Abstract and Applied Analysis

Research Article

An Efficient Approach to Numerical Study of the MRLW Equation with B-Spline Collocation Method

Table 3

Invariants and error norms for single solitary wave with , , , .




0	3.5819531	1.3450721	0.1537217	0.0000000	0.0000000
2	3.5819531	1.3450719	0.1537219	0.0373696	0.0211791
4	3.5819531	1.3450715	0.1537223	0.0711480	0.0387624
6	3.5819531	1.3450711	0.1537227	0.1001141	0.0515117
8	3.5819531	1.3450708	0.1537231	0.1249329	0.0614203
10	3.5819531	1.3450705	0.1537234	0.1466243	0.0700260
12	3.5819531	1.3450702	0.1537236	0.1659668	0.0775889
14	3.5819531	1.3450700	0.1537238	0.1833628	0.0844911
16	3.5819531	1.3450698	0.1537240	0.2015361	0.0909663
18	3.5819531	1.3450697	0.1537241	0.2560750	0.0993420
20	3.5819531	1.3450696	0.1537243	0.3585031	0.1702101
20 [6]	3.58197	1.34508	0.153723	0.645295	0.301923
20 [30]	3.58197	1.34508	0.153723	6.06885	2.96650
20 [34]	3.581967	1.345076	0.153723	0.508927	0.222284
20 [35] MQ	3.5819665	1.3450764	0.153723	0.51498	0.22551
20 [35] IMQ	3.5819664	1.3450764	0.153723	0.51498	0.22551
20 [35] IQ	3.5819654	1.3450764	0.153723	0.51498	0.22551
20 [35] GA	3.5819665	1.3450764	0.153723	0.51498	0.22551
20 [35] TPS	3.5819663	1.3450759	0.153723	0.51498	0.26605
20 [36]	3.5820204	1.3450974	0.1537250	0.8112594	0.3569076