galois group उदाहरण वाक्य
उदाहरण वाक्य
- All finite groups do occur as Galois groups.
- the automorphisms also leave fixed, so they are elements of the Galois group.
- Therefore, if belongs to the Galois group of, then maps into itself.
- Galois groups for infinite extensions are profinite groups.
- This means that the number of elements in the associated Galois group is 1.
- This interpretation of the Galois group is known as Grothendieck's Galois theory.
- This group is isomorphic to the absolute Galois group of an arbitrary finite field.
- The Galois group of this septic is the maximal solvable group of order 42.
- See also Complex conjugate and Galois group.
- There is even a polynomial with integral coefficients whose Galois group is the Monster group.