L^infty-Space
The space called L^infty (ell-infinity) generalizes the L-p-spaces to p=infty. No integration is used to define them, and instead, the norm on L^infty is given by the essential supremum.
More precisely,
| |f|_infty= ess sup |f| |
is the norm which makes L^infty a Banach space. It is the space of all essentially bounded functions. The space of bounded continuous functions is not dense in L^infty.
See also
Banach Space, Completion, Dense, Essential Supremum, L-p-Space, L2-Space, Measure, Measurable Function, Measure SpaceThis entry contributed by Todd Rowland
Explore with Wolfram|Alpha
WolframAlpha
Cite this as:
Rowland, Todd. "L^infty-Space." From MathWorld--A Wolfram Resource, created by Eric W. Weisstein. https://mathworld.wolfram.com/L-Infinity-Space.html