[5246] | 1 | !DECK PCHSP |
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| 2 | SUBROUTINE PCHSP (IC, VC, N, X, F, D, INCFD, WK, NWK, IERR) |
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| 3 | !***BEGIN PROLOGUE PCHSP |
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| 4 | !***PURPOSE Set derivatives needed to determine the Hermite represen- |
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| 5 | ! tation of the cubic spline interpolant to given data, with |
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| 6 | ! specified boundary conditions. |
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| 7 | !***LIBRARY SLATEC (PCHIP) |
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| 8 | !***CATEGORY E1A |
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| 9 | !***TYPE SINGLE PRECISION (PCHSP-S, DPCHSP-D) |
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| 10 | !***KEYWORDS CUBIC HERMITE INTERPOLATION, PCHIP, |
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| 11 | ! PIECEWISE CUBIC INTERPOLATION, SPLINE INTERPOLATION |
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| 12 | !***AUTHOR Fritsch, F. N., (LLNL) |
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| 13 | ! Lawrence Livermore National Laboratory |
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| 14 | ! P.O. Box 808 (L-316) |
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| 15 | ! Livermore, CA 94550 |
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| 16 | ! FTS 532-4275, (510) 422-4275 |
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| 17 | !***DESCRIPTION |
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| 18 | ! |
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| 19 | ! PCHSP: Piecewise Cubic Hermite Spline |
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| 20 | ! |
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| 21 | ! Computes the Hermite representation of the cubic spline inter- |
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| 22 | ! polant to the data given in X and F satisfying the boundary |
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| 23 | ! conditions specified by IC and VC. |
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| 24 | ! |
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| 25 | ! To facilitate two-dimensional applications, includes an increment |
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| 26 | ! between successive values of the F- and D-arrays. |
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| 27 | ! |
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| 28 | ! The resulting piecewise cubic Hermite function may be evaluated |
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| 29 | ! by PCHFE or PCHFD. |
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| 30 | ! |
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| 31 | ! NOTE: This is a modified version of C. de Boor's cubic spline |
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| 32 | ! routine CUBSPL. |
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| 33 | ! |
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| 34 | ! ---------------------------------------------------------------------- |
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| 35 | ! |
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| 36 | ! Calling sequence: |
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| 37 | ! |
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| 38 | ! PARAMETER (INCFD = ...) |
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| 39 | ! INTEGER IC(2), N, NWK, IERR |
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| 40 | ! REAL VC(2), X(N), F(INCFD,N), D(INCFD,N), WK(NWK) |
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| 41 | ! |
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| 42 | ! CALL PCHSP (IC, VC, N, X, F, D, INCFD, WK, NWK, IERR) |
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| 43 | ! |
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| 44 | ! Parameters: |
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| 45 | ! |
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| 46 | ! IC -- (input) integer array of length 2 specifying desired |
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| 47 | ! boundary conditions: |
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| 48 | ! IC(1) = IBEG, desired condition at beginning of data. |
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| 49 | ! IC(2) = IEND, desired condition at end of data. |
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| 50 | ! |
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| 51 | ! IBEG = 0 to set D(1) so that the third derivative is con- |
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| 52 | ! tinuous at X(2). This is the "not a knot" condition |
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| 53 | ! provided by de Boor's cubic spline routine CUBSPL. |
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| 54 | ! < This is the default boundary condition. > |
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| 55 | ! IBEG = 1 if first derivative at X(1) is given in VC(1). |
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| 56 | ! IBEG = 2 if second derivative at X(1) is given in VC(1). |
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| 57 | ! IBEG = 3 to use the 3-point difference formula for D(1). |
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| 58 | ! (Reverts to the default b.c. if N.LT.3 .) |
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| 59 | ! IBEG = 4 to use the 4-point difference formula for D(1). |
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| 60 | ! (Reverts to the default b.c. if N.LT.4 .) |
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| 61 | ! NOTES: |
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| 62 | ! 1. An error return is taken if IBEG is out of range. |
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| 63 | ! 2. For the "natural" boundary condition, use IBEG=2 and |
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| 64 | ! VC(1)=0. |
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| 65 | ! |
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| 66 | ! IEND may take on the same values as IBEG, but applied to |
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| 67 | ! derivative at X(N). In case IEND = 1 or 2, the value is |
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| 68 | ! given in VC(2). |
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| 69 | ! |
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| 70 | ! NOTES: |
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| 71 | ! 1. An error return is taken if IEND is out of range. |
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| 72 | ! 2. For the "natural" boundary condition, use IEND=2 and |
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| 73 | ! VC(2)=0. |
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| 74 | ! |
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| 75 | ! VC -- (input) real array of length 2 specifying desired boundary |
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| 76 | ! values, as indicated above. |
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| 77 | ! VC(1) need be set only if IC(1) = 1 or 2 . |
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| 78 | ! VC(2) need be set only if IC(2) = 1 or 2 . |
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| 79 | ! |
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| 80 | ! N -- (input) number of data points. (Error return if N.LT.2 .) |
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| 81 | ! |
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| 82 | ! X -- (input) real array of independent variable values. The |
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| 83 | ! elements of X must be strictly increasing: |
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| 84 | ! X(I-1) .LT. X(I), I = 2(1)N. |
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| 85 | ! (Error return if not.) |
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| 86 | ! |
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| 87 | ! F -- (input) real array of dependent variable values to be inter- |
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| 88 | ! polated. F(1+(I-1)*INCFD) is value corresponding to X(I). |
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| 89 | ! |
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| 90 | ! D -- (output) real array of derivative values at the data points. |
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| 91 | ! These values will determine the cubic spline interpolant |
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| 92 | ! with the requested boundary conditions. |
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| 93 | ! The value corresponding to X(I) is stored in |
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| 94 | ! D(1+(I-1)*INCFD), I=1(1)N. |
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| 95 | ! No other entries in D are changed. |
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| 96 | ! |
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| 97 | ! INCFD -- (input) increment between successive values in F and D. |
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| 98 | ! This argument is provided primarily for 2-D applications. |
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| 99 | ! (Error return if INCFD.LT.1 .) |
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| 100 | ! |
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| 101 | ! WK -- (scratch) real array of working storage. |
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| 102 | ! |
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| 103 | ! NWK -- (input) length of work array. |
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| 104 | ! (Error return if NWK.LT.2*N .) |
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| 105 | ! |
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| 106 | ! IERR -- (output) error flag. |
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| 107 | ! Normal return: |
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| 108 | ! IERR = 0 (no errors). |
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| 109 | ! "Recoverable" errors: |
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| 110 | ! IERR = -1 if N.LT.2 . |
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| 111 | ! IERR = -2 if INCFD.LT.1 . |
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| 112 | ! IERR = -3 if the X-array is not strictly increasing. |
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| 113 | ! IERR = -4 if IBEG.LT.0 or IBEG.GT.4 . |
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| 114 | ! IERR = -5 if IEND.LT.0 of IEND.GT.4 . |
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| 115 | ! IERR = -6 if both of the above are true. |
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| 116 | ! IERR = -7 if NWK is too small. |
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| 117 | ! NOTE: The above errors are checked in the order listed, |
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| 118 | ! and following arguments have **NOT** been validated. |
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| 119 | ! (The D-array has not been changed in any of these cases.) |
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| 120 | ! IERR = -8 in case of trouble solving the linear system |
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| 121 | ! for the interior derivative values. |
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| 122 | ! (The D-array may have been changed in this case.) |
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| 123 | ! ( Do **NOT** use it! ) |
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| 124 | ! |
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| 125 | !***REFERENCES Carl de Boor, A Practical Guide to Splines, Springer- |
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| 126 | ! Verlag, New York, 1978, pp. 53-59. |
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| 127 | !***ROUTINES CALLED PCHDF, XERMSG |
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| 128 | !***REVISION HISTORY (YYMMDD) |
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| 129 | ! 820503 DATE WRITTEN |
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| 130 | ! 820804 Converted to SLATEC library version. |
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| 131 | ! 870707 Minor cosmetic changes to prologue. |
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| 132 | ! 890411 Added SAVE statements (Vers. 3.2). |
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| 133 | ! 890703 Corrected category record. (WRB) |
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| 134 | ! 890831 Modified array declarations. (WRB) |
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| 135 | ! 890831 REVISION DATE from Version 3.2 |
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| 136 | ! 891214 Prologue converted to Version 4.0 format. (BAB) |
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| 137 | ! 900315 CALLs to XERROR changed to CALLs to XERMSG. (THJ) |
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| 138 | ! 920429 Revised format and order of references. (WRB,FNF) |
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| 139 | !***END PROLOGUE PCHSP |
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| 140 | ! Programming notes: |
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| 141 | ! |
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| 142 | ! To produce a double precision version, simply: |
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| 143 | ! a. Change PCHSP to DPCHSP wherever it occurs, |
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| 144 | ! b. Change the real declarations to double precision, and |
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| 145 | ! c. Change the constants ZERO, HALF, ... to double precision. |
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| 146 | ! |
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| 147 | ! DECLARE ARGUMENTS. |
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| 148 | ! |
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| 149 | INTEGER :: IC(2), N, INCFD, NWK, IERR |
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| 150 | REAL :: VC(2), X(*), F(INCFD,*), D(INCFD,*), WK(2,*) |
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| 151 | ! |
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| 152 | ! DECLARE LOCAL VARIABLES. |
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| 153 | ! |
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| 154 | INTEGER :: IBEG, IEND, INDEX, J, NM1 |
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| 155 | REAL :: G, HALF, ONE, STEMP(3), THREE, TWO, XTEMP(4), ZERO |
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| 156 | SAVE ZERO, HALF, ONE, TWO, THREE |
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| 157 | REAL :: PCHDF |
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| 158 | ! |
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| 159 | DATA ZERO /0./, HALF /0.5/, ONE /1./, TWO /2./, THREE /3./ |
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| 160 | ! |
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| 161 | ! VALIDITY-CHECK ARGUMENTS. |
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| 162 | ! |
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| 163 | !***FIRST EXECUTABLE STATEMENT PCHSP |
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| 164 | IF ( N.LT.2 ) GO TO 5001 |
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| 165 | IF ( INCFD.LT.1 ) GO TO 5002 |
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| 166 | DO J = 2, N |
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| 167 | IF ( X(J).LE.X(J-1) ) GO TO 5003 |
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| 168 | END DO |
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| 169 | ! |
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| 170 | IBEG = IC(1) |
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| 171 | IEND = IC(2) |
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| 172 | IERR = 0 |
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| 173 | IF ( (IBEG.LT.0).OR.(IBEG.GT.4) ) IERR = IERR - 1 |
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| 174 | IF ( (IEND.LT.0).OR.(IEND.GT.4) ) IERR = IERR - 2 |
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| 175 | IF ( IERR.LT.0 ) GO TO 5004 |
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| 176 | ! |
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| 177 | ! FUNCTION DEFINITION IS OK -- GO ON. |
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| 178 | ! |
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| 179 | IF ( NWK .LT. 2*N ) GO TO 5007 |
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| 180 | ! |
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| 181 | ! COMPUTE FIRST DIFFERENCES OF X SEQUENCE AND STORE IN WK(1,.). ALSO, |
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| 182 | ! COMPUTE FIRST DIVIDED DIFFERENCE OF DATA AND STORE IN WK(2,.). |
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| 183 | DO J=2,N |
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| 184 | WK(1,J) = X(J) - X(J-1) |
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| 185 | WK(2,J) = (F(1,J) - F(1,J-1))/WK(1,J) |
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| 186 | END DO |
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| 187 | ! |
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| 188 | ! SET TO DEFAULT BOUNDARY CONDITIONS IF N IS TOO SMALL. |
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| 189 | ! |
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| 190 | IF ( IBEG.GT.N ) IBEG = 0 |
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| 191 | IF ( IEND.GT.N ) IEND = 0 |
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| 192 | ! |
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| 193 | ! SET UP FOR BOUNDARY CONDITIONS. |
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| 194 | ! |
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| 195 | IF ( (IBEG.EQ.1).OR.(IBEG.EQ.2) ) THEN |
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| 196 | D(1,1) = VC(1) |
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| 197 | ELSE IF (IBEG .GT. 2) THEN |
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| 198 | ! PICK UP FIRST IBEG POINTS, IN REVERSE ORDER. |
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| 199 | DO J = 1, IBEG |
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| 200 | INDEX = IBEG-J+1 |
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| 201 | ! INDEX RUNS FROM IBEG DOWN TO 1. |
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| 202 | XTEMP(J) = X(INDEX) |
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| 203 | IF (J .LT. IBEG) STEMP(J) = WK(2,INDEX) |
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| 204 | END DO |
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| 205 | ! -------------------------------- |
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| 206 | D(1,1) = PCHDF (IBEG, XTEMP, STEMP, IERR) |
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| 207 | ! -------------------------------- |
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| 208 | IF (IERR .NE. 0) GO TO 5009 |
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| 209 | IBEG = 1 |
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| 210 | ENDIF |
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| 211 | ! |
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| 212 | IF ( (IEND.EQ.1).OR.(IEND.EQ.2) ) THEN |
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| 213 | D(1,N) = VC(2) |
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| 214 | ELSE IF (IEND .GT. 2) THEN |
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| 215 | ! PICK UP LAST IEND POINTS. |
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| 216 | DO J = 1, IEND |
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| 217 | INDEX = N-IEND+J |
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| 218 | ! INDEX RUNS FROM N+1-IEND UP TO N. |
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| 219 | XTEMP(J) = X(INDEX) |
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| 220 | IF (J .LT. IEND) STEMP(J) = WK(2,INDEX+1) |
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| 221 | END DO |
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| 222 | ! -------------------------------- |
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| 223 | D(1,N) = PCHDF (IEND, XTEMP, STEMP, IERR) |
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| 224 | ! -------------------------------- |
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| 225 | IF (IERR .NE. 0) GO TO 5009 |
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| 226 | IEND = 1 |
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| 227 | ENDIF |
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| 228 | ! |
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| 229 | ! --------------------( BEGIN CODING FROM CUBSPL )-------------------- |
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| 230 | ! |
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| 231 | ! **** A TRIDIAGONAL LINEAR SYSTEM FOR THE UNKNOWN SLOPES S(J) OF |
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| 232 | ! F AT X(J), J=1,...,N, IS GENERATED AND THEN SOLVED BY GAUSS ELIM- |
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| 233 | ! INATION, WITH S(J) ENDING UP IN D(1,J), ALL J. |
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| 234 | ! WK(1,.) AND WK(2,.) ARE USED FOR TEMPORARY STORAGE. |
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| 235 | ! |
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| 236 | ! CONSTRUCT FIRST EQUATION FROM FIRST BOUNDARY CONDITION, OF THE FORM |
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| 237 | ! WK(2,1)*S(1) + WK(1,1)*S(2) = D(1,1) |
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| 238 | ! |
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| 239 | IF (IBEG .EQ. 0) THEN |
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| 240 | IF (N .EQ. 2) THEN |
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| 241 | ! NO CONDITION AT LEFT END AND N = 2. |
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| 242 | WK(2,1) = ONE |
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| 243 | WK(1,1) = ONE |
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| 244 | D(1,1) = TWO*WK(2,2) |
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| 245 | ELSE |
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| 246 | ! NOT-A-KNOT CONDITION AT LEFT END AND N .GT. 2. |
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| 247 | WK(2,1) = WK(1,3) |
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| 248 | WK(1,1) = WK(1,2) + WK(1,3) |
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| 249 | D(1,1) =((WK(1,2) + TWO*WK(1,1))*WK(2,2)*WK(1,3) & |
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| 250 | + WK(1,2)**2*WK(2,3)) / WK(1,1) |
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| 251 | ENDIF |
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| 252 | ELSE IF (IBEG .EQ. 1) THEN |
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| 253 | ! SLOPE PRESCRIBED AT LEFT END. |
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| 254 | WK(2,1) = ONE |
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| 255 | WK(1,1) = ZERO |
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| 256 | ELSE |
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| 257 | ! SECOND DERIVATIVE PRESCRIBED AT LEFT END. |
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| 258 | WK(2,1) = TWO |
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| 259 | WK(1,1) = ONE |
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| 260 | D(1,1) = THREE*WK(2,2) - HALF*WK(1,2)*D(1,1) |
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| 261 | ENDIF |
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| 262 | ! |
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| 263 | ! IF THERE ARE INTERIOR KNOTS, GENERATE THE CORRESPONDING EQUATIONS AND |
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| 264 | ! CARRY OUT THE FORWARD PASS OF GAUSS ELIMINATION, AFTER WHICH THE J-TH |
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| 265 | ! EQUATION READS WK(2,J)*S(J) + WK(1,J)*S(J+1) = D(1,J). |
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| 266 | ! |
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| 267 | NM1 = N-1 |
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| 268 | IF (NM1 .GT. 1) THEN |
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| 269 | DO J=2,NM1 |
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| 270 | IF (WK(2,J-1) .EQ. ZERO) GO TO 5008 |
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| 271 | G = -WK(1,J+1)/WK(2,J-1) |
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| 272 | D(1,J) = G*D(1,J-1) & |
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| 273 | + THREE*(WK(1,J)*WK(2,J+1) + WK(1,J+1)*WK(2,J)) |
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| 274 | WK(2,J) = G*WK(1,J-1) + TWO*(WK(1,J) + WK(1,J+1)) |
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| 275 | END DO |
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| 276 | ENDIF |
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| 277 | ! |
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| 278 | ! CONSTRUCT LAST EQUATION FROM SECOND BOUNDARY CONDITION, OF THE FORM |
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| 279 | ! (-G*WK(2,N-1))*S(N-1) + WK(2,N)*S(N) = D(1,N) |
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| 280 | ! |
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| 281 | ! IF SLOPE IS PRESCRIBED AT RIGHT END, ONE CAN GO DIRECTLY TO BACK- |
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| 282 | ! SUBSTITUTION, SINCE ARRAYS HAPPEN TO BE SET UP JUST RIGHT FOR IT |
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| 283 | ! AT THIS POINT. |
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| 284 | IF (IEND .EQ. 1) GO TO 30 |
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| 285 | ! |
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| 286 | IF (IEND .EQ. 0) THEN |
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| 287 | IF (N.EQ.2 .AND. IBEG.EQ.0) THEN |
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| 288 | ! NOT-A-KNOT AT RIGHT ENDPOINT AND AT LEFT ENDPOINT AND N = 2. |
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| 289 | D(1,2) = WK(2,2) |
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| 290 | GO TO 30 |
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| 291 | ELSE IF ((N.EQ.2) .OR. (N.EQ.3 .AND. IBEG.EQ.0)) THEN |
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| 292 | ! EITHER (N=3 AND NOT-A-KNOT ALSO AT LEFT) OR (N=2 AND *NOT* |
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| 293 | ! NOT-A-KNOT AT LEFT END POINT). |
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| 294 | D(1,N) = TWO*WK(2,N) |
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| 295 | WK(2,N) = ONE |
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| 296 | IF (WK(2,N-1) .EQ. ZERO) GO TO 5008 |
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| 297 | G = -ONE/WK(2,N-1) |
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| 298 | ELSE |
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| 299 | ! NOT-A-KNOT AND N .GE. 3, AND EITHER N.GT.3 OR ALSO NOT-A- |
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| 300 | ! KNOT AT LEFT END POINT. |
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| 301 | G = WK(1,N-1) + WK(1,N) |
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| 302 | ! DO NOT NEED TO CHECK FOLLOWING DENOMINATORS (X-DIFFERENCES). |
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| 303 | D(1,N) = ((WK(1,N)+TWO*G)*WK(2,N)*WK(1,N-1) & |
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| 304 | + WK(1,N)**2*(F(1,N-1)-F(1,N-2))/WK(1,N-1))/G |
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| 305 | IF (WK(2,N-1) .EQ. ZERO) GO TO 5008 |
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| 306 | G = -G/WK(2,N-1) |
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| 307 | WK(2,N) = WK(1,N-1) |
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| 308 | ENDIF |
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| 309 | ELSE |
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| 310 | ! SECOND DERIVATIVE PRESCRIBED AT RIGHT ENDPOINT. |
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| 311 | D(1,N) = THREE*WK(2,N) + HALF*WK(1,N)*D(1,N) |
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| 312 | WK(2,N) = TWO |
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| 313 | IF (WK(2,N-1) .EQ. ZERO) GO TO 5008 |
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| 314 | G = -ONE/WK(2,N-1) |
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| 315 | ENDIF |
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| 316 | ! |
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| 317 | ! COMPLETE FORWARD PASS OF GAUSS ELIMINATION. |
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| 318 | ! |
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| 319 | WK(2,N) = G*WK(1,N-1) + WK(2,N) |
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| 320 | IF (WK(2,N) .EQ. ZERO) GO TO 5008 |
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| 321 | D(1,N) = (G*D(1,N-1) + D(1,N))/WK(2,N) |
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| 322 | ! |
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| 323 | ! CARRY OUT BACK SUBSTITUTION |
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| 324 | ! |
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| 325 | 30 CONTINUE |
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| 326 | DO J=NM1,1,-1 |
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| 327 | IF (WK(2,J) .EQ. ZERO) GO TO 5008 |
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| 328 | D(1,J) = (D(1,J) - WK(1,J)*D(1,J+1))/WK(2,J) |
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| 329 | END DO |
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| 330 | ! --------------------( END CODING FROM CUBSPL )-------------------- |
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| 331 | ! |
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| 332 | ! NORMAL RETURN. |
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| 333 | ! |
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| 334 | RETURN |
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| 335 | ! |
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| 336 | ! ERROR RETURNS. |
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| 337 | ! |
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| 338 | 5001 CONTINUE |
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| 339 | ! N.LT.2 RETURN. |
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| 340 | IERR = -1 |
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| 341 | CALL XERMSG ('SLATEC', 'PCHSP', & |
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| 342 | 'NUMBER OF DATA POINTS LESS THAN TWO', IERR, 1) |
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| 343 | RETURN |
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| 344 | ! |
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| 345 | 5002 CONTINUE |
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| 346 | ! INCFD.LT.1 RETURN. |
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| 347 | IERR = -2 |
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| 348 | CALL XERMSG ('SLATEC', 'PCHSP', 'INCREMENT LESS THAN ONE', IERR, & |
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| 349 | 1) |
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| 350 | RETURN |
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| 351 | ! |
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| 352 | 5003 CONTINUE |
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| 353 | ! X-ARRAY NOT STRICTLY INCREASING. |
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| 354 | IERR = -3 |
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| 355 | CALL XERMSG ('SLATEC', 'PCHSP', 'X-ARRAY NOT STRICTLY INCREASING' & |
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| 356 | , IERR, 1) |
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| 357 | RETURN |
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| 358 | ! |
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| 359 | 5004 CONTINUE |
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| 360 | ! IC OUT OF RANGE RETURN. |
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| 361 | IERR = IERR - 3 |
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| 362 | CALL XERMSG ('SLATEC', 'PCHSP', 'IC OUT OF RANGE', IERR, 1) |
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| 363 | RETURN |
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| 364 | ! |
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| 365 | 5007 CONTINUE |
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| 366 | ! NWK TOO SMALL RETURN. |
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| 367 | IERR = -7 |
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| 368 | CALL XERMSG ('SLATEC', 'PCHSP', 'WORK ARRAY TOO SMALL', IERR, 1) |
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| 369 | RETURN |
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| 370 | ! |
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| 371 | 5008 CONTINUE |
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| 372 | ! SINGULAR SYSTEM. |
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| 373 | ! *** THEORETICALLY, THIS CAN ONLY OCCUR IF SUCCESSIVE X-VALUES *** |
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| 374 | ! *** ARE EQUAL, WHICH SHOULD ALREADY HAVE BEEN CAUGHT (IERR=-3). *** |
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| 375 | IERR = -8 |
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| 376 | CALL XERMSG ('SLATEC', 'PCHSP', 'SINGULAR LINEAR SYSTEM', IERR, & |
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| 377 | 1) |
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| 378 | RETURN |
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| 379 | ! |
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| 380 | 5009 CONTINUE |
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| 381 | ! ERROR RETURN FROM PCHDF. |
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| 382 | ! *** THIS CASE SHOULD NEVER OCCUR *** |
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| 383 | IERR = -9 |
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| 384 | CALL XERMSG ('SLATEC', 'PCHSP', 'ERROR RETURN FROM PCHDF', IERR, & |
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| 385 | 1) |
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| 386 | RETURN |
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| 387 | !------------- LAST LINE OF PCHSP FOLLOWS ------------------------------ |
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| 388 | END SUBROUTINE PCHSP |
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