LAPACK  3.6.1
LAPACK: Linear Algebra PACKage
subroutine dchkbl ( integer  NIN,
integer  NOUT 
)

DCHKBL

Purpose:
 DCHKBL tests DGEBAL, a routine for balancing a general real
 matrix and isolating some of its eigenvalues.
Parameters
[in]NIN
          NIN is INTEGER
          The logical unit number for input.  NIN > 0.
[in]NOUT
          NOUT is INTEGER
          The logical unit number for output.  NOUT > 0.
Author
Univ. of Tennessee
Univ. of California Berkeley
Univ. of Colorado Denver
NAG Ltd.
Date
November 2011

Definition at line 56 of file dchkbl.f.

56 *
57 * -- LAPACK test routine (version 3.4.0) --
58 * -- LAPACK is a software package provided by Univ. of Tennessee, --
59 * -- Univ. of California Berkeley, Univ. of Colorado Denver and NAG Ltd..--
60 * November 2011
61 *
62 * .. Scalar Arguments ..
63  INTEGER nin, nout
64 * ..
65 *
66 * ======================================================================
67 *
68 * .. Parameters ..
69  INTEGER lda
70  parameter ( lda = 20 )
71  DOUBLE PRECISION zero
72  parameter ( zero = 0.0d+0 )
73 * ..
74 * .. Local Scalars ..
75  INTEGER i, ihi, ihiin, ilo, iloin, info, j, knt, n,
76  $ ninfo
77  DOUBLE PRECISION anorm, meps, rmax, sfmin, temp, vmax
78 * ..
79 * .. Local Arrays ..
80  INTEGER lmax( 3 )
81  DOUBLE PRECISION a( lda, lda ), ain( lda, lda ), dummy( 1 ),
82  $ scale( lda ), scalin( lda )
83 * ..
84 * .. External Functions ..
85  DOUBLE PRECISION dlamch, dlange
86  EXTERNAL dlamch, dlange
87 * ..
88 * .. External Subroutines ..
89  EXTERNAL dgebal
90 * ..
91 * .. Intrinsic Functions ..
92  INTRINSIC abs, max
93 * ..
94 * .. Executable Statements ..
95 *
96  lmax( 1 ) = 0
97  lmax( 2 ) = 0
98  lmax( 3 ) = 0
99  ninfo = 0
100  knt = 0
101  rmax = zero
102  vmax = zero
103  sfmin = dlamch( 'S' )
104  meps = dlamch( 'E' )
105 *
106  10 CONTINUE
107 *
108  READ( nin, fmt = * )n
109  IF( n.EQ.0 )
110  $ GO TO 70
111  DO 20 i = 1, n
112  READ( nin, fmt = * )( a( i, j ), j = 1, n )
113  20 CONTINUE
114 *
115  READ( nin, fmt = * )iloin, ihiin
116  DO 30 i = 1, n
117  READ( nin, fmt = * )( ain( i, j ), j = 1, n )
118  30 CONTINUE
119  READ( nin, fmt = * )( scalin( i ), i = 1, n )
120 *
121  anorm = dlange( 'M', n, n, a, lda, dummy )
122  knt = knt + 1
123 *
124  CALL dgebal( 'B', n, a, lda, ilo, ihi, scale, info )
125 *
126  IF( info.NE.0 ) THEN
127  ninfo = ninfo + 1
128  lmax( 1 ) = knt
129  END IF
130 *
131  IF( ilo.NE.iloin .OR. ihi.NE.ihiin ) THEN
132  ninfo = ninfo + 1
133  lmax( 2 ) = knt
134  END IF
135 *
136  DO 50 i = 1, n
137  DO 40 j = 1, n
138  temp = max( a( i, j ), ain( i, j ) )
139  temp = max( temp, sfmin )
140  vmax = max( vmax, abs( a( i, j )-ain( i, j ) ) / temp )
141  40 CONTINUE
142  50 CONTINUE
143 *
144  DO 60 i = 1, n
145  temp = max( scale( i ), scalin( i ) )
146  temp = max( temp, sfmin )
147  vmax = max( vmax, abs( scale( i )-scalin( i ) ) / temp )
148  60 CONTINUE
149 *
150 *
151  IF( vmax.GT.rmax ) THEN
152  lmax( 3 ) = knt
153  rmax = vmax
154  END IF
155 *
156  GO TO 10
157 *
158  70 CONTINUE
159 *
160  WRITE( nout, fmt = 9999 )
161  9999 FORMAT( 1x, '.. test output of DGEBAL .. ' )
162 *
163  WRITE( nout, fmt = 9998 )rmax
164  9998 FORMAT( 1x, 'value of largest test error = ', d12.3 )
165  WRITE( nout, fmt = 9997 )lmax( 1 )
166  9997 FORMAT( 1x, 'example number where info is not zero = ', i4 )
167  WRITE( nout, fmt = 9996 )lmax( 2 )
168  9996 FORMAT( 1x, 'example number where ILO or IHI wrong = ', i4 )
169  WRITE( nout, fmt = 9995 )lmax( 3 )
170  9995 FORMAT( 1x, 'example number having largest error = ', i4 )
171  WRITE( nout, fmt = 9994 )ninfo
172  9994 FORMAT( 1x, 'number of examples where info is not 0 = ', i4 )
173  WRITE( nout, fmt = 9993 )knt
174  9993 FORMAT( 1x, 'total number of examples tested = ', i4 )
175 *
176  RETURN
177 *
178 * End of DCHKBL
179 *
double precision function dlamch(CMACH)
DLAMCH
Definition: dlamch.f:65
subroutine dgebal(JOB, N, A, LDA, ILO, IHI, SCALE, INFO)
DGEBAL
Definition: dgebal.f:162
double precision function dlange(NORM, M, N, A, LDA, WORK)
DLANGE returns the value of the 1-norm, Frobenius norm, infinity-norm, or the largest absolute value ...
Definition: dlange.f:116

Here is the call graph for this function:

Here is the caller graph for this function: