Dirichlet conditions

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In mathematics, a Hausdorff space X is called a fixed-point space if every continuous function ${\displaystyle f:X\rightarrow X}$ has a fixed point.

For example, any closed interval [a,b] in ${\displaystyle \mathbb {R} }$ is a fixed point space, and it can be proved from the intermediate value property of real continuous function. The open interval (a, b), however, is not a fixed point space. To see it, consider the function ${\displaystyle f(x)=a+{\frac {1}{b-a}}\cdot (x-a)^{2}}$, for example.

Any linearly ordered space that is connected and has a top and a bottom element is a fixed point space.

Note that, in the definition, we could easily have disposed of the condition that the space is Hausdorff.

References

• Vasile I. Istratescu, Fixed Point Theory, An Introduction, D. Reidel, the Netherlands (1981). ISBN 90-277-1224-7
• Andrzej Granas and James Dugundji, Fixed Point Theory (2003) Springer-Verlag, New York, ISBN 0-387-00173-5
• William A. Kirk and Brailey Sims, Handbook of Metric Fixed Point Theory (2001), Kluwer Academic, London ISBN 0-7923-7073-2

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