Index of names
B, C, D, E, F, G, H, I, L, M, N, O, P, Q, R, S, T, U, V, W, X, Y Z.
A
Adjoint matrix
Algebraic complement (Cofactor)
B
bac-cab rule
Basis
Bilinear Fomrs
Binet theorem
C
Cauchy–Schwarz inequality
Change of basis
Cofactor (algebraic complement)
Commutator
Complex dot product
Covectors
Cross Product
D
Derivative (linearity of)
Diagonalization
Dimension of a vector space
Direct Sum
Dot Product
Dual Space
E
Eigenvectors (Eigenvalues)
Exchange Lemma
F
Linear Forms
Frobenius Norm
G
Formula di Grassmann
Gauss Elimination Method
Gram Schmidt Orthogonalization Process
H
Hermitian dot product
Hermitian Matrix
Hom(V, W)
Homogeneous systems
I
Image of a linear transformation
Inner product
Isomorphisms
J
K
Kernel of a linear transformation
Kronecker product
L
Lagrange’s Identity
Laplace expansion
length (of a vector)
Levi-Civita symbol
Linear maps (transformations)
linear
M
Matrix-vector multiplication
Matrix Representation Theorem
Metric Spaces
Minor
Multilinear Transformations
N
Norm
O
One-forms
orthogonal complement
P
Projections of a Vector
Q
Quadratic forms
R
Rank of a matrix
Rouché-Capelli Theorem
S
Scalar triple product
sequence space
Similar matrices
Sottospazio vettoriale generato
Span
Steinitz Lemma
Sums of Subspaces
Symmetric Matrix
T
taxicab norm, ‖⋅‖1
Tensors
Transpose
Trace
Triangle inequality
U
V
Vector product (Cross Product)
Vector space
Index