Yosida Distance and Existence of Invariant Manifolds in the Infinite-Dimensional Dynamical Systems
We introduce a new concept of Yosida distance between two (unbounded) linear operators $A$ and $B$ in a Banach space $\mathbb{X}$ defined as $d_Y(A,B):=\limsup_{\mu\to +\infty} \| A_\mu-B_\mu\|$, where $A_\mu$ and $B_\mu$ are the Yosida approximations of $A$ and $B$, respectively, and then study the...
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| Main Authors | , |
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| Format | Journal Article |
| Language | English |
| Published |
27.01.2023
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| Subjects | |
| Online Access | Get full text |
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| Summary: | We introduce a new concept of Yosida distance between two (unbounded) linear
operators $A$ and $B$ in a Banach space $\mathbb{X}$ defined as
$d_Y(A,B):=\limsup_{\mu\to +\infty} \| A_\mu-B_\mu\|$, where $A_\mu$ and
$B_\mu$ are the Yosida approximations of $A$ and $B$, respectively, and then
study the persistence of evolution equations under small Yosida perturbation.
This new concept of distance is also used to define the continuity of the
proto-derivative of the operator $F$ in the equation $u'(t)=Fu(t)$, where $F
\colon D(F)\subset \mathbb{X} \rightarrow \mathbb{X}$ is a nonlinear operator.
We show that the above-mentioned equation has local stable and unstable
invariant manifolds near an exponentially dichotomous equilibrium if the
proto-derivative of $F$ is continuous. The Yosida distance approach to
perturbation theory allows us to free the requirement on the domains of the
perturbation operators. Finally, the obtained results seem to be new. |
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| DOI: | 10.48550/arxiv.2301.12080 |