Leray–Schauder degree

In mathematics, the Leray–Schauder degree is an extension of the degree of a base point preserving continuous map between spheres ${\displaystyle (S^n,*)\to (S^n,*)}$ or equivalently to a boundary sphere preserving continuous maps between balls ${\displaystyle (B^n,S^{n-1})\to (B^n,S^{n-1})}$ to boundary sphere preserving maps between balls in a Banach space ${\displaystyle f:(B(V),S(V))\to (B(V),S(V))}$, assuming that the map is of the form ${\displaystyle f=id-C}$ where ${\displaystyle id}$ is the identity map and ${\displaystyle C}$ 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]

0.00 (0 votes) Original source: https://en.wikipedia.org/wiki/Leray–Schauder degree. Read more