-
Notifications
You must be signed in to change notification settings - Fork 115
New issue
Have a question about this project? Sign up for a free GitHub account to open an issue and contact its maintainers and the community.
By clicking “Sign up for GitHub”, you agree to our terms of service and privacy statement. We’ll occasionally send you account related emails.
Already on GitHub? Sign in to your account
Filling links in section 3 #37
Conversation
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' |
There was a problem hiding this comment.
Choose a reason for hiding this comment
The reason will be displayed to describe this comment to others. Learn more.
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.
Principal ring: 'ring_theory/principal_ideal_domain.html#submodule.is_principal' | ||
Bezouts theorem: | ||
Bezout's theorem: '' |
There was a problem hiding this comment.
Choose a reason for hiding this comment
The reason will be displayed to describe this comment to others. Learn more.
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: |
There was a problem hiding this comment.
Choose a reason for hiding this comment
The reason will be displayed to describe this comment to others. Learn more.
Don't we have that?
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: |
There was a problem hiding this comment.
Choose a reason for hiding this comment
The reason will be displayed to describe this comment to others. Learn more.
Isn't this offered by fraction fields? I guess it's fair to wait until we have some convenient API anyway.
No description provided.