Laguerre rule, polynomial exactness is defined in terms of the function f(x) divided by the implicit weighting function. That is, we say a modified generalized Gauss-Laguerre rule is exact for polynomials up to degree DEGREE_MAX if, for any integrand f(x) with the property that f(x)/(x^alpha*exp(-x)) is a polynomial of degree no more than DEGREE_MAX, the quadrature rule will product the exact value of:
Integral ( 0 <= x < +oo ) f(x) dx
The program starts at DEGREE = 0, and then proceeds to DEGREE = 1, 2, and so on up to a maximum degree DEGREE_MAX specified by the user. At each value of DEGREE, the program generates the corresponding monomial term, applies the quadrature rule to it, and determines the quadrature error. The program uses a scaling factor on each monomial so that the exact integral should always be 1; therefore, each reported error can be compared on a fixed scale.
If the program understands that the rule being considered is a modified rule, then the monomials are multiplied by x^alpha * exp(-x) when performing the exactness test.
Since
Integral ( 0 <= x < +oo ) x^alpha * exp(-x) * xn dx = gamma(n+alpha+1)our test monomial functions, in order to integrate to 1, will be normalized to:
Integral ( 0 <= x < +oo ) x^alpha * exp(-x) xn / gamma(n+alpha+1) dxIt should be clear that accuracy will be rapidly lost as n increases.
The program is very flexible and interactive. The quadrature rule is defined by three files, to be read at input, and the maximum degree top be checked is specified by the user as well.
Note that the three files that define the quadrature rule are assumed to have related names, of the form
For information on the form of these files, see the QUADRATURE_RULES directory listed below.
The exactness results are written to an output file with the corresponding name:
int_exactness_gen_laguerre prefix degree_max alpha optionwhere
If the arguments are not supplied on the command line, the program will prompt for them.
The computer code and data files described and made available on this web page are distributed under the GNU LGPL license.
INT_EXACTNESS_GEN_LAGUERRE is available in a C++ version and a FORTRAN90 version and a MATLAB version.
GEN_LAGUERRE_RULE, a FORTRAN90 program which can generate a generalized Gauss-Laguerre quadrature rule on request.
HERMITE_EXACTNESS, a FORTRAN90 program which tests the polynomial exactness of Gauss-Hermite quadrature rules.
INT_EXACTNESS, a FORTRAN90 program which tests the polynomial exactness of a quadrature rule for a finite interval.
INT_EXACTNESS_CHEBYSHEV1, a FORTRAN90 program which tests the polynomial exactness of Gauss-Chebyshev type 1 quadrature rules.
INT_EXACTNESS_CHEBYSHEV2, a FORTRAN90 program which tests the polynomial exactness of Gauss-Chebyshev type 2 quadrature rules.
INT_EXACTNESS_GEGENBAUER, a FORTRAN90 program which tests the polynomial exactness of Gauss-Gegenbauer quadrature rules.
INT_EXACTNESS_GEN_HERMITE, a FORTRAN90 program which tests the polynomial exactness of generalized Gauss-Hermite quadrature rules.
INT_EXACTNESS_JACOBI, a FORTRAN90 program which tests the polynomial exactness of Gauss-Jacobi quadrature rules.
LAGUERRE_EXACTNESS, a FORTRAN90 program which tests the polynomial exactness of Gauss-Laguerre quadrature rules for integration over [0,+oo) with density function exp(-x).
LEGENDRE_EXACTNESS, a FORTRAN90 program which tests the monomial exactness of quadrature rules for the Legendre problem of integrating a function with density 1 over the interval [-1,+1].
GEN_LAG_O1_A0.5 is a standard generalized Gauss-Laguerre order 1 rule with ALPHA = 0.5.
int_exactness_gen_laguerre gen_lag_o1_a0.5 5 0.5 0
GEN_LAG_O2_A0.5 is a standard generalized Gauss-Laguerre order 2 rule with ALPHA = 0.5.
int_exactness_gen_laguerre gen_lag_o2_a0.5 5 0.5 0
GEN_LAG_O4_A0.5 is a standard generalized Gauss-Laguerre order 4 rule with ALPHA = 0.5.
int_exactness_gen_laguerre gen_lag_o4_a0.5 10 0.5 0
GEN_LAG_O8_A0.5 is a standard generalized Gauss-Laguerre order 8 rule with ALPHA = 0.5.
int_exactness_gen_laguerre gen_lag_o8_a0.5 18 0.5 0
GEN_LAG_O16_A0.5 is a standard generalized Gauss-Laguerre order 16 rule with ALPHA = 0.5.
int_exactness_gen_laguerre gen_lag_o16_a0.5 35 0.5 0
GEN_LAG_O1_A0.5_MODIFIED is a modified generalized Gauss-Laguerre order 1 rule with ALPHA = 0.5.
int_exactness_gen_laguerre gen_lag_o1_a0.5_modified 5 0.5 1
GEN_LAG_O2_A0.5_MODIFIED is a modified generalized Gauss-Laguerre order 2 rule with ALPHA = 0.5.
int_exactness_gen_laguerre gen_lag_o2_a0.5_modified 5 0.5 1
GEN_LAG_O4_A0.5_MODIFIED is a modified generalized Gauss-Laguerre order 4 rule with ALPHA = 0.5.
int_exactness_gen_laguerre gen_lag_o4_a0.5_modified 10 0.5 1
GEN_LAG_O8_A0.5_MODIFIED is a modified generalized Gauss-Laguerre order 8 rule with ALPHA = 0.5.
int_exactness_gen_laguerre gen_lag_o8_a0.5_modified 18 0.5 1
GEN_LAG_O16_A0.5_MODIFIED is a modified generalized Gauss-Laguerre order 16 rule with ALPHA = 0.5.
int_exactness_gen_laguerre gen_lag_o16_a0.5_modified 35 0.5 1
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