| Issue |
ESAIM: COCV
Volume 29, 2023
|
|
|---|---|---|
| Article Number | 80 | |
| Number of page(s) | 35 | |
| DOI | https://doi.org/10.1051/cocv/2023063 | |
| Published online | 08 November 2023 | |
Control problem for quadratic parabolic differential equations with sparse sensor sets of finite volume or anisotropically decaying density
1
Dortmund, Germany
2
Technische Universität Dortmund, Germany
* Corresponding author: iveselic@math.tu-dortmund.de
Received:
28
October
2022
Accepted:
22
August
2023
We prove observability and null-controllability for quadratic parabolic differential equations. The sensor set is allowed to be sparse and have finite volume if the generator has trivial singular space S. In the case of generators with singular space S ≠ {0} the sensor set is permitted to decay in directions determined by S. The proof is based on dissipation estimates for the quadratic differential operator with respect to spectral projections of partial harmonic oscillators and corresponding uncertainty relations.
Mathematics Subject Classification: 35B99 / 35Q70 / 35Pxx / 93Bxx
Key words: Spectral inequalities / uncertainty relation / dissipation estimates / quadratic parabolic differential equation / partial harmonic oscillator / observability / null-controllability
© The authors. Published by EDP Sciences, SMAI 2023
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