Searched refs:polabs (Results 26 – 30 of 30) sorted by relevance
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| /dports/math/gp2c/gp2c-0.0.12/desc/ |
| H A D | func211.dsc | 2569 _.polabs
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| H A D | func213.dsc | 2583 _.polabs
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| /dports/math/pari/pari-2.13.3/doc/ |
| H A D | usersch6.tex | 391 defining the base field, modulo \kbd{polabs} (cf.~\kbd{rnfequation})
395 \kbd{polabs}, where $\beta$ is a root of \kbd{pol}
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| H A D | usersch3.tex | 21127 my(polabs, N,al,S, ala,k, vR);
21131 [polabs,ala,k] = rnfequation(nfK, R, 1);
21133 N = nfgaloisconj(polabs) % Rt; \\ Q-automorphisms of L
21300 attached to the absolute defining polynomial \kbd{polabs} is returned (\fl is
22445 ? L.polabs
22447 ? rnfeltabstorel(L, Mod(x, L.polabs))
22652 %4 = [17, x^2 + 4, x + 8, x^3 + 8*x^2] \\ Z-basis for m in Q[x]/(rnf.polabs)
22658 argument. The entries of $x$ may be given either modulo \kbd{rnf.polabs}
22909 as \kbd{rnf.polabs}; $a$ expresses the generator $\alpha = y \mod \kbd{K.pol}$
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| /dports/math/p5-Math-Pari/pari-2.3.5/doc/ |
| H A D | usersch3.tex | 5004 { local(polabs, N, H);
5006 polabs = rnfequation(nfK, R);
5007 N = nfgaloisconj(polabs) % R; \\ Q-automorphisms of L
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