Section 1.3: Subspaces

Descrição

Linear Algebra Mapa Mental sobre Section 1.3: Subspaces, criado por b33chyk33n em 27-03-2015.
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Mapa Mental por b33chyk33n, atualizado more than 1 year ago
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Resumo de Recurso

Section 1.3: Subspaces

Anotações:

  • Subspace: A subset, W, of a vector space, V, with the operations of addition and scalar multiplication defined on V. In addition the following conditions must hold: 1. [Closed under +] - For all x,y in W, x+y must be in W 2. [Closed under scalar] - For all c in F and x in W, cx must be in W 3. [Zero vector] - W must contain the zero vector 4. [Inverses] - For all x in W, there must exist a y in W s.t. x+y = 0
  1. Theorem 1.3 (Conditions for a Subspace)

    Anotações:

    • Theorem 1.3 [Conditions for a Subspace] - Let V be a vector space and W be a subset of V. Then W is a subspace of V iff the following conditions hold: a) 0 exists in W b) For all x,y in W, x+y exists in W c) For all c in F and x in W, cx exists in W
    1. Theorem 1.4 (Intersection of Subspaces)

      Anotações:

      • Theorem 1.4 [Intersection of Subspaces] - Any intersection of subspaces of a vector space V is a subspace of V.
      1. Zero Subspace

        Anotações:

        • {0} is the zero subspace of a vector space V
        1. Symmetric Matrix

          Anotações:

          • Symmetric Matrix: A matrix A s.t. A = A-transpose
          1. Diagonal Matrix

            Anotações:

            • Diagonal Matrix: An nxn matrix M s.t. Mij = 0 whenever i does not equal j
            1. Upper Triangular Matrix

              Anotações:

              • Upper Triangular Matrix: A matrix A s.t. Aij = 0 whenever i>j
              1. Direct Sum

                Anotações:

                • Direct Sum: A vector space V is the direct sum of two subspaces W1 and W2 if the following: 1. W1 intersect W2 = {0} 2. W1 + W2 = V
                1. Sum

                  Anotações:

                  • Sum: The sum of two nonemtpy subsets of a vector space V, S1 and S2, is defined as the following: S1+S2 = {x+y: x in S1 and y in S2}
                  1. Skew-Symmetric Matrix

                    Anotações:

                    • Skew-Symmetric Matrix: A nxn matrix M s.t. M-transpose = -M

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