Let F⊆K⊆E be extension fields. If K is an algebraic extension of F and let α∈E...

Let E/F be an algebraic extension. Let K and L be intermediate fields (i.e. F ⊆...

Let E/F be an algebraic extension. Let K and L be intermediate fields (i.e. F ⊆ K ⊆ E and F ⊆ L ⊆ E). (i) Prove that if the extension K/F is separable then the extension KL/L is separable. (ii) Prove that if the extension K/F is normal then the extension KL/L is normal. Note: To make things easier for you, you can assume that E/F is finite (hence all extensions are finite),

Let E/F be a field extension, and let α be an element of E that is...

Let E/F be a field extension, and let α be an element of E that is algebraic over F. Let p(x) = irr(α, F) and n = deg p(x). (a) For f(x) ∈ F[x], let r(x) (∈ F[x]) be the remainder of f(x) when divided by p(x). Prove that f(x) +p(x)= r(x)+p(x)in F[x]/p(x). (b) Prove that if |F| < ∞, then | F[x]/p(x)| = |F|n. (For a set A, we denote by |A| the number of elements in A.)

Let E/F be a finite Galois extension such that Gal(E/F) is abelian. Prove that for every...

Let E/F be a finite Galois extension such that Gal(E/F) is abelian. Prove that for every intermediate field K, the extension K/F is Galois.

Let E be an extension of F, and let S be a subset of E.IfF(S) is...

Let E be an extension of F, and let S be a subset of E.IfF(S) is the subfield of E generated by S over F, in other words, the smallest subfield of E containing F and S, describe F(S) explicitly, and justify your characterization.

Let M/F and K/F be Galois extensions with Galois groups G = Gal(M/F) and H =...

Let M/F and K/F be Galois extensions with Galois groups G = Gal(M/F) and H = Gal(K/F). Since M/F is Galois, and K/F is a field extension, we have the composite extension field K M. Show that K M/F is a Galois extension

Let M/F and K/F be Galois extensions with Galois groups G = Gal(M/F) and H =...

Let M/F and K/F be Galois extensions with Galois groups G = Gal(M/F) and H = Gal(K/F). Since M/F is Galois, and K/F is a field extension, we have the composite extension field K M Show that the image is {(τ, υ) ∈ G × H | τ |K∩M = υ|K∩M }

Let A be a matrix with an eigenvalue λ that has an algebraic multiplicity of k,...

Let A be a matrix with an eigenvalue λ that has an algebraic multiplicity of k, but a geometric multiplicity of p < k, i.e. there are p linearly independent generalised eigenvectors of rank 1 associated with the eigenvalue λ, equivalently, the eigenspace of λ has a dimension of p. Show that the generalised eigenspace of rank 2 has at most dimension 2p.

Prove: if s^3 - s^2 is algebraic over a field K then s is algebraic over...

Prove: if s^3 - s^2 is algebraic over a field K then s is algebraic over K.

Let F and L be fields, and let φ : F → L be a ring...

Let F and L be fields, and let φ : F → L be a ring homomorphism. (a) Prove that either φ is one to one or φ is the trivial homomorphism. (b) Prove that if charF= charL, then φ is the trivial homomorphism

Let F be a subfield of a field K satisfying the condition that the dimension of...

Let F be a subfield of a field K satisfying the condition that the dimension of K as a vector space over F is finite and equal to r. Let V be a vector space of finite dimension n > 0 over K. Find the dimension of V as a vector space over F