Leray–Schauder degree

In mathematics, the Leray–Schauder degree is an extension of the degree of a base point preserving continuous map between spheres $(S^{n}, *) \to (S^{n}, *)$ or equivalently to boundary-sphere-preserving continuous maps between balls $(B^{n}, S^{n - 1}) \to (B^{n}, S^{n - 1})$ to boundary-sphere-preserving maps between balls in a Banach space $f : (B (V), S (V)) \to (B (V), S (V))$ , assuming that the map is of the form $f = i d - C$ where $i d$ is the identity map and $C$ is some compact map (i.e. mapping bounded sets to sets whose closure is compact).^[1]

The degree was invented by Jean Leray and Juliusz Schauder to prove existence results for partial differential equations.^[2]^[3]

References

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↑ Template:Cite journal
↑ Template:Cite journal
↑ Mawhin, J. (2018). A tribute to Juliusz Schauder. Antiquitates Mathematicae, 12.

[1] Template:Cite journal

[2] Template:Cite journal

[3] Mawhin, J. (2018). A tribute to Juliusz Schauder. Antiquitates Mathematicae, 12.

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Leray–Schauder degree

References

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