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Table 2 The MAEs of Example  2

From: Shifted Jacobi collocation method for solving multi-dimensional fractional Stokes’ first problem for a heated generalized second grade fluid

(N,M) Our method with \(\alpha _{1}=\beta _{1}=\frac{1}{2}\), \(\alpha _{2}=\beta _{2}=0\) and several choices of γ
0.4 0.5 0.6
(4,4) 7.27394 × 10−3 6.35126 × 10−3 5.08519 × 10−3
(4,12) 1.81744 × 10−4 1.29398 × 10−4 8.43394 × 10−4
(4,36) 6.87762 × 10−6 5.42605 × 10−6 3.79045 × 10−6
\(\tau=h^{2}\) Fourier method and an extrapolation technique [42]
0.4 0.5 0.6
\(\frac{1}{4}\) 7.0342 × 10−3 1.0336 × 10−2 1.3420 × 10−2
\(\frac{1}{64}\) 8.2629 × 10−4 1.0360 × 10−3 1.1898 × 10−3
\(\frac{1}{1024}\) 8.2731 × 10−5 7.5748 × 10−5 1.3471 × 10−4