Besov space

Template:Short description In mathematics, the Besov space (named after Oleg Vladimirovich Besov) ${\displaystyle B_{p,q}^s(𝐑)}$ is a complete quasinormed space which is a Banach space when Template:Math. These spaces, as well as the similarly defined Triebel–Lizorkin spaces, serve to generalize more elementary function spaces such as Sobolev spaces and are effective at measuring regularity properties of functions.

Several equivalent definitions exist. One of them is given below. This definition is quite limited because it does not extend to the range Template:Math.

Let

${\displaystyle {\mathrm{\Delta }}_{h}f(x)=f(x-h)-f(x)}$

and define the modulus of continuity by

${\displaystyle {\omega }_p^2(f,t)=\underset{|h|\le t}{\sup }{\Vert {\mathrm{\Delta }}_h^{2}f\Vert }_p}$

Let Template:Mvar be a non-negative integer and define: Template:Math with Template:Math. The Besov space ${\displaystyle B_{p,q}^s(𝐑)}$ contains all functions Template:Mvar such that

${\displaystyle f\in W^{n,p}(𝐑),{\displaystyle \underset{0}{\overset{\mathrm{\infty }}{\int }}}{\left|\frac{{\omega }_p^2(f^{(n)},t)}{t^{\alpha }}\right|}^q\frac{dt}{t}<\mathrm{\infty }.}$

The Besov space ${\displaystyle B_{p,q}^s(𝐑)}$ is equipped with the norm

${\displaystyle {\Vert f\Vert }_{B_{p,q}^s(𝐑)}={(\Vert f{\Vert }_{W^{n,p}(𝐑)}^q+{\displaystyle \underset{0}{\overset{\mathrm{\infty }}{\int }}}{\left|\frac{{\omega }_p^2(f^{(n)},t)}{t^{\alpha }}\right|}^q\frac{dt}{t})}^{\frac{1}{q}}}$

The Besov spaces ${\displaystyle B_{2,2}^s(𝐑)}$ coincide with the more classical Sobolev spaces ${\displaystyle H^s(𝐑)}$.

If ${\displaystyle p=q}$ and ${\displaystyle s}$ is not an integer, then ${\displaystyle B_{p,p}^s(𝐑)={\overline{W}}^{s,p}(𝐑)}$, where ${\displaystyle {\overline{W}}^{s,p}(𝐑)}$ denotes the Sobolev–Slobodeckij space.

• Template:Cite book
• Template:Cite journal
• DeVore, R. and Lorentz, G. "Constructive Approximation", 1993.
• DeVore, R., Kyriazis, G. and Wang, P. "Multiscale characterizations of Besov spaces on bounded domains", Journal of Approximation Theory 93, 273-292 (1998).
• Leoni, Giovanni (2017). A First Course in Sobolev Spaces: Second Edition. Graduate Studies in Mathematics. 181. American Mathematical Society. pp. 734. Template:ISBN

Template:Functional analysis

Template:Mathanalysis-stub