Journal of Applied Mathematics

Research Article

A New Spectral Local Linearization Method for Nonlinear Boundary Layer Flow Problems

Table 5

Effect of varying , , , and on and , when .
Basic SLLM SLLM with SOR ( )
Iter. Iter.
0 1 1 1 11−1.31052731−1.650840420.95 7 −1.31052731−1.65084042
1 1 1 1 10−1.59363827−1.898546970.95 7 −1.59363827−1.89854697
2 1 1 1 8−1.85550919−2.129368880.95 7 −1.85550919−2.12936888
5 1 1 1 6−2.49344366−2.705696281.00 6 −2.49344366−2.70569628
10 1 1 1 6−3.27938346−3.441607711.00 6 −3.27938346−3.44160771
1 0 1 1 10−1.03558899−1.345954670.95 7 −1.03558899−1.34595467
1 2 1 1 8−2.34393108−2.619711040.95 6 −2.34393108−2.61971104
1 4 1 1 6−4.15359239−4.355710361.00 6 −4.15359239−4.35571036
1 6 1 1 6−6.09385439−6.244198851.00 6 −6.09385439−6.24419885
110 1 1 5−10.05256264−10.148746331.00 5−10.05256264−10.14874633
1 1 0 1 8−1.91528421−1.870046011.00 8 −1.91528421−1.87004601
1 1 1 1 10−1.59363827−1.898546970.95 7 −1.59363827−1.89854697
1 1 5 1 13−0.41099838−1.988033250.90 9 −0.41099838−1.98803325
1 1 6 1 15−0.13374591−2.006488560.90 9 −0.13374591−2.00648856
1 110 1 190.92495170−2.070846990.90 10 0.92495170−2.07084699
1 1 1 0 12−1.21175687−1.934650380.95 8 −1.21175687−1.93465038
1 1 1 2 9−1.90764681−1.871496820.95 7 −1.90764681−1.87149682
1 1 1 4 8−2.42217698−1.831975290.95 7 −2.42217698−1.83197529
1 1 1 6 7−2.84650750−1.803485790.95 7 −2.84650750−1.80348579
1 1 110 7−3.54376838−1.763612520.95 7 −3.54376838−1.76361252