On inverse problem of determination the right-hand side term in higher order degenerate parabolic equation with integral observation in time

“…However, in anomalous cases where the surface diffsivity may vanish (e.g. at the initial time t = 0), the PDE in (2.3) becomes degenerate and the techniques of [19,20] may be applied. The solution (B(t), u(x, t)) of the inverse problem (2.3) and (2.4) is sought in the class M × (C 4,1 (Ω T ) ∩ C 3,0 (Ω T )).…”

“…x u(x, t) = g(x, t)p + r(x, t), (x, t) ∈ (0, L) × (0, T ), (1.1) were considered in [19] and [20] to determine the unknown right-hand side term p(t) or p(x), respectively from an integral observation. The well-posedness of these inverse problems were established even in the degenerate case when the coefficient a(x, t) is allowed to vanish on a zero-measure set.…”

Determination of the time-dependent thermal grooving coefficient

“…However, in anomalous cases where the surface diffsivity may vanish (e.g. at the initial time t = 0), the PDE in (2.3) becomes degenerate and the techniques of [19,20] may be applied. The solution (B(t), u(x, t)) of the inverse problem (2.3) and (2.4) is sought in the class M × (C 4,1 (Ω T ) ∩ C 3,0 (Ω T )).…”

“…x u(x, t) = g(x, t)p + r(x, t), (x, t) ∈ (0, L) × (0, T ), (1.1) were considered in [19] and [20] to determine the unknown right-hand side term p(t) or p(x), respectively from an integral observation. The well-posedness of these inverse problems were established even in the degenerate case when the coefficient a(x, t) is allowed to vanish on a zero-measure set.…”

Determination of the time-dependent thermal grooving coefficient

“…The space-dependent diffusion coefficient σ(x) in (1.1) was identified in [27] from the same additional observation of [4], and the Lipschitz stability was obtained locally using the Bukhgeım-Klibanov method and Carleman estimates. Inverse source/load linear problems for recovering the free term f are not discussed herein, but we mention [13,14] for the Euler-Bernoulli equation and [21,22] for the more general 2m-order (m ∈ N * ) parabolic equation u t + (−1) m a(t)∂ 2m…”

Determination of the time-dependent effective ion collision frequency from an integral observation

Determination of the Space-Dependent Source Term in a Fourth-Order Parabolic Problem