QD2DR
This function evaluates the derivative of a function defined on a rectangular grid using quadratic interpolation.
Function Return Value
QD2DR — Value of the (IXDER, IYDER) derivative of the function at (X, Y). (Output)
Required Arguments
IXDER — Order of the x-derivative. (Input)
IYDER — Order of the y-derivative. (Input)
X — X-coordinate of the point at which the function is to be evaluated. (Input)
Y — Y-coordinate of the point at which the function is to be evaluated. (Input)
XDATA — Array of length NXDATA containing the location of the data points in the x-direction. (Input)
XDATA must be increasing.
YDATA — Array of length NYDATA containing the location of the data points in the y-direction. (Input)
YDATA must be increasing.
FDATA — Array of size NXDATA by NYDATA containing function values. (Input)
FDATA(I, J) is the value of the function at (XDATA(I), YDATA(J)).
Optional Arguments
NXDATA — Number of data points in the x-direction. (Input)
NXDATA must be at least three.
Default: NXDATA = size (XDATA,1).
NYDATA — Number of data points in the y-direction. (Input)
NYDATA must be at least three.
Default: NYDATA = size (YDATA,1).
LDF — Leading dimension of FDATA exactly as specified in the dimension statement of the calling program. (Input)
LDF must be at least as large as NXDATA.
Default: LDF = size (FDATA,1).
CHECK — Logical variable that is .TRUE. if checking of XDATA and YDATA is required or .FALSE. if checking is not required. (Input)
Default: CHECK = .TRUE.
FORTRAN 90 Interface
Generic: QD2DR (IXDER, IYDER, X, Y, XDATA, YDATA, FDATA [, …])
Specific: The specific interface names are S_QD2DR and D_QD2DR.
FORTRAN 77 Interface
Single: QD2DR (IXDER, IYDER, X, Y, NXDATA, XDATA, NYDATA, YDATA, FDATA, LDF, CHECK)
Double: The double precision function name is DQD2DR.
Description
The function QD2DR interpolates a table of values, using quadratic polynomials, returning an approximation to the tabulated function. Let (xi, yj, fij) for i = 1, …, nx and j = 1, …, ny be the tabular data. Given a point (x, y) at which an interpolated value is desired, we first find the nearest interior grid point (xi, yj). A bivariate quadratic interpolant q is then formed using six points near (x, y). Five of the six points are (xi, yj), (xi±1, yj), and (xi, yj±1). The sixth point is the nearest point to (x, y) of the grid points (xi±1, yj±1). The value q(p, r) (x, y) is returned by QD2DR, where p = IXDER and r = IYDER.
Comments
1. Informational errors
|
Type |
Code |
Description |
|
4 |
6 |
The XDATA values must be strictly increasing. |
|
4 |
7 |
The YDATA values must be strictly increasing. |
2. Because quadratic interpolation is used, if the order of any derivative is greater than two, then the returned value is zero.
Example
In this example, the partial derivatives of sin(x + y) at x = y = π/3 are approximated by using QD2DR on a table of size 21 × 42 equally spaced values on the rectangle [0, 2] × [0, 2].
USE IMSL_LIBRARIES
IMPLICIT NONE
INTEGER LDF, NXDATA, NYDATA
PARAMETER (NXDATA=21, NYDATA=42, LDF=NXDATA)
!
INTEGER I, IXDER, IYDER, J, NOUT
REAL F, FDATA(LDF,NYDATA), FLOAT, FU, FUNC, PI, Q,&
SIN, X, XDATA(NXDATA), Y, YDATA(NYDATA)
INTRINSIC FLOAT, SIN
EXTERNAL FUNC
! Define function
F(X,Y) = SIN(X+Y)
! Set up X-grid
DO 10 I=1, NXDATA
XDATA(I) = 2.0*(FLOAT(I-1)/FLOAT(NXDATA-1))
10 CONTINUE
! Set up Y-grid
DO 20 I=1, NYDATA
YDATA(I) = 2.0*(FLOAT(I-1)/FLOAT(NYDATA-1))
20 CONTINUE
! Evaluate function on grid
DO 30 I=1, NXDATA
DO 30 J=1, NYDATA
FDATA(I,J) = F(XDATA(I),YDATA(J))
30 CONTINUE
! Get output unit number
CALL UMACH (2, NOUT)
! Write heading
WRITE (NOUT,99998)
! Check XDATA and YDATA
! Get value for PI and set X and Y
PI = CONST('PI')
X = PI/3.0
Y = PI/3.0
! Evaluate and print the function
! and its derivatives at X=PI/3 and
! Y=PI/3.
DO 40 IXDER=0, 1
DO 40 IYDER=0, 1
Q = QD2DR(IXDER,IYDER,X,Y,XDATA,YDATA,FDATA)
FU = FUNC(IXDER,IYDER,X,Y)
WRITE (NOUT,99999) X, Y, IXDER, IYDER, FU, Q, (FU-Q)
40 CONTINUE
!
99998 FORMAT (32X, '(IDX,IDY)', /, 8X, 'X', 8X, 'Y', 3X, 'IDX', 2X,&
'IDY', 3X, 'F (X,Y)', 3X, 'QD2DR', 6X, 'ERROR')
99999 FORMAT (2F9.4, 2I5, 3X, F9.4, 2X, 2F11.4)
END
REAL FUNCTION FUNC (IX, IY, X, Y)
INTEGER IX, IY
REAL X, Y
!
REAL COS, SIN
INTRINSIC COS, SIN
!
IF (IX.EQ.0 .AND. IY.EQ.0) THEN
! Define (0,0) derivative
FUNC = SIN(X+Y)
ELSE IF (IX.EQ.0 .AND. IY.EQ.1) THEN
! Define (0,1) derivative
FUNC = COS(X+Y)
ELSE IF (IX.EQ.1 .AND. IY.EQ.0) THEN
! Define (1,0) derivative
FUNC = COS(X+Y)
ELSE IF (IX.EQ.1 .AND. IY.EQ.1) THEN
! Define (1,1) derivative
FUNC = -SIN(X+Y)
ELSE
FUNC = 0.0
END IF
RETURN
END
(IDX,IDY)
X Y IDX IDY F (X,Y) QD2DR ERROR
1.0472 1.0472 0 0 0.8660 0.8661 -0.0001
1.0472 1.0472 0 1 -0.5000 -0.4993 -0.0007
1.0472 1.0472 1 0 -0.5000 -0.4995 -0.0005
1.0472 1.0472 1 1 -0.8660 -0.8634 -0.0026
