Journal of Mathematics

Research Article

Numerical Solution of Burgers–Huxley Equation Using a Higher Order Collocation Method

Table 6

Comparison of absolute errors with Celik [16] for time T = 0.9 and , , .
xPresent methodCelik [16]
0.031255.2396E − 0108.1600E − 010
0.093752.0197E − 0092.3533E − 009
0.156253.7168E − 0093.6711E − 009
0.218755.2899E − 0094.7682E − 009
0.281256.5979E − 0095.6464E − 009
0.343757.5882E − 0096.3052E − 009
0.406258.2475E − 0096.7438E − 009
0.468758.5759E − 0096.9628E − 009
0.531258.5759E − 0096.9630E − 009
0.593758.2475E − 0096.7437E − 009
0.656257.5882E − 0096.3054E − 009
0.718756.5978E − 0095.6463E − 009
0.781255.2899E − 0094.7682E − 009
0.843753.7168E − 0093.6711E − 009
0.906252.0197E − 0092.3535E − 009
0.968755.2395E − 0108.1600E − 010
CPU-time (s)0.0740