Diagonalisation Flashcards
When is a linear operator phi diagonalisable
Linear operator phi diagonalisable if :
E basis alpha of V consisting of eigenvectors of phi (alpha is called eigenbasis of V)
When is a matrix A diagonalisable
Matrix A is diagonalisable when:
E matrix P s.t P^-1AP is diagonal (A is diagonalised by P)
This is equivalent to previous linear operator flashcards
What is formula for diagonal matrix D^k
Formula for diagonal matrix D^k is:
All entries raised to kth power
So A^k = PD^kP^-1
When are V1,…,Vn eigenvectors of phi L.I
V1,…Vn are L.I when they have distinct eigenvalues L1,…Lm
What is algebraic multiplicity
Algebraic multiplicity is:
Largest power of L-t that divides characteristic polynomial
What is geometric multiplicity of L
Geometric multiplicity of L is
Dim(E(phi)) where E(phi) is L-eigenspace of phi
What is relationship between a.m(L) and g.m(L)
Relationship between a.m(L) and g.m(L) is:
A.m(L) >= g.m(L)
When is a linear operator phi diagonalisable
Linear operator phi is diagonalisable when:
Characteristic polynomial is a product of linear factors and a.m(L) = g.m(L) for all eigenvalues L
