### Table 2. Numers of iteration

"... In PAGE 19: ...he assumption (2.6) is violated again with this example. But Algorithm 2.1 still converges well, see the numbers of iteration listed in Table2 . Here, the relative error is taken to be the same as in the previous example.... ..."

Cited by 5

### Table 6: Nodes searched and CPU time with various iterations and disjunctive variables in the common subspace iterative cuts.

### Table 6: Nodes searched and CPU time with various iterations and disjunctive variables in the common subspace iterative cuts.

1997

### Table 10: Comparison between cut families for nodes bounded and total running times.

### Table 10: Comparison between cut families for nodes bounded and total running times.

1997

### Table 2: Numerical computation times (10 iterations)

1997

Cited by 9

### Table 2: Numerical computation times (10 iterations)

1997

Cited by 9

### Table 1: The number of iterations in numerical solver with and without center position estimation

2001

"... In PAGE 18: ... To perform experiments, 61 prerecorded motion clips were used as the input for motion retargetting. Table1 shows the number of iterations in numerical optimization with and without initial body center position estimation. Statistics for five selected motion clips are given in the first five rows of the table.... ..."

### Table 4 Numerical results for parallel iterations on an IBM SP2

"... In PAGE 6: ... The Jacobians and nonlinear residuals are computed in a similar, parallel fashion #28see #5B4#5D for more details#29. Table4 contains the results #28for Bi- CGSTAB#2FGS, the number of linear iterations for correction cycles on the #0Cnest level was increased 10#25 over the serial case#29. We note that the preconditioner is local so that the number of iterations of either Bi-CGSTAB#2FGS or GMRES#2FGS to reduce the residual norm by a #0Cxed amountisnow also a function of the number of processors.... In PAGE 6: ... We note that the preconditioner is local so that the number of iterations of either Bi-CGSTAB#2FGS or GMRES#2FGS to reduce the residual norm by a #0Cxed amountisnow also a function of the number of processors. As re#0Dected in Table4 , we obtain parallel e#0Eciencies in the range 70#25#7B80#25 using 8 processors. Higher e#0Eciencies should be obtained for detailed chemistry di#0Busion #0Dame problems where most of the CPU time is spent in the time relaxation phase evaluating Jacobians #5B4#5D.... ..."

### Table I. Number of Iterations in Numerical Solver With and Without Root Position Estimation Number of Iterations

2001

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