FPM 1998, vol. 4, no. 2, pp. 691-708

FUNDAMENTALNAYA I PRIKLADNAYA MATEMATIKA

(FUNDAMENTAL AND APPLIED MATHEMATICS)

1998, VOLUME 4, NUMBER 2, PAGES 691-708

On the solvability of linear inverse problem with final overdetermination in a Banach space of $L$ ¹-type

I. V. Tikhonov

Abstract

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Given $T > 0$ we consider the inverse problem in a Banach space $E$

du(t)/dt = Au(t) + Φ(t) f,  0 ≤ t ≤ T,

u(0) = u₀, u(T) = u₁, u₀, u₁ ∈ D(A)

where the element $f ∈
E$ is unknown. Our main result may be written as follows: Let $E=L$ ¹(X, μ ) and let $A$ be the infinitesimal generator of a $C$ ₀ semigroup $U(t)$ on $L$ ¹ (X, μ) satisfying $||U(t)|| < 1$ for $t > 0$ . Let $Φ (t)$ be defined by

(Φ(t)) (x) = φ (x,t) f(x)

where $φ ∈
C$ ¹([0,T];L^∞(X, μ )). Suppose that $φ (x,t) ≥
0$ , $∂
φ (x,t)/ ∂ t ≥ 0$ and $μ$ - $inf φ (x,T) > 0$ . Then for each pair $u$ ₀,u₁ ∈ D(A) the inverse problem has a unique solution $f ∈ L$ ¹(X, μ ), i. e., there exists a unique $f ∈ L$ ¹(X, μ ) such that the corresponding function

u(t)=U(t)u

₀+ ∫ ₀^tU(t-s) Φ (s)f ds, 0 ≤ t ≤ T,

satisfies the final condition $u(T)=u$ ₁. Moreover, $||f|| ≤
C(||Au$ ₀||+||Au₁||) with the constant $C >
0$ computing in the explicit form. To illustrate the results we present three examples: the linear inhomogeneous system of ODE, the heat equation in $$ \mathbb{R}^n $$ , and the one-dimensional "transport equation".

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On the solvability of linear inverse problem with final overdetermination in a Banach space of L1-type

On the solvability of linear inverse problem with final overdetermination in a Banach space of $L$ ¹-type