Saddle point

A point on a smooth surface such that the surface near the point lies on different sides of the tangent plane. If a point on a twice continuously-differentiable surface is a saddle point, then the Gaussian curvature of the surface at the point is non-positive. A saddle point is a generalization of a hyperbolic point.

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A surface all of whose points are saddle points is a saddle surface.

A saddle point of a differentiable function is a point of the differentiable manifold which is critical, i.e. , non-degenerate, i.e. the Hessian matrix is non-singular, and such that is not a local maximum or a local minimum, i.e. the Hessian matrix is indefinite. Thus, a non-degenerate critical point of is a saddle point if its index (the number of negative eigenvalues of the Hessian matrix at that point) is . (The index does not depend on the local coordinates chosen.) The graph of a real-valued function of two variables near a saddle point looks like a saddle. See also Saddle point in game theory.

A saddle of a differential equation on is also often called a saddle point of that differential equation. More generally, given a dynamical system on (or on a differentiable manifold) one considers the eigenvalues of at an equilibrium point . If both positive and negative real parts occur, is called a saddle, a saddle point or, sometimes, a Poincaré saddle point.

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