Linear Transformations: Kernel, Range, 1-1, Onto
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1 Linear Transformations: Kernel, Range, 1-1, Onto Linear Algebra Josh Engwer TTU 09 November 2015 Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
2 Kernel of a Linear Transformation () (Kernel of a Linear Transformation) Let L : V W be a linear transformation. Then the kernel of L is defined to be: ker(l) := {v V : L(v) = 0} V i.e. The kernel of L is the set of all vectors in V that are mapped by L to 0. Theorem (The Kernel of L is a Subspace of V) Let L : V W be a linear transformation. Then, ker(l) is a subspace of V. Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
3 Kernel of a Linear Transformation () (Kernel of a Linear Transformation) Let L : V W be a linear transformation. Then the kernel of L is defined to be: ker(l) := {v V : L(v) = 0} V Theorem (The Kernel of L is a Subspace of V) Let L : V W be a linear transformation. Then, ker(l) is a subspace of V. PROOF: L( 0) = 0 = 0 ker(l) = ker(l) is a nonempty subset of V. u, v ker(l) = L(u + v) LT1 = L(u) + L(v) = = 0 = u + v ker(l) α R, v ker(l) = L(αv) LT2 = αl(v) = α( 0) = 0 = αv ker(l) ker(l) is closed under VA & SM = ker(l) is a subspace of V QED Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
4 Range of a Linear Transformation () (Range of a Linear Transformation) Let L : V W be a linear transformation. Then the range of L is defined to be: range(l) := {L(v) W : v V} Theorem (The Range of L is a Subspace of W) Let L : V W be a linear transformation. Then, range(l) is a subspace of W. PROOF: L( 0) = 0 = 0 range(l) = range(l) is nonempty subset of W. L(u), L(v) range(l) = u, v V = (u + v) V = L(u + v) range(l) α R, L(v) range(l) = v V = αv V = L(αv) range(l) range(l) is closed under VA & SM = range(l) is a subspace of W Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
5 Ker(L) & Range(L) in terms of Representative Matrix Corollary (Relationship between a Linear Transformation and its Representative Matrix) Let L : R n R m such that L(x) = Ax. (where A R m n ) Then: ker(l) = NulSp(A) range(l) = ColSp(A) PROOF: x ker(l) R n L(x) = 0 Ax = 0 x NulSp(A) L(x) range(l) R m x R n Ax ColSp(A) Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
6 Rank & Nullity of a Linear Transformation (Rank & Nullity of a Matrix & Linear Transformation) (i) Let A be an m n matrix. Then: rank(a) = dim[colsp(a)] = (# of pivot columns of RREF(A)) nullity(a) = dim[nulsp(a)] = (# of non-pivot columns of RREF(A)) (ii) Let L : V W be a linear transformation. Then: rank(l) = dim[range(l)] nullity(l) = dim[ker(l)] Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
7 Rank-Nullity Theorem Theorem (Rank-Nullity Theorem) (i) Let A be an m n matrix. Then: rank(a) + nullity(a) = (# of columns of A) (ii) Let L : V W be a linear transformation. Then: rank(l) + nullity(l) = dim[domain(l)] Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
8 Preimage of a Vector () (Preimage of a Vector) Let T : V W be a transformation. Then the preimage of vector w W is: Preimage(w) := {v V : T(v) = w} V Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
9 1-1 Linear Transformations () (1-1 Transformation) Let T : V W be a transformation. Then: T is 1-1 (one-to-one) u, v V, T(u) = T(v) = u = v. (1-1 Linear Transformation) Let L : V W be a linear transformation. Then, L is 1-1 ker(l) = { 0}. Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
10 Onto Linear Transformations () (Onto Transformation) Let T : V W be a transformation. Then, T is onto range(t) = W. (Onto Linear Transformation) Let L : V W be a linear transformation such that W is finite-dimensional. Then, L is onto rank(l) = dim(w). Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
11 Isomorphisms () (Isomorphism) Let L : V W be a linear transformation. Then, L is called an isomorphism if L is 1-1 and onto. Moreover, vector spaces V, W are said to be isomorphic (to each other) if there exists an isomorphism from V to W. Theorem (Finite-dimensional Isomorphic Spaces have the same Dimension) Let V, W be finite-dimensional vector spaces. Then, V & W are isomorphic dim(v) = dim(w) PROOF: See the textbook if interested. Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
12 Isomorphisms (Examples) Vector spaces R 4, R 2 2, P 3 are all isomorphic to each other since there exists isomorphisms L 1, L 2 as shown below: ([ ]) a 11 Let L 1 : R 2 2 R 4 a11 a s.t. L 12 1 = a 12 a 21 a 22 a 21 Let L 2 : P 3 R 4 s.t. L 2 ( a0 + a 1 x + a 2 x 2 + a 3 x 3) = Isomorphic vector spaces are essentially the same but with representations by different mathematical objects (vectors, matrices, polynomials.) In particular, matrices & polynomials can be represented by vectors, which will be quite useful in the next two sections... a 22 a 0 a 1 a 2 a 3 Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
13 Fin Fin. Josh Engwer (TTU) Linear Transformations: Kernel, Range, 1-1, Onto 09 November / 13
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