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In linear algebra, the Perron–Frobenius theorem, proved by Template:Harvs and Template:Harvs, asserts that a real square matrix with positive entries has a unique largest real eigenvalue and that the corresponding eigenvector has strictly positive components, and also asserts a similar statement for certain classes of nonnegative matrices. This theorem has important applications to probability theory (ergodicity of Markov chains); to the theory of dynamical systems (subshifts of finite type); to economics (Okishio's theorem, Leontief's input-output model);^[1] to demography (Leslie population age distribution model),^[2] to Internet search engines^[3] and even ranking of football teams^[4]

Statement of the Perron–Frobenius theorem

A matrix in which all entries are positive real numbers is here called positive and a matrix whose entries are non-negative real numbers is here called non-negative. The eigenvalues of a real square matrix A are complex numbers and collectively they make up the spectrum of the matrix. The exponential growth rate of the matrix powers A^k as k → ∞ is controlled by the eigenvalue of A with the largest absolute value. The Perron–Frobenius theorem describes the properties of the leading eigenvalue and of the corresponding eigenvectors when A is a non-negative real square matrix. Early results were due to Template:Harvs and concerned positive matrices. Later, Template:Harvs found their extension to certain classes of non-negative matrices.

Positive matrices

Let ${\displaystyle A=(a_{ij})}$ be an ${\displaystyle n\times n}$ positive matrix: ${\displaystyle a_{ij}>0}$ for ${\displaystyle 1\le i,j\le n}$. Then the following statements hold.

1. There is a positive real number r, called the Perron root or the Perron–Frobenius eigenvalue, such that r is an eigenvalue of A and any other eigenvalue λ (possibly, complex) is strictly smaller than r in absolute value, |λ| < r. Thus, the spectral radius ${\displaystyle \rho (A)}$ is equal to r. If the matrix coefficients are algebraic, this implies that the eigenvalue is a Perron number.
2. The Perron–Frobenius eigenvalue is simple: r is a simple root of the characteristic polynomial of A. Consequently, the eigenspace associated to r is one-dimensional. (The same is true for the left eigenspace, i.e., the eigenspace for A^T.)
3. There exists an eigenvector v = (v₁,…,v_n) of A with eigenvalue r such that all components of v are positive: A v = r v, v_i > 0 for 1 ≤ i ≤ n. (Respectively, there exists a positive left eigenvector w : w^T A = r w^T, w_i > 0.)
4. There are no other positive (moreover non-negative) eigenvectors except positive multiples of v (respectively, left eigenvectors except w), i.e., all other eigenvectors must have at least one negative or non-real component.
5. ${\displaystyle \underset{k\to \mathrm{\infty }}{\lim }{A}^k/r^k=v{w}^T}$, where the left and right eigenvectors for A are normalized so that w^Tv = 1. Moreover, the matrix v w^T is the projection onto the eigenspace corresponding to r. This projection is called the Perron projection.
6. Collatz–Wielandt formula: for all non-negative non-zero vectors x, let f(x) be the minimum value of [Ax]_i / x_i taken over all those i such that x_i ≠ 0. Then f is a real valued function whose maximum is the Perron–Frobenius eigenvalue.
7. A "Min-max" Collatz–Wielandt formula takes a form similar to the one above: for all strictly positive vectors x, let g(x) be the maximum value of [Ax]_i / x_i taken over i. Then g is a real valued function whose minimum is the Perron–Frobenius eigenvalue.
8. The Perron–Frobenius eigenvalue satisfies the inequalities

${\displaystyle {\min }_i\sum _j{a}_{ij}\le r\le {\max }_i\sum _j{a}_{ij}.}$

These claims can be found in Meyer^[5] chapter 8 claims 8.2.11-15 page 667 and exercises 8.2.5,7,9 pages 668-669.

The left and right eigenvectors v and w are usually normalized so that the sum of their components is equal to 1; in this case, they are sometimes called stochastic eigenvectors.

Non-negative matrices

An extension of the theorem to matrices with non-negative entries is also available. In order to highlight the similarities and differences between the two cases the following points are to be noted: every non-negative matrix can be obviously obtained as a limit of positive matrices, thus one obtains the existence of an eigenvector with non-negative components; obviously the corresponding eigenvalue will be non-negative and greater or equal in absolute value than all other eigenvalues.^[6][7] However, the simple examples

${\displaystyle \left(\begin{array}{cc}0& 1\\ 1& 0\end{array}\right),\left(\begin{array}{cc}0& 1\\ 0& 0\end{array}\right)}$

show that for non-negative matrices there may exist eigenvalues of the same absolute value as the maximal one ((1) and (−1) – eigenvalues of the first matrix); moreover the maximal eigenvalue may not be a simple root of the characteristic polynomial, can be zero and the corresponding eigenvector (1,0) is not strictly positive (second example). So it may seem that most properties are broken for non-negative matrices, however Frobenius found the right way.

The key feature of theory in the non-negative case is to find some special subclass of non-negative matrices— irreducible matrices— for which a non-trivial generalization is possible. Namely, although eigenvalues attaining maximal absolute value may not be unique, the structure of maximal eigenvalues is under control: they have the form e^i2πl/hr, where h is some integer number—period of matrix, r is a real strictly positive eigenvalue, l = 0, 1, ..., h − 1. The eigenvector corresponding to r has strictly positive components (in contrast with the general case of non-negative matrices, where components are only non-negative). Also all such eigenvalues are simple roots of the characteristic polynomial. Further properties are described below.

Classification of matrices

Let A be a square matrix (not necessarily positive or even real). The matrix A is irreducible if any of the following equivalent properties holds.

Definition 1 : A does not have non-trivial invariant coordinate subspaces. Here a non-trivial coordinate subspace means a linear subspace spanned by any proper subset of basis vectors. More explicitly, for any linear subspace spanned by basis vectors e_i1 , ..., e_ik, n > k > 0 its image under the action of A is not contained in the same subspace.

Definition 2: A cannot be conjugated into block upper triangular form by a permutation matrix P:

${\displaystyle PA{P}^{-1}\ne \left(\begin{array}{cc}E& F\\ 0& G\end{array}\right),}$

where E and G are non-trivial (i.e. of size greater than zero) square matrices.

If A is non-negative other definitions exist:

Definition 3: For every pair of indices i and j, there exists a natural number m such that (A^m)_ij is not equal to 0.

Definition 4: One can associate with a matrix A a certain directed graph G_A. It has exactly n vertices, where n is size of A, and there is an edge from vertex i to vertex j precisely when A_ij > 0. Then the matrix A is irreducible if and only if its associated graph G_A is strongly connected.

A matrix is reducible if it is not irreducible.

Let A be non-negative. Fix an index i and define the period of index i to be the greatest common divisor of all natural numbers m such that (A^m)_ii > 0. When A is irreducible, the period of every index is the same and is called the period of A. In fact, when A is irreducible, the period can be defined as the greatest common divisor of the lengths of the closed directed paths in G_A (see Kitchens^[8] page 16). The period is also called the index of imprimitivity (Meyer^[5] page 674) or the order of cyclicity.

If the period is 1, A is aperiodic.

A matrix A is primitive if it is non-negative and its mth power is positive for some natural number m (i.e. the same m works for all pairs of indices). It can be proved that primitive matrices are the same as irreducible aperiodic non-negative matrices.

A positive square matrix is primitive and a primitive matrix is irreducible. All statements of the Perron–Frobenius theorem for positive matrices remain true for primitive matrices. However, a general non-negative irreducible matrix A may possess several eigenvalues whose absolute value is equal to the spectral radius of A, so the statements need to be correspondingly modified. Actually the number of such eigenvalues is exactly equal to the period. Results for non-negative matrices were first obtained by Frobenius in 1912.

Perron–Frobenius theorem for irreducible matrices

Let A be an irreducible non-negative n × n matrix with period h and spectral radius ρ(A) = r. Then the following statements hold.

1. The number r is a positive real number and it is an eigenvalue of the matrix A, called the Perron–Frobenius eigenvalue.
2. The Perron–Frobenius eigenvalue r is simple. Both right and left eigenspaces associated with r are one-dimensional.
3. A has a left eigenvector v with eigenvalue r whose components are all positive.
4. Likewise, A has a right eigenvector w with eigenvalue r whose components are all positive.
5. The only eigenvectors whose components are all positive are those associated with the eigenvalue r.
6. Matrix A has exactly h (where h is the period) complex eigenvalues with absolute value r. Each of them is a simple root of the characteristic polynomial and is the product of r with an hth root of unity.
7. Let ω = 2π/h. Then the matrix A is similar to e^iωA, consequently the spectrum of A is invariant under multiplication by e^iω (corresponding to the rotation of the complex plane by the angle ω).
8. If h > 1 then there exists a permutation matrix P such that

${\displaystyle PA{P}^{-1}=\left(\begin{array}{cccccc}0& A_1& 0& 0& \dots & 0\\ 0& 0& A_2& 0& \dots & 0\\ ⋮& ⋮& ⋮& ⋮& & ⋮\\ 0& 0& 0& 0& \dots & A_{h-1}\\ A_h& 0& 0& 0& \dots & 0\end{array}\right),}$

where the blocks along the main diagonal are zero square matrices.

9. Collatz–Wielandt formula: for all non-negative non-zero vectors x let f(x) be the minimum value of [Ax]_i / x_i taken over all those i such that x_i ≠ 0. Then f is a real valued function whose maximum is the Perron–Frobenius eigenvalue.

10. The Perron–Frobenius eigenvalue satisfies the inequalities

${\displaystyle {\min }_i\sum _j{a}_{ij}\le r\le {\max }_i\sum _j{a}_{ij}.}$

The matrix ${\displaystyle \left(\begin{array}{ccc}0& 0& 1\\ 0& 0& 1\\ 1& 1& 0\\ \end{array}\right)}$ shows that the blocks on the diagonal may be of different sizes, the matrices A_j need not be square, and h need not divide n.

Further properties

Let A be an irreducible non-negative matrix, then:

1. (I+A)ⁿ⁻¹ is a positive matrix. (Meyer^[5] claim 8.3.5 p. 672).
2. Wielandt's theorem. If |B|<A, then ρ(B)≤ρ(A). If equality holds (i.e. if μ=ρ(A)e^iφ is eigenvalue for B), then B = e^iφ D AD⁻¹ for some diagonal unitary matrix D (i.e. diagonal elements of D equals to e^iΘ_l, non-diagonal are zero).^[9]
3. If some power A^q is reducible, then it is completely reducible, i.e. for some permutation matrix P, it is true that: ${\displaystyle PA{P}^{-1}=\left(\begin{array}{ccccc}{A}_1& 0& 0& \dots & 0\\ 0& A_2& 0& \dots & 0\\ ⋮& ⋮& ⋮& & ⋮\\ 0& 0& 0& \dots & A_d\\ \end{array}\right)}$, where A_i are irreducible matrices having the same maximal eigenvalue. The number of these matrices d is the greatest common divisor of q and h, where h is period of A.^[10]
4. If c(x)=xⁿ+c_k1 x^n-k₁ +c_k2 x^n-k₂ + ... + c_ks x^n-k_s is the characteristic polynomial of A in which the only nonzero coefficients are listed, then the period of A equals to the greatest common divisor for k₁, k₂, ... , k_s.^[11]
5. Cesàro averages: ${\displaystyle \underset{k\to \mathrm{\infty }}{\lim }1/k\sum _{i=0,...,k}{A}^i/r^i=(v{w}^t),}$ where the left and right eigenvectors for A are normalized so that w^tv = 1. Moreover the matrix v w^t is the spectral projection corresponding to r - Perron projection.^[12]
6. Let r be the Perron-Frobenius eigenvalue, then the adjoint matrix for (r-A) is positive.^[13]
7. If A has at least one non-zero diagonal element, then A is primitive.^[14]

Also:

• If 0 ≤ A < B, then r_A ≤ r_B. Moreover, if A is irreducible, then the inequality is strict: r_A < r_B.

One of the definitions of primitive matrix requires A to be non-negative and there exists m, such that A^m is positive. One may one wonder how big m can be, depending on the size of A. The following answers this question.

• Assume A is non-negative primitive matrix of size n, then A^n2-2n+2 is positive. Moreover, if n > 1, there exists a matrix M given below, such that M^k is not positive (but of course still non-negative) for all k < n²-2n+2, in particular (M^n2-2n+1)₁₁=0.

${\displaystyle M=\left(\begin{array}{cccccc}0& 1& 0& 0& ...& 0\\ 0& 0& 1& 0& ...& 0\\ 0& 0& 0& 1& ...& 0\\ ⋮& ⋮& ⋮& ⋮& & ⋮\\ 0& 0& 0& 0& ...& 1\\ 1& 1& 0& 0& ...& 0\\ \end{array}\right)}$^[15]