The convergence rate of truncated hypersingular integrals generated by the modified Poisson semigroup

Hypersingular integrals have appeared as effective tools for inversion of multidimensional potential-type operators such as Riesz, Bessel, Flett, parabolic potentials, etc. They represent (at least formally) fractional powers of suitable differential operators. In this paper the family of the so-called “truncated hypersingular integral operators” \(\mathbf{D}_{\varepsilon }^{\alpha }f\) is introduced, that is generated by the modified Poisson semigroup and associated with the Flett potentials ${\mathcal{F}}^{\alpha }\phi ={(E+\sqrt{-\mathrm{\Delta }})}^{-\alpha }\phi$ (\(0<\alpha <\infty \), \(\varphi \in L_{p}(\mathbb{R}^{n})\)). Then the relationship between the order of “\(L_{p}\)-smoothness” of a function f and the “rate of \(L_{p}\)-convergence” of the families \(\mathbf{D}_{\varepsilon }^{\alpha } \mathcal{F}^{\alpha }f\) to the function f as \(\varepsilon \rightarrow 0^{+}\) is also obtained.

For a sufficiently “good function” f on \(\mathbb{R}^{n}\), the Riesz and Bessel potentials of order α are defined by

where

and

with the kernel

respectively.

These operators can be regarded (in a certain sense) as negative “fractional powers” of −Δ and \((E-\Delta )\), i.e.,

If \(f \in L_{p}(\mathbb{R}^{n})\) then the integral (1) converges a.e. for \(1\leq p< \frac{n}{\operatorname{Re} \alpha }\), and the integral (2) converges for \(1\leq p<\infty \), and the conditions are sharp. The references [10, 12, 19, 20, 22, 28] can be recommended for further reading on these potentials.

There are also “one-dimensional” integral representations of the Riesz and Bessel potentials via Poisson integral (see [18], [19, pp. 224 and 262]).

As seen from (3) and (4), the Riesz potentials are better suited to Poisson integral than the Bessel potentials. There is, however, another kind of fractional integral operators which are compatible with Poisson integral and whose kernels behavior roughly takes place between the behaviors of the kernels of the Bessel and Riesz potentials. These potentials, called the Flett potentials, were first introduced by T.M. Flett in [11] (see also [23, pp. 541–542]).

The Flett potentials \(\mathcal{F}^{\alpha }f\) of a function f are defined in Fourier terms as follows:

These potentials are considered as the negative fractional powers of the operator \((E+\varLambda )\), where \(\varLambda =(-\Delta )^{1/2}\) and Δ is the Laplacian, and have the integral representation

The kernel \(\phi _{\alpha } ( y ) \) is of the form

where \(\lambda _{n} ( \alpha ) =\pi ^{ ( n+1 ) /2} \varGamma ( \alpha ) /\varGamma ( ( n+1 ) /2 ) \).

The potential-type operators take important place in analysis and its applications, see, for example, E. Stein [26, pp. 121–141], E. Stein and G. Weiss [27], E. Stein [25], S.G. Samko, A.A. Kilbas, and O.I. Marichev [23, pp. 538–554]. Many researchers from different areas have studied characterizations, modifications, and several properties of these potentials, see P. Lizorkin [13], R. Wheeden [28], M. Fisher [10], V. Balakrishnan [8], S. Samko [21–23], B. Rubin [16–19], V.A. Nogin [14, 15]. The wavelet approach to these potentials is given and developed by B. Rubin [19, 20], I.A. Aliev and B. Rubin [6] and I.A. Aliev [2]; see also [4, 7, 24].

In [17] B. Rubin introduced “truncated hypersingular” integrals \(D_{\varepsilon }^{\alpha }f\) and \(\mathfrak{D}_{\varepsilon }^{\alpha }f \) (\(\varepsilon >0\)) generated by the Poisson semigroup and metaharmonic semigroup, respectively. It has been also proved that under some conditions on function \(\varphi \in L_{p}(\mathbb{R}^{n})\) and parameter \(\alpha > 0\), the expressions \(D_{\varepsilon }^{\alpha }I^{\alpha }\varphi \) and \(\mathfrak{D}_{\varepsilon }^{\alpha }J^{\alpha }\varphi \) converge to φ as \(\varepsilon \rightarrow 0^{+}\), pointwise (a.e.) and in the \(L_{p}\)-norm.

In this work, in a similar way to [17], we first define the families of the truncated hypersingular integral operators associated with Flett potentials and generated by finite difference and modified Poisson semigroup \(e^{-t} ( P_{t}f )\),

secondly, we find a relationship between the “order of \(L_{p}\)-smoothness” of function φ and the “rate of \(L_{p}\)-convergence” of the families \(\mathbf{D}_{\varepsilon }^{\alpha } \mathcal{F}^{\alpha }\varphi \) to φ as \(\varepsilon \rightarrow 0^{+}\).

We note that an analogous problem for the Bessel and Riesz potentials has been investigated in [3, 5], and [9].

We denote by \(L_{p}\equiv L_{p} ( \mathbb{R} ^{n} ) \) the standard space of measurable functions on \(\mathbb{R} ^{n}\) with the finite norm

The Fourier and inverse Fourier transforms of \(f\in L_{1} ( \mathbb{R} ^{n} ) \) are defined by

The Flett potentials, defined in (6), have another (one-dimensional) integral representation via modified Poisson semigroup:

Here the Poisson semigroup \(P_{t}f\) is defined as

where

is the Poisson kernel.

We would like to note that the expression in (9) has the same nature of classical Balakrishnan’s formulas for fractional powers of operators (see Samko et al. [23, p. 121]).

For the sake of convenience of the reader, let us give some important properties of the Poisson’s semigroup \(P_{t}\varphi \) (\(t>0\)) and its kernel \(p ( y;t ) \).

Lemma 2.1

(cf. B. Rubin [19, p. 217])

Let\(f\in L_{p} ( \mathbb{R} ^{n} ) \), \(1\leq p\leq \infty \), and\(P_{t}f\)be the Poisson integral with the kernel\(p ( y;t ) \)defined as in (11). Then

where\(( \boldsymbol{M}f ) \)is the Hardy–Littlewood maximal function;

where the limit is understood in\(L_{p}\)-norm or pointwise a.e. Moreover, if\(f\in C^{0}\)then convergence is uniform on\(\mathbb{R}^{n}\).

Definition 2.2

Let \(f\in L_{p} ( \mathbb{R} ^{n} ) \), \(1\leq p\leq \infty \) and Poisson integral \(P_{t}f\) be as in (10). The modified Poisson semigroup is defined as

It is evident that the semigroup property

holds, and, according to Lemma 2.1(f), it is assumed that

Definition 2.3

The finite difference of order \(l\in \mathbb{N} \) and step \(\tau \in \mathbb{R} ^{1}\) of the function \(g ( t ) \), \(t\in \mathbb{R} ^{1}\) is defined by

In the special case, for \(t=0\),

Using the modified Poisson semigroup \(S_{t}f\) and finite difference of order \(l\in \mathbb{N} \), we introduce the following truncated integral operators (cf. [19, p. 261]).

Definition 2.4

Let \(f\in L_{p} ( \mathbb{R}^{n} ) \), \(1\leq p<\infty \), \(\alpha >0\) and \(l>\alpha \) (\(l\in \mathbb{N} \)). The constructions

will be called truncated hypersingular integrals or, briefly, truncated integrals with parameter \(\varepsilon >0\). Here the normalized coefficient \(\chi _{l} ( \alpha ) \) is defined by

By applying Minkowski integral inequality, it is easy to see that \(\mathbf{D}_{\varepsilon }^{\alpha }f\in L_{p} ( \mathbb{R}^{n} ) \) for all \(\varepsilon >0\).

Lemma 2.5

(cf. Rubin [19, p. 224])

Let\(\varphi \in L_{p} ( \mathbb{R}^{n} )\) (\(1\leq p< \infty \)), \(0<\alpha <\infty \), and truncated integral operators\(\mathbf{D}_{\varepsilon }^{\alpha }\)be defined as in (21). If\(\mathcal{F}^{\alpha }\varphi \)are the Flett potentials of\(\varphi \in L_{p} ( \mathbb{R}^{n} ) \), and\(P_{t}\varphi \), (\(t>0\)) is the Poisson integral ofφ, then the following equation holds in pointwise (a.e.) sense:

Here the function\(K_{\alpha }^{ ( l ) } ( \eta ) \)is defined as

with$a_{+}^{\alpha }=\{\begin{array}{cc}{a}^{\alpha },& \mathit{\text{if }}a>0,\\ 0,& \mathit{\text{if }}a\le 0.\end{array}$.

Proof

For a function \(h ( t )\) (\(0< t<\infty\)), let

Then by making use of Rubin’s method [19, p. 224], it can be shown that

holds for all \(t>0\) and a.e. \(x\in \mathbb{R} ^{n}\).

Now, by using (25), we have

Further,

where

with

Now, by taking into account (27) in (26), we get

In (29), using the equality (see [5, p. 355])

we obtain

as desired. □

The following lemma shows that the function \(K_{\alpha }^{ ( l ) } ( \eta ) \) is an “averaging kernel”.

Lemma 2.6

(see [23, p. 125], [19, p. 158])

The following is true:

Definition 2.7

(cf. [1])

Let \(\rho \in ( 0,1 ) \) be a fixed parameter and a function \(\mu ( r ) \) (\(0\leq r\leq \rho\)) be continuous on \([ 0,\rho ] \), positive on \((0,\rho ]\), and \(\mu ( 0 ) =0\). We say that a function \(\varphi \in L_{p} ( \mathbb{R}^{n} ) \) (\(1\leq p< \infty \)) has “μ-smoothness property in \(L_{p}\)-sense” if

Note that if \(\mu _{\varphi } ( r ) \) is the \(L_{p}\)-modulus of continuity of φ, i.e.,

then condition (31) is satisfied for \(\mu (r)=\mu _{\varphi } (r)\). Also, it is clear that if the \(L_{p}\)-modulus of continuity of φ satisfies \(\mu _{\varphi }(r)\leq \mu (r)\) (\(0\leq r\leq \rho \)) then the expression \(\mathcal{M}_{\mu }\) in (31) is finite.

Remark 2.8

From now on it will be assumed that \(\mu ( t ) \geq at\) (\(0\leq t\leq \rho \)), for some \(a>0\) and \(\mu ( t ) =\mu ( \rho ) \) for \(\rho \leq t<\infty \).

Lemma 2.9

(cf. [5]; see also [9])

Let a function\(\varphi \in L_{p} ( \mathbb{R}^{n} ) \) (\(1\leq p< \infty \)) haveμ-smoothness property in\(L_{p}\)-sense, and the function\(\psi ( r ) \) (\(0\leq r\leq \rho \)) be decreasing, nonnegative, and continuously differentiable on\([ 0,\rho ] \). Then

Proof

Set \(g(x)= \Vert \varphi ( t-x ) -\varphi ( t ) \Vert _{p}\) and \(x=r\theta \); \(r= \vert x \vert \), \(\theta \in \varSigma ^{n-1}\). Then

Let us define the functions

Then we have

Using condition (31), we have

hence,

 □

Lemma 2.10

Let\(p ( x;\varepsilon ) \)be the Poisson kernel, defined as in (11), i.e.,

Then there exists a constant\(c>0\)such that

Proof

By setting \(\psi ( \vert x \vert ) =p ( x; \varepsilon ) \equiv a_{n}\varepsilon ( \varepsilon ^{2}+ \vert x \vert ^{2} ) ^{-\frac{n+1}{2}}\) in equality (32), we have

A simple calculation yields

and

Using of these calculations in (34) and denoting \(c=\max \{ c_{1},c_{2} \} \), we have

 □

Corollary 2.11

Let the function\(\mu ( r ) \) (\(0\leq r\leq \rho <1\)) be continuous on\([ 0,\rho ] \), positive on\((0,\rho ] \), and\(\mu ( 0 ) =0\). Let, further, \(\mu ( t ) \geq at\), \(0\leq t\leq \rho \)for some\(a>0\)and\(\mu ( t ) =\mu ( \rho ) \)for\(\rho \leq t<\infty \). If there exists a locally bounded function\(\omega ( t ) >0\)such that

then there exists\(A>0\), which does not depend on\(\varepsilon \in ( 0,\rho ) \)and satisfies

Proof

By taking into account (35) in (33) and using the condition \(\mu ( \varepsilon ) \geq a\varepsilon \) (\(0\leq \varepsilon \leq \rho \)), we have

 □

Example

For \(0<\gamma <1\), the function

satisfies all the conditions of Corollary 2.11 with \(\omega ( t ) =t^{\gamma }\).

Example

Let \(0<\gamma <1\) and \(0<\beta <\infty \). Then the function

satisfies all the conditions of Corollary 2.11 with \(\omega ( t ) =t^{\gamma } ( 1+ \frac{ \vert \ln t \vert }{ \vert \ln \rho \vert } ) ^{\beta }\) (see [3]).

Theorem 3.1

Let the function\(\mu ( r )\), \(0< r<\infty \)satisfy all the conditions of Corollary 2.11. Further, suppose function\(\varphi \in L_{p} ( \mathbb{R} ^{n} )\) (\(1\leq p< \infty \)) has theμ-smoothness property in the\(L_{p}\)-sense, i.e., condition (31) is satisfied. Assume that the operator\(\mathbf{D}_{\varepsilon }^{\alpha } \)is defined as in (21) and the parameter\(l\in \mathbb{N} \)satisfies the condition\(l>\alpha +1\). Then we have

Proof

By making use of formula (23), Lemma 2.6(i), and Minkowski inequality, we have

Further, by Lemma 2.1(a),

Owing to (36), we have \(I_{1} ( \varepsilon ) \leq A\mu ( \varepsilon \eta ) \), where A does not depend on ε and η.

Now, let us estimate the second integral \(I_{2} ( \varepsilon )\). We have

where \(c_{2}\equiv c_{2} ( \rho ;n ) \) does not depend on ε and η.

Hence, we obtain that

Further,

The condition \(\int _{0}^{\infty } \frac{\omega ( \eta ) }{1+\eta ^{2}}\,d\eta <\infty \) and Lemma 2.6(ii) yield

On the other hand, because of \(K_{\alpha }^{ ( l ) } ( \eta ) =O(\eta ^{ \alpha -l-1})\), \(\eta \rightarrow \infty \) and \(l>(\alpha +1)\), we have

Taking all of these estimates into account in (39), it follows that

where the constant c does not depend on ε. This completes the proof. □

Corollary 3.2

1. (i)

   Let\(\mu ( t ) =t^{\gamma }\), \(0<\gamma <1\), \(t\in [ 0, \rho ) \), and suppose a function\(\varphi \in L_{p} ( \mathbb{R} ^{n} ) \)hasμ-smoothness property in\(L_{p}\)-sense. Then

   $$ \bigl\Vert \mathbf{D}_{\varepsilon }^{\alpha }\mathcal{F}^{\alpha }\varphi -\varphi \bigr\Vert _{p}=O \bigl( \varepsilon ^{\gamma } \bigr) \quad \textit{as }\varepsilon \rightarrow 0^{+}. $$
2. (ii)

   Let\(\mu ( t ) =t^{\gamma } \vert \ln t \vert ^{ \beta }\), \(0<\gamma <1\), \(\beta \in ( 0,\infty )\), \(t\in ( 0,\rho ) \), and suppose a function\(\varphi \in L_{p} ( \mathbb{R} ^{n} ) \)hasμ-smoothness property in\(L_{p}\)-sense. Then

   $$ \bigl\Vert \mathbf{D}_{\varepsilon }^{\alpha }\mathcal{F}^{\alpha }\varphi -\varphi \bigr\Vert _{p}=O \bigl( \varepsilon ^{\gamma } \vert \ln \varepsilon \vert ^{\beta } \bigr) \quad \textit{as } \varepsilon \rightarrow 0^{+}. $$

Acknowledgements

The authors would like to thank reviewers for their constructive comments and suggestions.

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Authors and Affiliations

1. Department of Mathematics, Akdeniz University, Antalya, Turkey

   Melih Eryiğit

2. Faculty of Education, Akdeniz University, Antalya, Turkey

   Sinem Sezer Evcan

3. Ahi Evran Vocational and Technical Anatolian High School, Şanlıurfa, Turkey

   Selim Çobanoğlu

Contributions

All authors contributed equally to the writing of this paper. All authors read and approved the final manuscript.

Corresponding author

Correspondence to Sinem Sezer Evcan.

Competing interests

The authors declare that they have no competing interests.

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