Regularized Solution of the Cauchy Problem in an Unbounded Domain

Juraev, Davron Aslonqulovich; Shokri, Ali; Marian, Daniela

doi:10.3390/sym14081682

Open AccessArticle

Regularized Solution of the Cauchy Problem in an Unbounded Domain

by

Davron Aslonqulovich Juraev

^1,2

,

Ali Shokri

³

and

Daniela Marian

^4,*

¹

Department of Natural Science Disciplines, Higher Military Aviation School of the Republic of Uzbekistan, Karshi 180100, Uzbekistan

²

Department of Mathematics, Anand International College of Engineering, Jaipur 303012, India

³

Department of Mathematics, Faculty of Basic Sciences, University of Maragheh, Maragheh 83111-55181, Iran

⁴

Department of Mathematics, Technical University of Cluj-Napoca, 28 Memorandumului Street, 400114 Cluj-Napoca, Romania

^*

Author to whom correspondence should be addressed.

Symmetry 2022, 14(8), 1682; https://doi.org/10.3390/sym14081682

Submission received: 15 July 2022 / Revised: 8 August 2022 / Accepted: 10 August 2022 / Published: 12 August 2022

(This article belongs to the Special Issue Symmetry and Approximation Methods II)

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Abstract

:

In this paper, using the construction of the Carleman matrix, we explicitly find a regularized solution of the Cauchy problem for matrix factorizations of the Helmholtz equation in a three-dimensional unbounded domain.

Keywords:

Carleman matrix; regularized solution; matrix factorizations; Helmholtz equation

MSC:

35J46; 35J56

1. Introduction

A fundamental problem in the theory of differential equations (ordinary and partial) is the determination of a solution that verifies certain initial conditions.

Regarding Cauchy problems, certain questions arise: Does a solution exist (even locally only)? Is this unique? In this case, the solution continuously depends on the initial data, that is, is the problem well posed? The concept of a well-posed problem is connected with investigations by the famous French mathematician Hadamard [1]. The problems that are not well-posed are called ill-posed problems. The theory of ill-posed problems has been the subject of research by many mathematicians in the last years, with applicability in various fields: theoretical physics, optimization of control, astronomy, management and planning, automatic systems, etc., all of which have been influenced by the rapid development of computing technology.

Tikhonov [2] answered certain questions that are posed in the class of ill-posed problems, such as: what does an approximate solution mean, and what algorithm can be used to find such an approximate solution? This involves including additional assumptions. This process is known as regularization. Tikhonov regularization is one of the most commonly used for the regularization of linear ill-posed problems. Lavrent’ev [3,4] also established a regularization method. Based on this method, Yarmukhamedov [5,6] constructed the Carleman functions for the Laplace and Helmholtz, when the data is unknown on a conical surface or a hyper surface. Carleman-type formulas allow a solution to an elliptic equation to be found when the Cauchy data are known only on a part of the boundary of the domain. Carleman [7] obtained a formula for a solution to Cauchy–Riemann equations, on domains of certain forms. Based on [7], Goluzin and Krylov [8] gave a formula for establishing the values of analytic functions on arbitrary domains. The multidimensional case was treated in [9]. The Cauchy problem for elliptic equations was considered by Tarkhanov [10,11]. In [12], the Cauchy problem for the Helmholtz equation in an arbitrary bounded plane domain was considered. Certain boundary value problems and the determination of numerical solutions was investigated in [13,14,15,16,17,18,19,20,21,22,23,24,25]. In [21] is studied the Cauchy problem of a modified Helmholtz equation. An efficient D-N alternating algorithm for solving an inverse problem for Helmholtz equation was investigated in [18]. The Cauchy problem for elliptic equations, was studied in [2,3,4,5,6,7,8,9,10,11] and then it was investigated in [12,26,27,28,29,30,31,32,33,34,35,36,37].

In this article, based on previous works [30,31,32,37], we find an explicit formula for an approximate solution of the Cauchy problem for matrix factorizations of the Helmholtz equation in a three-dimensional unbounded domain of

R^{3}

. The approximate solution formula requires construction of a family of fundamental solutions of the Helmholtz operator in space. This family is parametrized by some entire function

K (z)

. Relying on the works [30,31,32,33,34,35,36,37], we obtain better results, due to a special selection of the function

K (z)

. This helped us to obtain good results when finding an approximate solution based on the Carleman matrix.

Let

ζ = (ζ_{1}, ζ_{2}, ζ_{3}) \in R^{3}, η = (η_{1}, η_{2}, η_{3}) \in R^{3},

ζ^{'} = (ζ_{1}, ζ_{2}) \in R^{2}, η^{'} = (η_{1}, η_{2}) \in R^{2},

and

Ω \subset R^{3}

an unbounded, simply connected domain, having the boundary

\partial Ω

piecewise smooth, such that

\partial Ω = Σ ⋃ D

, where D is the plane

η_{3} = 0

and

Σ

is a smooth surface lying in the half-space

η_{3} > 0

.

The following notations are used in the paper:

r = |η - ζ|, α = |η^{'} - ζ^{'}|, z = i \sqrt{a^{2} + α^{2}} + η_{3}, a \geq 0,

\partial_{ζ} = {(\partial_{ζ_{1}}, \partial_{ζ_{2}}, \partial_{ζ_{3}})}^{T}, \partial_{ζ} \to χ^{T}, χ^{T} = (\begin{matrix} χ_{1} \\ χ_{2} \\ χ_{3} \end{matrix})

transposed vector

χ

,

W (ζ) = {(W_{1} (ζ), \dots, W_{n} (ζ))}^{T}, v^{0} = (1, \dots, 1) \in R^{n}, n = 2^{m}, m = 3,

E (w) = ∥\begin{matrix} w_{1} & 0 & \dots & 0 \\ 0 & w_{2} & \dots & 0 \\ \dots & \dots & ⋱ & \dots \\ 0 & 0 & 0 & w_{n} \end{matrix}∥ - diagonal matrix, w = (w_{1}, \dots, w_{n}) \in R^{n} .

P (χ^{T})

is an

n \times n

matrix, having the elements linear functions with constant coefficients from

C

, such that

P^{*} (χ^{T}) P (χ^{T}) = E (({|χ|}^{2} + λ^{2}) v^{0}),

where

P^{*} (χ^{T})

is the Hermitian conjugate matrix of

P (χ^{T})

and

λ \in R

.

Next, we consider the system

P (\partial_{ζ}) W (ζ) = 0, η \in Ω,

(1)

where

P (\partial_{ζ})

is the matrix differential operator of order one.

Additionally, consider the set

S (Ω) = \{W : \bar{Ω} ⟶ R^{n}\},

where W is continuous on

\bar{Ω} = Ω \cup \partial Ω

and W satisfies (1).

2. Statement of the Cauchy Problem

We formulate now the following Cauchy problem for the system (1):

Let

f : Σ ⟶ R^{n}

be a continuous given function on

Σ

.

Suppose

W (η) \in S (Ω)

and

{W (η)|}_{Σ} = f (η), η \in Σ .

(2)

Our purpose is to determine the function

W (η)

in the domain

Ω

when its values are known on

Σ

.

If

W (η) \in S (Ω)

, then

W (ζ) = \int_{\partial Ω} L (η, ζ; λ) W (η) d s_{η}, ζ \in Ω,

(3)

where

L (η, ζ; λ) = (E (Γ_{3} (λ r) v^{0}) P^{*} (\partial_{ζ})) P (t^{T}),

t = (t_{1}, t_{2}, t_{3})

is the unit exterior normal at a point

η

on the surface

\partial Ω

and

Γ_{3} (λ r)

denotes the fundamental solution of the Helmholtz equation in

R^{3}

(see, [38]), that is

\begin{matrix} Γ_{3} (λ r) = - \frac{e^{i λ r}}{4 π r} . \end{matrix}

(4)

Let

K (z)

be an entire function taking real values for real z (

z = a + i b, a, b \in R

), satisfying

\begin{matrix} K (a) \neq 0, sup_{b \geq 1} |b^{p} K^{(p)} (z)| = B (a, p) < \infty, \\ - \infty < a < \infty, p = \bar{0, 3} . \end{matrix}

(5)

Define

\begin{matrix} Ψ (η, ζ; λ) = - \frac{1}{2 π^{2} K (ζ_{3})} \int_{0}^{\infty} Im [\frac{K (z)}{z - ζ_{3}}] \frac{cos (λ a)}{\sqrt{a^{2} + α^{2}}} d a, for η \neq ζ . \end{matrix}

(6)

Consider

Ψ (η, ζ; λ)

in (3) instead

Γ_{3} (λ r)

, where

Ψ (η, ζ; λ) = Γ_{3} (λ r) + G (η, ζ; λ),

(7)

G (η, ζ; λ)

being the regular solution of Helmholtz’s equation with respect to

η

, including the case

η = ζ

.

We obtain

W (ζ) = \int_{\partial Ω} L (η, ζ; λ) W (η) d s_{η}, ζ \in Ω,

(8)

where

L (η, ζ; λ) = (E (Ψ (η, ζ; λ) v^{0}) P^{*} (\partial_{ζ})) P (t^{T}) .

We generalize (8) for the case when the domain

Ω

is unbounded.

Hence, in what follows, we consider the domain

Ω \subset R^{3}

be unbounded.

Suppose that

Ω

is situated inside the layer of smallest width defined by the inequality

0 < η_{3} < h, h = \frac{π}{ρ}, ρ > 0,

and

\partial Ω

extends to infinity.

Let

Ω_{R} = \{η : η \in Ω, |η| < R\}, Ω_{R}^{\infty} = Ω ∖ Ω_{R}, R > 0 .

Theorem 1.

Let

W (η) \in S (Ω)

. If for each fixed

ζ \in Ω

we have the equality

lim_{R \to \infty} \int_{Ω_{R}^{\infty}} L (η, ζ; λ) W (η) d s_{η} = 0,

(9)

then (8) is satisfied.

Proof.

Fix

ζ \in Ω, |ζ| < R

. Using (8) we obtain

\begin{matrix} \int_{\partial Ω} L (η, ζ; λ) W (η) d s_{η} = \int_{\partial Ω_{R}} L (η, ζ; λ) W (η) d s_{y} \\ + \int_{\partial Ω_{R}^{\infty}} L (η, ζ; λ) W (η) d s_{η} = W (ζ) + \int_{\partial Ω_{R}^{\infty}} L (η, ζ; λ) W (η) d s_{η}, ζ \in Ω_{R} . \end{matrix}

Using (9), we obtain (8).

Also assume that the length

\partial Ω

satisfies the following growth condition

\int_{\partial Ω} exp [- d_{0} ρ_{0} |η^{'}|] d s_{η} < \infty, 0 < ρ_{0} < ρ,

(10)

for some

d_{0} > 0 .

Suppose

W (η) \in S (Ω)

satisfies

|W (η)| \leq exp [exp ρ_{2} |η^{'}|], ρ_{2} < ρ, η \in Ω .

(11)

We consider in (6):

\begin{matrix} K (z) = exp [- d i ρ_{1} (z - \frac{h}{2}) - d_{1} i ρ_{0} (z - \frac{h}{2})], \\ K (ζ_{3}) = exp [d cos ρ_{1} (ζ_{3} - \frac{h}{2}) + d_{1} cos i ρ_{0} (ζ_{3} - \frac{h}{2})], \\ 0 < ρ_{1} < ρ, 0 < ζ_{3} < h, \end{matrix}

(12)

where

d = 2 c exp (ρ_{1} |ζ^{'}|), d_{1} > \frac{d_{0}}{cos (ρ_{0} \frac{h}{2})}, c \geq 0, d > 0 .

Then (8) is valid.

Let

ζ \in Ω

be fixed and

η \to \infty

. We estimate

Ψ (η, ζ; λ)

,

\frac{\partial Ψ (η, ζ; λ)}{\partial η_{j}}

,

j = \bar{1, 2}

and

\frac{\partial Ψ (η, ζ; λ)}{\partial η_{3}}

. To estimate

\frac{\partial Ψ (η, ζ; λ)}{\partial η_{j}}

, we use the equality

\frac{\partial Ψ (η, ζ; λ)}{\partial η_{j}} = \frac{\partial Ψ (η, ζ; λ)}{\partial s} \frac{\partial s}{\partial η_{j}} = 2 (η_{j} - ζ_{j}) \frac{\partial Ψ (η, ζ; λ)}{\partial s}, j = \bar{1, 2} .

(13)

Really,

\begin{matrix} |exp [- d i ρ_{1} (z - \frac{h}{2}) - d_{1} i ρ_{0} (z - \frac{h}{2})]| \\ = exp Re [- d i ρ_{1} (z - \frac{h}{2}) - d_{1} i ρ_{0} (z - \frac{h}{2})] \\ = exp [- d ρ_{1} \sqrt{a^{2} + α^{2}} cos ρ_{1} (η_{3} - \frac{h}{2}) - d_{1} ρ_{0} \sqrt{a^{2} + α^{2}} cos ρ_{0} (η_{3} - \frac{h}{2})] . \end{matrix}

As

\begin{matrix} - \frac{π}{2} \leq - \frac{ρ_{1}}{ρ} \cdot \frac{π}{2} \leq \frac{ρ_{1}}{ρ} \cdot \frac{π}{2} < \frac{π}{2}, \\ - \frac{π}{2} \leq - \frac{ρ_{1}}{ρ} \cdot \frac{π}{2} \leq ρ_{0} (y_{3} - \frac{h}{2}) \leq \frac{ρ_{1}}{ρ} \cdot \frac{π}{2} < \frac{π}{2} . \end{matrix}

Consequently,

cos ρ (η_{3} - \frac{h}{2}) > 0, cos ρ_{0} (η_{3} - \frac{h}{2}) \geq cos \frac{h ρ_{0}}{2} > δ_{0} > 0 .

It does not vanish in the region

Ω

and

\begin{matrix} |Ψ (η, ζ; λ)| = O [exp (- ε ρ_{1} |η^{'}|)], ε > 0, η \to \infty, η \in Ω ⋃ \partial Ω, \\ |\frac{\partial Ψ (η, ζ; λ)}{\partial η_{j}}| = O [exp (- ε ρ_{1} |η^{'}|)], ε > 0, η \to \infty, η \in Ω ⋃ \partial Ω, j = \bar{1, 2} . \\ |\frac{\partial Ψ (η, ζ; λ)}{\partial η_{3}}| = O [exp (- ε ρ_{1} |η^{'}|)], ε > 0, η \to \infty, η \in Ω ⋃ \partial Ω . \end{matrix}

We now choose

ρ_{1}

with the condition

ρ_{2} < ρ_{1} < ρ

. Hence, (10) is satisfied and (8) is true. □

Condition (12) can be weakened.

Denote

S_{ρ} (Ω) = \{W (η) : W (η) \in S (Ω), |W (η)| \leq exp [O (exp ρ |η_{1}|)], η \to \infty, η \in Ω\} .

(14)

Theorem 2.

If

W (η) \in S_{ρ} (Ω)

satisfies

\begin{matrix} |W (η)| \leq C exp [c cos ρ_{1} (η_{3} - \frac{h}{2}) exp (ρ_{1} |η^{'}|)], \\ C constant, c \geq 0, 0 < ρ_{1} < ρ, η \in \partial Ω, \end{matrix}

(15)

then (8) is true.

Proof.

Divide

Ω

by a line

η_{3} = \frac{h}{2}

into the domains

Ω_{1} = \{η : 0 < η_{3} < \frac{h}{2}\}

and

Ω_{2} = \{η : \frac{h}{2} < η_{3} < h\}

.

Consider the domain

Ω_{1}

. We put

\begin{matrix} K_{1} (z) = K (z) exp [- δ i τ (z - \frac{h}{2}) - δ_{1} i ρ (z - \frac{h}{2})], \\ ρ < τ < 2 ρ, δ > 0, δ_{1} > 0, \end{matrix}

(16)

in (6),

K (z)

being defined in (12) and we obtain that (10) is valid.

Really,

\begin{matrix} |exp [- i τ (z - \frac{h}{4}) - δ_{1} i ρ (z - \frac{h}{4})]| \\ = exp [- δ τ \sqrt{a^{2} + α^{2}} cos τ (η_{3} - \frac{h}{4})] \\ = exp [- δ τ \sqrt{a^{2} + α^{2}}] \leq exp [- δ exp τ |η^{'}|], \end{matrix}

- \frac{π}{2} \leq - τ \frac{π}{4} \leq τ (η_{3} - \frac{h}{4}) \leq τ \frac{π}{2} < \frac{h}{2}

and

cos τ (η_{3} - \frac{h}{4}) \geq cos τ \frac{h}{4} \geq δ_{0} > 0

.

We denote the corresponding

Ψ (η, ζ; λ)

by

Ψ^{+} (η, ζ; λ)

.

Since

cos τ (η_{3} - \frac{h}{4}) \geq δ_{0}, η \in Ω_{1} ⋃ \partial Ω_{1},

then for fixed

ζ \in Ω_{1}, η \in Ω_{1} ⋃ \partial Ω_{1}

we have

\begin{matrix} |Ψ^{+} (η, ζ; λ)| = O [exp (- δ_{0} exp (τ |η^{'}|)], η \to \infty, ρ < τ < 2 ρ, \\ |\frac{\partial Ψ^{+} (η, ζ; λ)}{\partial η_{j}}| = O [exp (- δ_{0} exp (τ |η^{'}|)], η \to \infty, ρ < τ < 2 ρ, j = \bar{1, 2} . \\ |\frac{\partial Ψ^{+} (η, ζ; λ)}{\partial η_{3}}| = O [exp (- δ_{0} exp (τ |η^{'}|)], η \to \infty, ρ < τ < 2 ρ . \end{matrix}

Suppose

W (η) \in S_{ρ} (Ω_{1})

satisfies

|W (η)| \leq C exp [exp (2 ρ - ε) |η^{'}|], ε > 0, η \in Ω_{1} .

(17)

Consider

τ

in (16) satisfying

2 ρ - ε < τ < 2 ρ

.

We obtain that (16) is valid in

Ω_{1}

, and we have

W (ζ) = \int_{\partial Ω_{1}} L (η, ζ; λ) W (η) d s_{η}, ζ \in Ω_{1} .

(18)

where

L (η, ζ; λ) = (E (Ψ^{+} (η, ζ; λ) v^{0}) P^{*} (\partial_{ζ})) P (t^{T}) .

If

W (η) \in S_{ρ} (Ω_{2})

satisfies (15) in

Ω_{2}

, then for

2 ρ - ε < τ < 2 ρ

analog we have

W (ζ) = \int_{\partial Ω_{2}} L (η, ζ; λ) W (η) d s_{η}, ζ \in Ω_{2},

(19)

where

L (η, ζ; λ) = (E (Ψ^{-} (η, ζ; λ) v^{0}) P^{*} (\partial_{ζ})) P (t^{T}),

and

Ψ^{-} (η, ζ; λ)

it is given by (6), in which

K (z)

it is replaced by the function

K_{2} (z)

:

K_{2} (z) = K (z) exp [- δ i τ (z - h_{1}) - δ_{1} i ρ (z - \frac{h}{2})],

(20)

where

h_{1} = \frac{h}{2} + \frac{h}{4}, \frac{h}{2} < η_{3} < h, \frac{h}{2} < ζ_{3} < h_{1}, δ > 0, δ_{1} > 0 .

The integrals converge uniformly for

δ \geq 0

, and

W (η) \in S_{ρ} (Ω)

. We consider

δ = 0

and we find

W (ζ) = \int_{\partial Ω} L (η, ζ; λ) W (η) d s_{η}, ζ \in Ω, ζ_{3} \neq \frac{h}{2},

(21)

where

L (η, ζ; λ) = (E (\tilde{Ψ} (η, ζ; λ) v^{0}) P^{*} (\partial_{ζ})) P (t^{T}),

\tilde{Ψ} (η, ζ; λ) = {(Ψ^{+} (η, ζ; λ))}_{δ = 0} = {(Ψ^{-} (η, ζ; λ))}_{δ = 0} .

Here,

\tilde{Ψ} (η, ζ; λ)

is given by (6), and

K (z)

by (16), for

δ = 0

. According to the continuation principle, Formula (21) is valid for every

ζ \in Ω

. Using (18) and (21) holds for every

δ_{1} \geq 0

. Supposing

δ_{1} = 0

, Theorem 2 is proved. □

We choose

\begin{matrix} K (z) = \frac{1}{{(z - ζ_{3} + 2 h)}^{2}} exp (σ z^{2}), \\ K (ζ_{3}) = \frac{1}{{(2 h)}^{2}} exp (σ ζ_{3}^{2}), 0 < ζ_{3} < h, h = \frac{π}{ρ}, \end{matrix}

(22)

in (6) and we obtain

Ψ_{σ} (η, ζ; λ) = - \frac{e^{- σ ζ_{3}^{2}}}{π^{2} {(2 h)}^{- 1}} \int_{0}^{\infty} Im \frac{exp (σ z^{2})}{{(z - ζ_{3} + 2 h)}^{2} (z - ζ_{3})} \frac{cos (λ a)}{\sqrt{a^{2} + α^{2}}} d a .

(23)

The Formula (8) becomes:

W (ζ) = \int_{\partial Ω} L_{σ} (η, ζ; λ) W (η) d s_{η}, ζ \in Ω,

(24)

where

L_{σ} (η, ζ; λ) = (E (Ψ_{σ} (η, ζ; λ) v^{0}) P^{*} (\partial_{ζ})) P (t^{T}) .

3. Regularized Solution of the Problem

Theorem 3.

Let

W (η) \in S_{ρ} (Ω)

satisfying

|W (η)| \leq M, η \in D .

(25)

If

W_{σ} (ζ) = \int_{Σ} L_{σ} (η, ζ; λ) W (η) d s_{η}, η \in Ω,

(26)

then

|W (ζ) - W_{σ} (ζ)| \leq K_{ρ} (λ, ζ) σ^{2} M e^{- σ ζ_{3}^{2}}, ζ \in Ω,

(27)

|\frac{\partial W (ζ)}{\partial ζ_{j}} - \frac{\partial W_{σ} (ζ)}{\partial ζ_{j}}| \leq K_{ρ} (λ, ζ) σ^{2} M e^{- σ ζ_{3}^{2}}, σ > 1, ζ \in Ω, j = \bar{1, 3},

(28)

where

K_{ρ} (λ, ζ)

are bounded on compact subsets of Ω.

Proof.

From (24) and (26), we obtain

\begin{matrix} W (ζ) = \int_{Σ} L_{σ} (η, ζ; λ) W (η) d s_{η} + \int_{D} L_{σ} (η, ζ; λ) W (η) d s_{η} \\ = W_{σ} (ζ) + \int_{D} L_{σ} (η, ζ; λ) W (η) d s_{η}, ζ \in Ω . \end{matrix}

Now using (25), we obtain

\begin{matrix} \begin{matrix} |W (ζ) - W_{σ} (ζ)| \leq |\int_{D} L_{σ} (η, ζ; λ) W (η) d s_{η}| \end{matrix} \\ \leq \int_{D} |L_{σ} (η, ζ; λ)| |W (η)| d s_{η} \leq M \int_{D} |L_{σ} (η, ζ; λ)| d s_{η}, ζ \in Ω . \end{matrix}

(29)

Next, we estimate the integrals

\int_{D} |Ψ_{σ} (η, ζ; λ)| d s_{η}

,

\int_{D} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial η_{j}}| d s_{η}

,

j = \bar{1, 2}

and

\int_{D} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial ζ_{3}}| d s_{η}

on the part D of the plane

η_{3} = 0

.

Separating the imaginary part of (23), we obtain

\begin{matrix} Ψ_{σ} (η, ζ; λ) = \frac{e^{σ (η_{3}^{2} - ζ_{3}^{2})}}{π^{2} {(2 h^{2})}^{- 1}} [\int_{0}^{\infty} (\frac{e^{- σ (u^{2} + α^{2})} (- α_{1}^{2} + β_{1}^{2} + 2 β_{1}) cos γ α_{1}}{{(α_{1}^{2} + β_{1}^{2})}^{2} (α_{1}^{2} + β^{2})} \\ - \frac{e^{- σ (u^{2} + α^{2})} (2 α_{1}^{2} β_{1} + α_{1}^{2} β - β_{1}^{2} β)}{{(α_{1}^{2} + β_{1}^{2})}^{2} (α_{1}^{2} + β^{2})} \frac{sin γ α_{1}}{α_{1}}) cos (λ a) d a], \end{matrix}

(30)

where

γ = 2 σ η_{3}, α_{1}^{2} = a^{2} + α^{2}, β = η_{3} - ζ_{3}, β_{1} = η_{3} - ζ_{3} + 2 h .

Given equality (30), we have

\int_{D} |Ψ_{σ} (η, ζ; λ)| d s_{η} \leq K_{ρ} (λ, ζ) σ^{2} e^{- σ ζ_{3}^{2}}, σ > 1, ζ \in Ω .

(31)

Now using the equality

\begin{matrix} \frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial η_{j}} = \frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial s} \frac{\partial s}{\partial η_{j}} = 2 (η_{j} - ζ_{j}) \frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial s}, \\ s = α^{2}, j = \bar{1, 2}, \end{matrix}

(32)

the equality (30) and (32), we have

\int_{D} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial η_{j}}| d s_{η} \leq K_{ρ} (λ, ζ) σ^{2} e^{- σ ζ_{3}^{2}}, σ > 1, ζ \in Ω, j = \bar{1, 2} .

(33)

Now, we estimate the integral

\int_{D} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial η_{3}}| d s_{η}

.

Taking into account equality (30), we obtain

\int_{D} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial η_{3}}| d s_{η} \leq K_{ρ} (λ, ζ) σ^{2} e^{- σ ζ_{3}^{2}}, σ > 1, ζ \in Ω,

(34)

From inequalities (29), (31), (33), and (34), we obtain (27).

Now we prove the inequality (28). Taking the derivatives from equalities (24) and (26) with respect to

ζ_{j}, j = \bar{1, 3},

we obtain:

\begin{matrix} \frac{\partial W (ζ)}{\partial ζ_{j}} = \int_{Σ} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η} + \int_{D} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η}, \\ \frac{\partial W_{σ} (ζ)}{\partial ζ_{j}} = \int_{Σ} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η}, ζ \in Ω, j = \bar{1, 3} \end{matrix}

(35)

From (25) and (35), we have

\begin{matrix} \begin{matrix} |\frac{\partial W (ζ)}{\partial ζ_{j}} - \frac{\partial_{σ} W (ζ)}{\partial ζ_{j}}| \leq |\int_{D} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η}| \end{matrix} \\ \leq \int_{D} |\frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}}| |W (η)| d s_{η} \leq M \int_{D} |\frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}}| d s_{η}, \\ ζ \in Ω, j = \bar{1, 3} . \end{matrix}

(36)

To prove (36), we estimate

\int_{D} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial ζ_{j}}| d s_{η}

,

j = \bar{1, 2},

and

\int_{D} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial ζ_{3}}| d s_{η}

, on the part D of the plane

η_{3} = 0

.

For the first integrals, we use:

\begin{matrix} \frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial ζ_{j}} = \frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial s} \frac{\partial s}{\partial ζ_{j}} = - 2 (η_{j} - ζ_{j}) \frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial s}, \\ s = α^{2}, j = \bar{1, 2} . \end{matrix}

(37)

Applying equality (30) and equality (37), we obtain

\int_{D} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial ζ_{j}}| d s_{η} \leq K_{ρ} (λ, ζ) σ^{2} e^{- σ ζ_{3}^{2}}, σ > 1, ζ \in Ω, j = \bar{1, 2} .

(38)

Now, we estimate the integral

\int_{D} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial ζ_{3}}| d s_{η}

.

Taking into account equality (30), we obtain

\int_{D} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial ζ_{3}}| d s_{η} \leq K_{ρ} (λ, ζ) σ^{2} e^{- σ ζ_{3}^{2}}, σ > 1, ζ \in Ω .

(39)

Using (36), (38) and (39), we obtain (27). □

Corollary 1.

For every

ζ \in Ω

,

lim_{σ \to \infty} W_{σ} (ζ) = W (ζ), lim_{σ \to \infty} \frac{\partial W_{σ} (ζ)}{\partial ζ_{j}} = \frac{\partial W (ζ)}{\partial ζ_{j}}, j = \bar{1, 3} .

We define

{\bar{Ω}}_{ε}

as

{\bar{Ω}}_{ε} = \{(ζ_{1}, ζ_{2}, ζ_{3}) \in Ω, q > ζ_{3} \geq ε, q = max_{D} ψ (ζ^{'}), 0 < ε < q\} .

Here,

ψ (ζ^{'}) -

is a surface. We remark that the set

{\bar{Ω}}_{ε} \subset Ω

is compact.

Corollary 2.

If

ζ \in {\bar{Ω}}_{ε}

, then the families of functions

\{W_{σ} (ζ)\}

and

\{\frac{\partial W_{σ} (ζ)}{\partial ζ_{j}}\}

converge uniformly for

σ \to \infty

, that is:

W_{σ} (ζ) ⇉ W (ζ), \frac{\partial W_{σ} (ζ)}{\partial ζ_{j}} ⇉ \frac{\partial W (ζ)}{\partial ζ_{j}}, j = \bar{1, 3} .

Remark that

E_{ε} = Ω ∖ {\bar{Ω}}_{ε}

is a boundary layer for this problem, as in the theory of singular perturbations, where there is no uniform convergence.

Suppose that the surface

Σ

is given by the equation

η_{m} = ψ (η^{'}), η^{'} \in R^{2},

where

ψ (η^{'})

satisfies the condition

|ψ^{'} (η^{'})| \leq C < \infty, C = c o n s t .

Consider

q = max_{D} ψ (η^{'}), l = max_{D} \sqrt{1 + ψ^{' 2} (η^{'})} .

Theorem 4.

If

W (η) \in S_{ρ} (Ω)

satisfies (25), and the inequality

|W (η)| \leq δ, 0 < δ < 1, η \in Σ, Σ a s m o o t h s u r f a c e,

(40)

then

|W (ζ)| \leq K_{ρ} (λ, ζ) σ^{2} M^{1 - \frac{ζ_{3}^{2}}{q^{2}}} δ^{\frac{ζ_{3}^{2}}{q^{2}}}, σ > 1, ζ \in Ω .

(41)

\begin{matrix} |\frac{\partial W (ζ)}{\partial ζ_{j}}| \leq K_{ρ} (λ, ζ) σ^{2} M^{1 - \frac{ζ_{3}^{2}}{q^{2}}} δ^{\frac{ζ_{3}^{2}}{q^{2}}}, σ > 1, ζ \in Ω, \\ j = \bar{1, 3} . \end{matrix}

(42)

Proof.

Using (24), we obtain

W (ζ) = \int_{Σ} L_{σ} (η, ζ; λ) W (η) d s_{η} + \int_{D} L_{σ} (η, ζ; λ)) W (η) d s_{η}, ζ \in Ω .

(43)

We estimate the following

|W (ζ)| \leq |\int_{Σ} L_{σ} (η, ζ; λ) W (η) d s_{η}| + |\int_{D} L_{σ} (η, ζ; λ) W (η) d s_{η}|, ζ \in Ω .

(44)

Given inequality (40), we estimate the first integral of inequality (44).

\begin{matrix} \begin{matrix} |\int_{Σ} L_{σ} (η, ζ; λ) W (η) d s_{η}| \leq \int_{Σ} |L_{σ} (η, ζ; λ)| |W (η)| d s_{η} \end{matrix} \\ \leq δ \int_{Σ} |L_{σ} (η, ζ; λ)| d s_{η}, ζ \in Ω . \end{matrix}

(45)

We estimate now the integrals

\int_{Σ} |Ψ_{σ} (η, ζ; λ)| d s_{η}, \int_{Σ} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial η_{j}}| d s_{η}, j = \bar{1, 2}

and

\int_{Σ} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial η_{3}}| d s_{η}

on

Σ

.

Using (30), we have

\int_{Σ} |Ψ_{σ} (η, ζ; λ)| d s_{η} \leq K_{ρ} (λ, ζ) σ^{2} e^{σ (q^{2} - ζ_{3}^{2})}, σ > 1, ζ \in Ω .

(46)

From (30) and (32), we have

\int_{Σ} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial y_{j}}| d s_{η} \leq K_{ρ} (λ, ζ) σ^{2} e^{σ (q^{2} - ζ_{3}^{2})}, σ > 1, ζ \in Ω, j = \bar{1, 2} .

(47)

Using (30), we obtain

\int_{Σ} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial η_{3}}| d s_{η} \leq K_{ρ} (λ, ζ) σ^{2} e^{σ (q^{2} - ζ_{3}^{2})}, σ > 1, ζ \in Ω .

(48)

From (46)–(48) and applying (45), we obtain

|\int_{Σ} L_{σ} (η, ζ; λ) W (η) d s_{η}| \leq K_{ρ} (λ, ζ) σ^{2} δ e^{σ (q^{2} - ζ_{3}^{2})}, σ > 1, ζ \in Ω .

(49)

The following is known

|\int_{D} L_{σ} (η, ζ; λ) W (η) d s_{η}| \leq K_{ρ} (λ, ζ) σ^{2} M e^{- σ ζ_{3}^{2}}, σ > 1, ζ \in Ω .

(50)

Now using (44), (49) and (50), we have

|W (ζ)| \leq \frac{K_{ρ} (λ, ζ) σ^{2}}{2} (δ e^{σ q^{2}} + M) e^{- σ ζ_{3}^{2}}, σ > 1, ζ \in Ω .

(51)

Choosing

σ = \frac{1}{q^{2}} ln \frac{M}{δ},

(52)

we obtain (41).

We compute now the partial derivative from Formula (24) with respect to

ζ_{j}, j = \bar{1, 3}

:

\begin{matrix} \frac{\partial W (ζ)}{\partial ζ_{j}} = \int_{Σ} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η} + \int_{D} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η} \\ = \frac{\partial W_{σ} (ζ)}{\partial ζ_{j}} + \int_{D} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η}, ζ \in Ω, j = \bar{1, 3} . \end{matrix}

(53)

Here

\frac{\partial W_{σ} (ζ)}{\partial ζ_{j}} = \int_{Σ} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η} .

(54)

Now we have

\begin{matrix} |\frac{\partial W (ζ)}{\partial ζ_{j}}| \leq |\int_{Σ} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η}| \\ \begin{matrix} + |\int_{D} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η}| \leq |\frac{\partial W_{σ} (ζ)}{\partial ζ_{j}}| \\ + |\int_{D} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η}|, ζ \in Ω, j = \bar{1, 3} . \end{matrix} \end{matrix}

(55)

Given inequality (40), we obtain:

\begin{matrix} \begin{matrix} |\int_{Σ} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η}| \leq \int_{Σ} |\frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}}| |W (η)| d s_{η} \end{matrix} \\ \leq δ \int_{Σ} |\frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}}| d s_{η}, ζ \in Ω, j = \bar{1, 3} . \end{matrix}

(56)

To prove (56), we estimate now

\int_{Σ} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial ζ_{j}}| d s_{y}

,

j = \bar{1, 2}

and

\int_{Σ} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial ζ_{3}}| d s_{η}

on a smooth surface

Σ

.

Given equality (30) and equality (35), we obtain

\int_{Σ} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial ζ_{j}}| d s_{η} \leq K_{ρ} (λ, ζ) σ^{2} e^{σ (q^{2} - ζ_{3}^{2})}, σ > 1, ζ \in Ω, j = \bar{1, 2} .

(57)

Taking into account (30), we obtain

\int_{Σ} |\frac{\partial Ψ_{σ} (η, ζ; λ)}{\partial ζ_{3}}| d s_{y} \leq K_{ρ} (λ, ζ) σ^{2} e^{σ (q^{2} - ζ_{3}^{2})}, σ > 1, ζ \in Ω,

(58)

From (57) and (58), bearing in mind (56), we obtain

\begin{matrix} |\int_{Σ} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η}| \leq K_{ρ} (λ, ζ) σ^{2} δ e^{σ (q^{2} - ζ_{3}^{2})}, σ > 1, ζ \in Ω, \\ j = \bar{1, 3} . \end{matrix}

(59)

We have

\begin{matrix} |\int_{D} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η}| \leq K_{ρ} (λ, ζ) σ^{2} M e^{- σ ζ_{3}^{2}}, σ > 1, ζ \in Ω, \\ j = \bar{1, 3} . \end{matrix}

(60)

From (55), (59) and (60), we obtain

\begin{matrix} |\frac{\partial W (ζ)}{\partial ζ_{j}}| \leq \frac{K_{ρ} (λ, ζ) σ^{2}}{2} (δ e^{σ q^{2}} + M) e^{- σ ζ_{3}^{2}}, σ > 1, ζ \in Ω, \\ j = \bar{1, 3} . \end{matrix}

(61)

Choosing

σ

as in (52) we get (42). □

Suppose now that

W (η) \in S_{ρ} (Ω)

is defined on

Σ

and

f_{δ} (η)

is its approximation with an error

0 < δ < 1

. Then

max_{Σ} |W (η) - f_{δ} (η)| \leq δ .

(62)

We put

W_{σ (δ)} (ζ) = \int_{Σ} L_{σ} (η, ζ; λ) f_{δ} (η) d s_{η}, ζ \in Ω .

(63)

Theorem 5.

Let

W (η) \in S_{ρ} (Ω)

satisfying the condition (25) on the part of the plane

η_{3} = 0

.

Then

|W (ζ) - W_{σ (δ)} (ζ)| \leq K_{ρ} (λ, ζ) σ^{2} M^{1 - \frac{ζ_{3}^{2}}{q^{2}}} δ^{\frac{ζ_{3}^{2}}{q^{2}}}, σ > 1, ζ \in Ω .

(64)

\begin{matrix} |\frac{\partial W (ζ)}{\partial ζ_{j}} - \frac{\partial W_{σ (δ)} (ζ)}{\partial ζ_{j}}| \leq K_{ρ} (λ, ζ) σ^{2} M^{1 - \frac{ζ_{3}^{2}}{q^{2}}} δ^{\frac{ζ_{3}^{2}}{q^{2}}}, σ > 1, ζ \in Ω, \\ j = \bar{1, 3} . \end{matrix}

(65)

Proof.

From (24) and (63), we obtain

\begin{matrix} W (ζ) - W_{σ (δ)} (ζ) = \int_{\partial Ω} L_{σ} (η, ζ; λ) W (η) d s_{η} \\ - \int_{Σ} L_{σ} (η, ζ; λ) f_{δ} (η) d s_{η} = \int_{Σ} L_{σ} (η, ζ; λ) W (η) d s_{η} \\ \begin{matrix} + \int_{D} L_{σ} (η, ζ; λ) W (η) d s_{η} - \int_{Σ} L_{σ} (η, ζ; λ) f_{δ} (η) d s_{η} \\ = \int_{Σ} L_{σ} (η, ζ; λ) \{W (η) - f_{δ} (η)\} d s_{η} + \int_{D} L_{σ} (η, ζ; λ) W (η) d s_{η} . \end{matrix} \end{matrix}

and

\begin{matrix} \frac{\partial W (ζ)}{\partial ζ_{j}} - \frac{\partial W_{σ (δ)} (ζ)}{\partial ζ_{j}} = \int_{\partial Ω} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η} \\ - \int_{Σ} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} f_{δ} (y) d s_{y} = \int_{S} \frac{\partial N_{σ} (y, x; λ)}{\partial x_{j}} U (y) d s_{y} \\ \begin{matrix} + \int_{D} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η} - \int_{Σ} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} f_{δ} (η) d s_{η} \end{matrix} \\ \begin{matrix} = \int_{Σ} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} \{W (η) - f_{δ} (η)\} d s_{η} + \int_{D} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η}, \\ j = \bar{1, 3} . \end{matrix} \end{matrix}

Using (25) and (62), we obtain:

\begin{matrix} |W (ζ) - W_{σ (δ)} (ζ)| = |\int_{Σ} L_{σ} (η, ζ; λ) \{W (η) - f_{δ} (η)\} d s_{η}| \\ + |\int_{D} L_{σ} (η, ζ; λ) W (η) d s_{η}| \leq \int_{Σ} |L_{σ} (η, ζ; λ)| |\{W (η) - f_{δ} (η)\}| d s_{η} \\ \begin{matrix} + \int_{D} |L_{σ} (η, ζ; λ)| |W (η)| d s_{η} \leq δ \int_{Σ} |L_{σ} (η, ζ; λ)| d s_{η} \\ + M \int_{D} |L_{σ} (η, ζ; λ)| d s_{η} . \end{matrix} \end{matrix}

and

\begin{matrix} |\frac{\partial W (ζ)}{\partial ζ_{j}} - \frac{\partial W_{σ (δ)} (ζ)}{\partial ζ_{j}}| = |\int_{σ} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} \{W (η) - f_{δ} (η)\} d s_{η}| \\ + |\int_{D} \frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}} W (η) d s_{η}| \leq \int_{Σ} |\frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}}| |\{W (η) - f_{δ} (η)\}| d s_{η} \\ + \int_{D} |\frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}}| |W (η)| d s_{η} \leq δ \int_{Σ} |\frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}}| d s_{η} \\ + M \int_{D} |\frac{\partial L_{σ} (η, ζ; λ)}{\partial ζ_{j}}| d s_{η}, j = \bar{1, 3} . \end{matrix}

We obtain, similarly repeating the proof of Theorems 3 and 4, that

|W (ζ) - W_{σ (δ)} (ζ)| \leq \frac{K_{ρ} (λ, ζ) σ^{2}}{2} (δ e^{σ q^{2}} + M) e^{- σ ζ_{3}^{2}} .

|\frac{\partial W (ζ)}{\partial ζ_{j}} - \frac{W_{σ (δ)} (ζ)}{\partial ζ_{j}}| \leq \frac{K_{ρ} (λ, ζ) σ^{2}}{2} (δ e^{σ q^{2}} + M) e^{- σ ζ_{3}^{2}}, j = \bar{1, 3} .

Considering

σ

from (52), we obtain (64) and (65). □

Corollary 3.

For every

ζ \in Ω

,

lim_{δ \to 0} W_{σ (δ)} (ζ) = W (ζ), lim_{δ \to 0} \frac{\partial W_{σ (δ)} (ζ)}{\partial ζ_{j}} = \frac{\partial W (ζ)}{\partial ζ_{j}}, j = \bar{1, 3} .

Corollary 4.

If

ζ \in {\bar{Ω}}_{ε}

, then the families of functions

\{W_{σ (δ)} (ζ)\}

and

\{\frac{\partial W_{σ (δ)} (ζ)}{\partial ζ_{j}}\}

are convergent uniformly for

δ \to 0

, that is:

W_{σ (δ)} (ζ) ⇉ W (ζ), \frac{\partial W_{σ (δ)} (ζ)}{\partial ζ_{j}} ⇉ \frac{\partial W (ζ)}{\partial ζ_{j}}, j = \bar{1, 3} .

4. Conclusions

In this paper, as a continuation of some previous papers, we explicitly found a regularized solution of the Cauchy problem for the matrix factorization of the Helmholtz equation in an unbounded domain from

R^{3}

. When applied problems are solved, the approximate values of

W (ζ)

and

\frac{\partial W (ζ)}{\partial ζ_{j}}, ζ \in Ω, j = \bar{1, 3}

must be found.

We have built, in this paper, a family of vector-functions

W (ζ, f_{δ}) = W_{σ (δ)} (ζ)

and

\frac{\partial W (ζ, f_{δ})}{\partial ζ_{j}} = \frac{\partial W_{σ (δ)} (ζ)}{\partial ζ_{j}}, j = \bar{1, 3},

depending on

σ

. Moreover, we have proved that for

σ = σ (δ)

, at

δ \to 0

, specially chosen,

W_{σ (δ)} (ζ)

and

\frac{\partial W_{σ (δ)} (ζ)}{\partial ζ_{j}}

are convergent to a solution

W (ζ)

and its derivative

\frac{\partial W (ζ)}{\partial ζ_{j}}, ζ \in Ω

. Such a family of vector functions

W_{σ (δ)} (ζ)

and

\frac{\partial W_{σ (δ)} (ζ)}{\partial ζ_{j}}

are called a regularized solution of the problem. A regularized solution determines a stable method to find the approximate solution of the problem.

Author Contributions

Conceptualisation, D.A.J.; methodology, A.S. and D.M.; formal analysis, D.A.J., A.S. and D.M.; writing—original draft preparation, D.A.J., A.S. and D.M. All authors read and agreed to the published version of the manuscript.

Funding

This research received no external funding.

Institutional Review Board Statement

Not applicable.

Informed Consent Statement

Not applicable.

Data Availability Statement

Not applicable.

Acknowledgments

The authors extend their appreciation to the Deanship of Scientific Research at King Khalid University, Abha, Kingdom of Saudi Arabia for funding this work through Large Groups RGP.2/43/43. This work also has been supported by Walailak University Master Degree Excellence Scholarships (Contract No. ME03/2021).

Conflicts of Interest

The authors declare no conflict of interest.

References

Hadamard, J. The Cauchy Problem for Linear Partial Differential Equations of Hyperbolic Type; Nauka: Moscow, Russia, 1978. [Google Scholar]
Tikhonov, A.N. On the solution of ill-posed problems and the method of regularization. Dokl. Akad. Nauk. SSSR 1963, 151, 501–504. [Google Scholar]
Lavrent’ev, M.M. On the Cauchy problem for second-order linear elliptic equations. Rep. USSR Acad. Sci. 1957, 112, 195–197. [Google Scholar]
Lavrent’ev, M.M. On Some Ill-Posed Problems of Mathematical Physics; Nauka: Novosibirsk, Russia, 1962. [Google Scholar]
Yarmukhamedov, S. On the Cauchy problem for Laplace’s equation. Dokl. Akad. Nauk SSSR 1977, 235, 281–283. [Google Scholar] [CrossRef]
Yarmukhamedov, S. On the extension of the solution of the Helmholtz equation. Rep. Russ. Acad. Sci. 1997, 357, 320–323. [Google Scholar]
Carleman, T. Les Fonctions Quasi Analytiques; Gautier-Villars et Cie: Paris, France, 1926. [Google Scholar]
Goluzin, G.M.; Krylov, V.M. The generalized Carleman formula and its application to the analytic continuation of functions. Sb. Math. 1933, 40, 144–149. [Google Scholar]
Aizenberg, L.A. Carleman’s Formulas in Complex Analysis; Nauka: Novosibirsk, Russia, 1990. [Google Scholar]
Tarkhanov, N.N. A criterion for the solvability of the ill-posed Cauchy problem for elliptic systems. Dokl. Math. 1990, 40, 341–345. [Google Scholar]
Tarkhanov, N.N. The Cauchy Problem for Solutions of Elliptic Equations; Akademie-Verlag: Berlin, Germany, 1995; Volume 7. [Google Scholar]
Arbuzov, E.V.; Bukhgeim, A.L. The Carleman formula for the Helmholtz equation on the plane. Sib. Math. J. 2006, 47, 425–432. [Google Scholar] [CrossRef]
Fayziyev, Y.; Buvaev, Q.; Juraev, D.A.; Nuralieva, N.; Sadullaeva, S. The inverse problem for determining the source function in the equation with the Riemann-Liouville fractional derivative. Glob. Stoch. Anal. 2022, 9, 43–52. [Google Scholar]
Marian, D.; Ciplea, S.A.; Lungu, N. Ulam-Hyers stability of Darboux-Ionescu problem. Carpathian J. Math. 2021, 37, 211216. [Google Scholar] [CrossRef]
Marian, D.; Ciplea, S.A.; Lungu, N. Hyers-Ulam Stability of Euler’s Equation in the Calculus of Variations. Mathematics 2021, 9, 3320. [Google Scholar] [CrossRef]
Marian, D. Laplace Transform and Semi-Hyers–Ulam–Rassias Stability of Some Delay Differential Equations. Mathematics 2021, 9, 3260. [Google Scholar] [CrossRef]
Shokri, A.; Khalsaraei, M.M.; Noeiaghdam, S.; Juraev, D.A. A new divided difference interpolation method for two-variable functions. Glob. Stoch. Anal. 2022, 9, 19–26. [Google Scholar]
Berdawood, K.; Nachaoui, A.; Saeed, R.; Nachaoui, M.; Aboud, F. An alternating procedure with dynamic relaxation for Cauchy problems governed by the modified Helmholtz equation. Adv. Math. Model. Appl. 2020, 5, 131–139. [Google Scholar]
Ciesielski, M.; Siedlecka, U. Fractional dual-phase lag equation-fundamental solution of the Cauchy problem. Symmetry 2021, 13, 1333. [Google Scholar] [CrossRef]
Fedorov, V.E.; Du, W.-S.; Turov, M.M. On the unique solvability of incomplete Cauchy type problems for a class of multi-term equations with the Riemann–Liouville derivatives. Symmetry 2021, 14, 75. [Google Scholar] [CrossRef]
Chen, Y.-G.; Yang, F.; Ding, Q. The Landweber iterative regularization method for solving the Cauchy problem of the modified Helmholtz equation. Symmetry 2022, 14, 1209. [Google Scholar] [CrossRef]
Adıgüzel, R.S.; Aksoy, Ü.; Karapınar, E.; Erhan, İ.M. On the solutions of fractional differential equations via Geraghty type hybrid contractions. Appl. Comput. Math. 2021, 20, 313–333. [Google Scholar]
Sunday, J.; Chigozie, C.; Omole, E.O.; Gwong, J.B. A pair of three-step hybrid block methods for the solutions of linear and nonlinear first-order systems. Eur. J. Math. Stat. 2022, 3, 14–25. [Google Scholar] [CrossRef]
Omole, E.O.; Jeremiah, O.A.; Adoghe, L.O. A class of continuous implicit seventh-eight method for solving y′ = f(x,y) using power series. Int. J. Chem. Math. Phys. 2020, 4, 39–50. [Google Scholar] [CrossRef]
Ozyapici, A.; Karanfiller, T. New integral operator for solutions of differential equations. TWMS J. Pure Appl. Math. 2020, 11, 131–143. [Google Scholar]
Shlapunov, A.A. The Cauchy problem for Laplace’s equation. Sib. Math. J. 1992, 33, 534–542. [Google Scholar] [CrossRef]
Kabanikhin, S.I.; Gasimov, Y.S.; Nurseitov, D.B.; Shishlenin, M.A.; Sholpanbaev, B.B.; Kasemov, S. Regularization of the continuation problem for elliptic equation. J. Inverse III-Posed Probl. 2013, 21, 871–874. [Google Scholar] [CrossRef]
Ikehata, M. Probe method and a Carleman function. Inverse Probl. 2007, 23, 659–681. [Google Scholar] [CrossRef]
Niyozov, I.E. The Cauchy problem of couple-stress elasticity in $R^{3}$ . Glob. Stoch. Anal. 2022, 9, 27–42. [Google Scholar]
Juraev, D.A. The Cauchy problem for matrix factorizations of the Helmholtz equation in an unbounded domain. Sib. Electron. Math. Rep. 2017, 14, 752–764. [Google Scholar] [CrossRef]
Juraev, D.A. On the Cauchy problem for matrix factorizations of the Helmholtz equation in an unbounded domain in $R^{2}$ . Sib. Electron. Math. Rep. 2018, 15, 1865–1877. [Google Scholar]
Zhuraev, D.A. Cauchy problem for matrix factorizations of the Helmholtz equation. Ukr. Math. J. 2018, 69, 1583–1592. [Google Scholar] [CrossRef]
Juraev, D.A.; Noeiaghdam, S. Regularization of the ill-posed Cauchy problem for matrix factorizations of the Helmholtz equation on the plane. Axioms 2021, 10, 82. [Google Scholar] [CrossRef]
Juraev, D.A.; Gasimov, Y.S. On the regularization Cauchy problem for matrix factorizations of the Helmholtz equation in a multidimensional bounded domain. Azerbaijan J. Math. 2022, 12, 142–161. [Google Scholar]
Juraev, D.A. On the solution of the Cauchy problem for matrix factorizations of the Helmholtz equation in a multidimensional spatial domain. Glob. Stoch. Anal. 2022, 9, 1–17. [Google Scholar]
Juraev, D.A. The solution of the ill-posed Cauchy problem for matrix factorizations of the Helmholtz equation in a multidimensional bounded domain. Palest. J. Math. 2022, 11, 604–613. [Google Scholar]
Juraev, D.A.; Shokri, A.; Marian, D. Solution of the ill-posed Cauchy problem for systems of elliptic type of the first order. Fractal Fract. 2022, 6, 358. [Google Scholar] [CrossRef]
Kythe, P.K. Fundamental Solutions for Differential Operators and Applications; Birkhauser: Boston, MA, USA, 1996. [Google Scholar]

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Juraev, D.A.; Shokri, A.; Marian, D. Regularized Solution of the Cauchy Problem in an Unbounded Domain. Symmetry 2022, 14, 1682. https://doi.org/10.3390/sym14081682

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Juraev DA, Shokri A, Marian D. Regularized Solution of the Cauchy Problem in an Unbounded Domain. Symmetry. 2022; 14(8):1682. https://doi.org/10.3390/sym14081682

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Juraev, Davron Aslonqulovich, Ali Shokri, and Daniela Marian. 2022. "Regularized Solution of the Cauchy Problem in an Unbounded Domain" Symmetry 14, no. 8: 1682. https://doi.org/10.3390/sym14081682

APA Style

Juraev, D. A., Shokri, A., & Marian, D. (2022). Regularized Solution of the Cauchy Problem in an Unbounded Domain. Symmetry, 14(8), 1682. https://doi.org/10.3390/sym14081682

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Regularized Solution of the Cauchy Problem in an Unbounded Domain

Abstract

1. Introduction

2. Statement of the Cauchy Problem

3. Regularized Solution of the Problem

4. Conclusions

Author Contributions

Funding

Institutional Review Board Statement

Informed Consent Statement

Data Availability Statement

Acknowledgments

Conflicts of Interest

References

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