MOTAN | FGH |
---|---|
2<1>1,1 | \(\varepsilon_0+1\) |
2<1>1,1,0 | \(\varepsilon_0+\omega\) |
2<1>1,1<1>1 | \(\varepsilon_0+\omega^\omega\) |
2<1>1,2<1>1 | \(\varepsilon_02\) |
2<1>1,2<1>1,2<1>1 | \(\varepsilon_03\) |
2<1>2 | \(\varepsilon_0\omega\) |
2<1>2,2<1>2 | \(\varepsilon_0\omega2\) |
2<1>3 | \(\varepsilon_0\omega^2\) |
2<1>(1,0) | \(\varepsilon_0\omega^\omega\) |
2<1>(1,1) | \(\varepsilon_0\omega^{\omega+1}\) |
2<1>(2,0) | \(\varepsilon_0\omega^{\omega2}\) |
2<1>(1,0,0) | \(\varepsilon_0\omega^{\omega^2}\) |
2<1>(1<1>1) | \(\varepsilon_0\omega^{\omega^\omega}\) |
2<1>(1<1>1,1<1>1) | \(\varepsilon_0\omega^{\omega^\omega2}\) |
2<1>(1<1>2) | \(\varepsilon_0\omega^{\omega^{\omega+1}}\) |
2<1>(1<1>(1,0)) | \(\varepsilon_0\omega^{\omega^{\omega2}}\) |
2<1>(1<1>(1,0,0)) | \(\varepsilon_0\omega^{\omega^{\omega^2}}\) |
2<1>(1<1>(1<1>1)) | \(\varepsilon_0\omega^{\omega^{\omega^\omega}}\) |
2<1>(2<1>1) | \(\varepsilon_0^2\) |
2<1>(2<1>1,1) | \(\varepsilon_0^2\omega\) |
2<1>(2<1>1,1<1>1) | \(\varepsilon_0^2\omega^{\omega^\omega}\) |
2<1>(2<1>1,2<1>1) | \(\varepsilon_0^3\) |
2<1>(2<1>2) | \(\varepsilon_0^\omega\) |
2<1>(2<1>2,2<1>1) | \(\varepsilon_0^{\omega+1}\) |
2<1>(2<1>2,2<1>2) | \(\varepsilon_0^{\omega2}\) |
2<1>(2<1>3) | \(\varepsilon_0^{\omega^2}\) |
2<1>(2<1>(1,0)) | \(\varepsilon_0^{\omega^\omega}\) |
2<1>(2<1>(1<1>1)) | \(\varepsilon_0^{\omega^{\omega^\omega}}\) |
2<1>(2<1>(2<1>1)) | \(\varepsilon_0^{\varepsilon_0}\) |
2<1>(2<1>(2<1>(2<1>1))) | \(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}\) |
3<1>1 | \(\varepsilon_1\) |
4<1>1 | \(\varepsilon_2\) |
(1,0)<1>1 | \(\varepsilon_\omega\) |
(1,1)<1>1 | \(\varepsilon_{\omega+1}\) |
(2,0)<1>1 | \(\varepsilon_{\omega2}\) |
(1,0,0)<1>1 | \(\varepsilon_{\omega^2}\) |
(1<1>1)<1>1 | \(\varepsilon_{\omega^\omega}\) |
(1<1>(1<1>1))<1>1 | \(\varepsilon_{\omega^{\omega^\omega}}\) |
(2<1>1)<1>1 | \(\varepsilon_{\varepsilon_0}\) |
((1,0)<1>1)<1>1 | \(\varepsilon_{\varepsilon_\omega}\) |
((2<1>1)<1>1)<1>1 | \(\varepsilon_{\varepsilon_{\varepsilon_0}}\) |
1<1>1<1>1 | \(\zeta_0\) |
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