Hyperbolic point

In applied mathematics, a hyperbolic point in a system dx/dt = F(x) of ordinary differential equations is a stationary point x₀ such that the eigenvalues of the linearized system have non-zero real part.

See also

• Anticlastic
• Elliptic point
• Gaussian curvature
• Hyperbolic fixed point
• Parabolic point
• Planar point
• Synclastic

External links

• Hyperbolic Point at Wolfram MathWorld