Solves the Lyapunov matrix equation. The data types you wire to the A and B inputs determine the polymorphic instance to use.


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The following equation defines the continuous Lyapunov equation:

AX + XAH = αB

where AH is the conjugate transpose of A and α is a scaling factor used to avoid overflow in X.

The continuous Lyapunov equation has a unique solution if and only if λi + λ*j ≠ 0 for all eigenvalues of A, where λ* is the complex conjugate of λ.

The following equation defines the discrete Lyapunov equation:

AXAHX = αB

where AH is the conjugate transpose of A and α is a scaling factor used to avoid overflow in X.

The discrete Lyapunov equation has a unique solution if and only if λiλ*j ≠ 1 for all eigenvalues of A, where λ* is the complex conjugate of λ.