Trailing-Edge
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PDP-10 Archives
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decuslib20-02
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decus/20-0026/dleps.ssp
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C DEPS 10
���C ..................................................................DEPS 20
���C DEPS 30
���C SUBROUTINE DLEPS DEPS 40
���C DEPS 50
���C PURPOSE DEPS 60
���C COMPUTES THE VALUE OF AN N-TERM EXPANSION IN LEGENDRE DEPS 70
���C POLYNOMIALS WITH COEFFICIENT VECTOR C FOR ARGUMENT VALUE X. DEPS 80
���C DEPS 90
���C USAGE DEPS 100
���C CALL DLEPS(Y,X,C,N) DEPS 110
���C DEPS 120
���C DESCRIPTION OF PARAMETERS DEPS 130
���C Y - RESULT VALUE DEPS 140
���C DOUBLE PRECISION VARIABLE DEPS 150
���C X - ARGUMENT VALUE DEPS 160
���C DOUBLE PRECISION VARIABLE DEPS 170
���C C - COEFFICIENT VECTOR OF GIVEN EXPANSION DEPS 180
���C COEFFICIENTS ARE ORDERED FROM LOW TO HIGH DEPS 190
���C DOUBLE PRECISION VECTOR DEPS 200
���C N - DIMENSION OF COEFFICIENT VECTOR C DEPS 210
���C DEPS 220
���C REMARKS DEPS 230
���C OPERATION IS BYPASSED IN CASE N LESS THAN 1 DEPS 240
���C DEPS 250
���C SUBROUTINES AND FUNCTION SUBPROGRAMS REQUIRED DEPS 260
���C NONE DEPS 270
���C DEPS 280
���C METHOD DEPS 290
���C DEFINITION DEPS 300
���C Y=SUM(C(I)*P(I-1,X), SUMMED OVER I FROM 1 TO N). DEPS 310
���C EVALUATION IS DONE BY MEANS OF UPWARD RECURSION DEPS 320
���C USING THE RECURRENCE EQUATION FOR LEGENDRE POLYNOMIALS DEPS 330
���C P(N+1,X)=2*X*P(N,X)-P(N-1,X)-(X*P(N,X)-P(N-1,X))/(N+1). DEPS 340
���C DEPS 350
���C ..................................................................DEPS 360
���C DEPS 370
��� SUBROUTINE DLEPS(Y,X,C,N) DEPS 380
���C DEPS 390
��� DIMENSION C(1) DEPS 400
��� DOUBLE PRECISION C,Y,X,H0,H1,H2 DEPS 410
���C DEPS 420
���C TEST OF DIMENSION DEPS 430
��� IF(N)1,1,2 DEPS 440
��� 1 RETURN DEPS 450
���C DEPS 460
��� 2 Y=C(1) DEPS 470
��� IF(N-2)1,3,3 DEPS 480
���C DEPS 490
���C INITIALIZATION DEPS 500
��� 3 H0=1.D0 DEPS 510
��� H1=X DEPS 520
���C DEPS 530
��� DO 4 I=2,N DEPS 540
��� H2=X*H1 DEPS 550
��� H2=H2-H0+H2-(H2-H0)/DFLOAT(I) DEPS 560
��� H0=H1 DEPS 570
��� H1=H2 DEPS 580
��� 4 Y=Y+C(I)*H0 DEPS 590
��� RETURN DEPS 600
��� END DEPS 610
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