In the mathematical area of bifurcation theory a saddle-node bifurcation, tangential bifurcation or fold bifurcation is a local bifurcation in which two fixed points of a dynamical system collide and annihilate each other. The term 'saddle-node bifurcation' is most often used in reference to continuousdynamical systems. In discrete dynamical systems, the same bifurcation is often instead called a fold bifurcation. Another name is blue sky bifurcation in reference to the sudden creation of two fixed points. If the phase space is one-dimensional, one of the equilibrium points is unstable, while the other is stable. Saddle-node bifurcations may be associated with hysteresis loops and catastrophes.
Normal form
A typical example of a differential equation with a saddle-node bifurcation is: Here is the state variable and is the bifurcation parameter.
If there are two equilibrium points, a stable equilibrium point at and an unstable one at.
In fact, this is a normal form of a saddle-node bifurcation. A scalar differential equation which has a fixed point at for with is locally topologically equivalent to, provided it satisfies and. The first condition is the nondegeneracy condition and the second condition is the transversality condition.
An example of a saddle-node bifurcation in two dimensions occurs in the two-dimensional dynamical system: As can be seen by the animation obtained by plotting phase portraits by varying the parameter,
When is negative, there are no equilibrium points.
When, there is a saddle-node point.
When is positive, there are two equilibrium points: that is, one saddle point and one node.
A saddle-node bifurcation also occurs in the consumer equation if the consumption term is changed from to, that is, the consumption rate is constant and not in proportion to resource. Other examples are in modelling biological switches. Recently, it was shown that under certain conditions, the Einstein field equations of General Relativity have the same form as a fold bifurcation. A non-autonomous version of the saddle-node bifurcation has also been studied.