Using Fourier transforms

Decomposing into eigenvalues and eigenvectors

Applying Laplace transforms

Using numerical integration

They do not account for non-linear interactions

They are not mathematically rigorous

They require too much computational power

They are too complex

A point where the system is always stable

A point where the system's state does not change over time

A point where the system is always unstable

A point where the system's state changes rapidly

It allows for a linear approximation of the system near the fixed point

It shows the system is stable

It indicates the system is chaotic

It represents a large deviation from the fixed point

To linearize non-linear systems around fixed points

To calculate the determinant of a matrix

To find the eigenvalues of a system

To solve linear equations

(0, 0) and (1, -1)

(0, 0) and (1, 1)

(1, 1) and (-1, -1)

(1, 0) and (0, -1)

By analyzing the eigenvalues

By observing the system's behavior over time

By calculating the determinant

By using numerical simulations

The stability of individual trajectories

The exact solution of the system

The global behavior of the system

The local behavior of the system