Linear Algebra with Applications 4th Edition - Solutions by Chapter

Upper triangular systems are solved in reverse order Xn to Xl.

A matrix can be partitioned into matrix blocks, by cuts between rows and/or between columns. Block multiplication ofAB is allowed if the block shapes permit.

The vector b becomes a combination of the columns of A. The system is solvable only when b is in the column space C (A).

dij = 0 if i #- j. Block-diagonal: zero outside square blocks Du.

Complex dot product is x T Y . Perpendicular vectors have x T y = O. (AB)ij = (row i of A)T(column j of B).

has derivative AeAt; eAt u(O) solves u' = Au.

Columns without pivots; these are combinations of earlier columns.

Independent rows, at least one solution to Ax = b, column space is all of Rm. Full rank means full column rank or full row rank.

The nullspace N (A) and row space C (AT) are orthogonal complements in Rn(perpendicular from Ax = 0 with dimensions rand n - r). Applied to AT, the column space C(A) is the orthogonal complement of N(AT) in Rm.

Constant along each antidiagonal; hij depends on i + j.

Complex analog a j i = aU of a symmetric matrix.

Triangular matrix with one extra nonzero adjacent diagonal.

Vector addition and scalar multiplication.

Ps = pascal(n) = the symmetric matrix with binomial entries (i1~;2). Ps = PL Pu all contain Pascal's triangle with det = 1 (see Pascal in the index).

Symmetric matrix with positive eigenvalues and positive pivots. Definition: x T Ax > 0 unless x = O. Then A = LDLT with diag(D» O.

The n by m matrix that "inverts" A from column space back to row space, with N(A+) = N(AT). A+ A and AA+ are the projection matrices onto the row space and column space. Rank(A +) = rank(A).

Column vectors by convention.

A square matrix that has no inverse: det(A) = o.

= sum of diagonal entries = sum of eigenvalues of A. Tr AB = Tr BA.

Entries AL = Ajj. AT is n by In, AT A is square, symmetric, positive semidefinite. The transposes of AB and A-I are BT AT and (AT)-I.