Filling links in section 3 #37
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| subfields: 'field_theory/subfield.html' | ||
| Frobenius morphisms: 'algebra/char_p.html#frobenius' | ||
| field extensions: | ||
| integral ring fractional fields: | ||
| Field Q of rational numbers: 'data/rat/basic.html#rat.division_ring' | ||
| Field R of real numbers: 'data/real/basic.html#real.division_ring' | ||
| Field C of complex numbers: 'data/complex/basic.html#complex.field | ||
| D'Alembert-Gauss theorem: 'analysis/complex/polynomial.html#complex.exists_root' | ||
| "D'Alembert-Gauss theorem": 'analysis/complex/polynomial.html#complex.exists_root' |
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This is not the issue, the above thing is not terminated by a ', this was my bad, I fixed it in my PR, if you add it, Git is smart enough to not create conflicts, so please go ahead.
jcommelin
commented
May 30, 2020
| Principal ring: 'ring_theory/principal_ideal_domain.html#submodule.is_principal' | ||
| Bezouts theorem: | ||
| Bezout's theorem: '' |
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Are you sure we don't have this?
| Algebraic elements: | ||
| Transcendental elements: | ||
| Algebraic extensions: | ||
| Algebraically closed fields: | ||
| Rupture fields: | ||
| Rupture fields: 'ring_theory/adjoin_root.html#adjoin_root' | ||
| Splitting fields: |
| Algebraic elements: | ||
| Transcendental elements: | ||
| Algebraic extensions: | ||
| Algebraically closed fields: | ||
| Rupture fields: | ||
| Rupture fields: 'ring_theory/adjoin_root.html#adjoin_root' | ||
| Splitting fields: | ||
| Finite fields: 'field_theory/finite.html' | ||
| Rational fraction fields with one indeterminate over the field: |
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Isn't this offered by fraction fields? I guess it's fair to wait until we have some convenient API anyway.
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