Nemytskii operator: Difference between revisions

In mathematics, Nemytskii operators are a class of nonlinear operators on L^p spaces with good continuity and boundedness properties. They take their name from the mathematician Viktor Vladimirovich Nemytskii.

Let $𝕏,𝕐,\mathbb{Z}\ne \varnothing$ be non-empty sets, then ${𝕐}^{𝕏},{\mathbb{Z}}^{𝕏}$ — sets of mappings from $𝕏$ with values in $𝕐$ and $\mathbb{Z}$ respectively. The Nemytskii superposition operator $H:{𝕐}^{𝕏}\to {\mathbb{Z}}^{𝕏}$ is the mapping induced by the function $h:𝕏\times 𝕐\to \mathbb{Z}$, and such that for any function $\phi \in {𝕐}^{𝕏}$ its image is given by the rule $${\displaystyle (H\phi )(x)=h(x,\phi (x))\in \mathbb{Z},\text{for all}x\in 𝕏.}$$ The function $h$ is called the generator of the Nemytskii operator $H$.

Let Ω be a domain (an open and connected set) in n-dimensional Euclidean space. A function f : Ω × R^m → R is said to satisfy the Carathéodory conditions if

• f(x, u) is a continuous function of u for almost all x ∈ Ω;
• f(x, u) is a measurable function of x for all u ∈ R^m.

Given a function f satisfying the Carathéodory conditions and a function u : Ω → R^m, define a new function F(u) : Ω → R by

${\displaystyle F(u)(x)=f(x,u(x)).}$

The function F is called a Nemytskii operator.

Suppose that $h:[a,b]\times ℝ\to ℝ$, $X=\text{Lip}[a,b]$ and

$${\displaystyle H:\text{Lip}[a,b]\to \text{Lip}[a,b]}$$

where operator $H$ is defined as $\left(Hf\right)\left(x\right)$ $=h(x,f(x))$ for any function $f:[a,b]\to ℝ$ and any $x\in [a,b]$. Under these conditions the operator $H$ is Lipschitz continuous if and only if there exist functions $G,H\in \text{Lip}[a,b]$ such that

$${\displaystyle h(x,y)=G(x)y+H(x),x\in [a,b],y\in ℝ.}$$

Let Ω be a domain, let 1 < p < +∞ and let g ∈ L^q(Ω; R), with

${\displaystyle \frac{1}{p}+\frac{1}{q}=1.}$

Suppose that f satisfies the Carathéodory conditions and that, for some constant C and all x and u,

${\displaystyle |f(x,u)|\le C|u{|}^{p-1}+g(x).}$

Then the Nemytskii operator F as defined above is a bounded and continuous map from L^p(Ω; R^m) into L^q(Ω; R).

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