Delayed boundary control of a heat equation under discrete-time point measurements

Abstract: This is a repository copy of Delayed boundary control of a heat equation under discrete-time point measurements.

“…we have α 1 + α 2 + α 3 ≤ 1. Clearly, Lemma 5 remains true for α 1 + α 2 + α 3 ≤ 1 implying (11). Each rectangle cornered at x i ∈ supp c i and lying in Ω i (see Fig.…”

“…For 1D heat equations, point observers/controllers have been constructed and analyzed under continuous [5], [6], [7], [8], [9], [10] and sampled in time [7], [11] measurements. N -D diffusion equations with averaged measurements (i.e., the state values are averaged over subdomains covering the entire space domain) have been studied in [12], [13], [14].…”

Sampled-data H∞ filtering of a 2D heat equation under pointlike measurements

“…we have α 1 + α 2 + α 3 ≤ 1. Clearly, Lemma 5 remains true for α 1 + α 2 + α 3 ≤ 1 implying (11). Each rectangle cornered at x i ∈ supp c i and lying in Ω i (see Fig.…”

“…For 1D heat equations, point observers/controllers have been constructed and analyzed under continuous [5], [6], [7], [8], [9], [10] and sampled in time [7], [11] measurements. N -D diffusion equations with averaged measurements (i.e., the state values are averaged over subdomains covering the entire space domain) have been studied in [12], [13], [14].…”

Sampled-data H∞ filtering of a 2D heat equation under pointlike measurements

“…We show that both the boundary control and the point control with large enough number of actuations guarantee the exponential stability of the closed-loop system with an arbitrary decay rate smaller than that of the observer's estimation error. Preliminary results on the boundary control have been published in [43].…”

Delayed point control of a reaction–diffusion PDE under discrete-time point measurements

Backstepping and Sequential Predictors for Control Systems