Khapalov, Alexander Y. Global non-negative controllability of the semilinear parabolic equation governed by bilinear control. (English) Zbl 1024.93026 ESAIM, Control Optim. Calc. Var. 7, 269-283 (2002). Summary: We study the global approximate controllability of the one-dimensional semilinear convection-diffusion-reaction equation governed in a bounded domain via the coefficient (bilinear control) in the additive reaction term. Clearly, even in the linear case, due to the maximum principle, such a system is not globally or locally controllable in any reasonable linear space. It is also well known that for the superlinear terms admitting a power growth at infinity the global approximate controllability by traditional additive controls of localized support is out of question. However, we will show that a system like that can be steered in \(L^{2}(0,1)\) from any non-negative nonzero initial state into any neighborhood of any desirable non-negative target state by at most three static (\(x\)-dependent only) above-mentioned bilinear controls, applied subsequently in time, while only one such control is needed in the linear case. Reviewer: S.K.Ntouyas (Ioannina) Cited in 18 Documents MSC: 93C20 Control/observation systems governed by partial differential equations 93B03 Attainable sets, reachability Keywords:semilinear parabolic equation; global approximate controllability; bilinear system; reachability × Cite Format Result Cite Review PDF Full Text: DOI Numdam EuDML References: [1] S. Anita and V. Barbu , Null controllability of nonlinear convective heat equations . ESAIM: COCV 5 ( 2000 ) 157 - 173 . Numdam | MR 1744610 | Zbl 0938.93008 · Zbl 0938.93008 · doi:10.1051/cocv:2000105 [2] A. Baciotti , Local Stabilizability of Nonlinear Control Systems . 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