Open Journal of Mathematical Analysis

On a hyper-singular equation

Alexander G. Ramm
Department of Mathematics, Kansas State University, Manhattan, KS 66506, USA.; ramm@math.ksu.edu

Abstract

The equation \(v=v_0+\int_0^t(t-s)^{\lambda -1}v(s)ds\) is considered, \(\lambda\neq 0,-1,-2…\) and \(v_0\) is a smooth function rapidly decaying with all its derivatives. It is proved that the solution to this equation does exist, is unique and is smoother than the singular function \(t^{-\frac 5 4}\).

Keywords:

Hyper-singular equation.

1. Introduction and formulation of the result

Let
\begin{equation}\label{e1} v(t)=v_0(t)+\int_0^t (t-s)^{\lambda -1}v(s)ds, \quad \lambda\neq 0,-1,-2,.... \end{equation}
(1)
where \(v_0\) is a smooth functions rapidly decaying with all its derivatives as \(t\to \infty\), \(v_0(t)=0\) if \(t< 0\). The integral in (1) diverges in the classical sense. Our result can be formulated as follows.

Theorem 1. The solution to equation (1) for \(\lambda=-\frac1 4\) does exist, is unique and less singular than \(t^{-\frac 5 4}\) as \(t\to 0\).

Proof. We define the integral in (1) as a convolution of the distribution \(t^{\lambda-1}\) and \(v\). The space of the test functions for this distribution is the space \(\mathcal{K}:=C^\infty_0(R_+)\) of compactly supported on \(R_+:=[0, \infty)\) infinitely differentiable functions \(\phi(t)\) defined on \(R_+:=[0,\infty)\). The topology on this space is defined by countably many norms \(\sup_{t\ge 0}t^m|D^p\phi(t)|\). A sequence \(\phi_n(t)\) converges to \(\phi(t)\) in \(\mathcal{K}\) if and only if all the functions \(\phi_n(t)\) have compact support on an interval \([a,b]\), \(a>0\), \(b< \infty\) and \(\phi_n\) converges on this interval to \(\phi\) in every of the above norms. Let us check that \(t^{\lambda-1}:=t_+^{\lambda-1}\) is a distribution on \(\mathcal{K}\) for \(\lambda< 0\), i.e., a linear bounded functional on \(\mathcal{K}\). Let \(\phi_n\in \mathcal{K}\) and \(\phi_n \to \phi\) in \(\mathcal{K}\). If \(\lambda< 0\) then \(\max_{t\in [a,b]}t^{\lambda -1}\le a^{\lambda-1}+b^{\lambda-1}\). Thus, $$|\int_0^\infty t^{\lambda-1}\phi_n(t)dt|\le [a^{\lambda-1}+b^{\lambda-1}] \int_0^\infty |\phi_n(t)|dt,$$ where \(a>0\) and \(b< \infty\). Since \(\phi_n \to \phi\) in \(\mathcal{K}\), we have $$\int_0^\infty |\phi_n(t)|dt\to \int_a^b | \phi|dt.$$ So, the integral \(\int_0^\infty t^{\lambda-1}\phi(t)dt\) is a bounded linear functional on \(\mathcal{K}\) and \(t^{\lambda-1}\) is a distribution on the set of the test functions \(\mathcal{K}\) for \(\lambda\neq 0,-1,-2,...\). The integral in (1) is the convolution \(t^{\lambda-1}\star v\). This convolution is defined for any distributions on the dual to \(\mathcal{K}\) space \(\mathcal{K}'\). This is done in [3], p.57. For another space of the test functions \(K=C^\infty_0(R)\) this is done in [2], p.135. It is known, see e.g. [1], p.39, that

\begin{equation}\label{e2a} L(f\star h)=L(f)L(h), \end{equation}
(2)
where \(L\) is the Laplace transform, and \(f,h\) are distributions on \(\mathcal{K}\). Let us calculate \(L(t^{\lambda-1})\) using the new variable \(s=pt\):
\begin{equation}\label{e2} L(t^{\lambda-1})=\int_0^\infty t^{\lambda-1}e^{-pt}dt=\int_0^\infty s^{\lambda-1}e^{-s}ds p^{-\lambda}=\Gamma(\lambda)p^{-\lambda},\quad \lambda\neq 0,-1,-2... \end{equation}
(3)
This formula is valid classically for \(Re \lambda>0\). By analytic continuation with respect to \(\lambda\) it is valid for all complex \(\lambda\neq 0,-1,-2,....\). Applying the Laplace transform to (1) and using formulas (2) and (3), one gets
\begin{equation}\label{e3} L(v)=L(v_0)+\Gamma(\lambda)p^{-\lambda}L(v). \end{equation}
(4)
Let us assume that \(\lambda=-\frac 1 4\) so that \(\lambda-1=-\frac 5 4\). This value appears in the solution to the Navier-Stokes problem in \(R^3\), see [3], p.53. If \(\lambda=-\frac 1 4\), then equation (4) yields
\begin{equation}\label{e4} L(v)=\frac{L(v_0)}{1+4\Gamma(3/4)p^{1/4}}, \end{equation}
(5)
where we have used the relation \(\Gamma(-\frac 1 4)=-4\Gamma(3/4)\), which follows from the known formula \(\Gamma(z+1)=z\Gamma(z)\) with \(z=-\frac 1 4\). Thus,
\begin{equation}\label{e5} v=L^{-1}\frac{L(v_0)}{1+4\Gamma(3/4)p^{1/4}}. \end{equation}
(6)
So, the solution \(v\) does exist and is unique. Moreover, \(v\) is not a distribution if \(v_0\) is smooth and rapidly decaying when \(t\to \infty\). This follows from the known results concerning the relation of asymptotic of \(L(f)(p)\) and \(f(t)\) for \(p\to \infty\) and \(t\to 0\) and for \(p\to 0\) and \(t\to \infty\), see [1], p.41. Namely, if \(f(t)\sim At^{\nu}\) as \(t\to 0\), then \(L(f)(p)\sim A\Gamma(\nu +1)p^{-\nu -1}\) as \(p\to \infty\), \(\nu\neq -1.-2,....\). If \(f(t)\sim At^{\nu}\) as \(t\to \infty\) then \(L(f)(p)\sim A\Gamma(\nu +1)p^{-\nu -1}\) as \(p\to 0\). Since \(p^{1/4}\to 0\) as \(p\to 0\), the asymptotic of \(v(t)\) as \(t\to \infty\) is of the same order as that of \(v_0\). As \(p\to \infty\) the singularity of \(v(t)\) as \(t\to 0\) is of the order less than that of \(t^{-\frac 5 4}\). For example, assume that \(v_0\) is continuous as \(t\to 0\). Then we can take \(\nu\ge 0\). Consider the worst case \(\nu=0\). In this case \(L(v)(p)\) is of the order \(p^{-1-\frac 1 4}=p^{-\frac 5 4}\). Therefore \(v\sim t^{-\frac 1 4}\) as \(t\to 0\). This is an integrable singularity. Thus, \(v\) is less singular as \(t\to 0\) than the distribution \(t^{-\frac 5 4}\). Theorem 1 is proved.

In [4] another result, similar to the one in this paper, is proved. In Zbl 07026037 in a review of paper [5] there is an erroneous claim that the proof in [5] is incorrect. The reviewer erroneously claims that the integral (1) diverges and therefore it is equal to infinity. While this is true classically it is not true in the sense of distributions. Therefore, the claim of the reviewer that the proof in [5] is not correct is false. The reviewer claims that \(\Phi_{-\frac 1 4}\) is not equal to \(\frac {t_+^{-\frac 5 4}}{\Gamma(-\frac 1 4)}\). This is not true if the space of the test functions is \(\mathcal{K}\) (although it is true if the space of the test functions is \(K\)).

2. Concluding remark.

Historically it is well known that equation (1) can be solved explicitly by the Laplace transform if \(\lambda>0\) and the function \(1-L(t^{\lambda -1})\neq 0\). To our knowledge, for \(\lambda< 0\) there were no results concerning the solvability of equation (1). The author got interested in (1) in the case \(\lambda=-\frac 1 4\) in connection with the millennium problem about unique global solvability of the Navier-Stokes problem (NSP) in \(R^3\) which was solved in [5], see also [3] Chapter 5.

Author Contributions

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

Competing Interests

The author(s) do not have any competing interests in the manuscript.

References

  1. Brychkov, Y. A., & Prudnikov, A. P. (1977). Integral transforms of generalized functions, Nauka, Moscow, (in Russian). [Google Scholor]
  2. Gel'fand, I. M., & Shilov, G. E. (1959). Generalized functions. Vol. 1, GIFML, Moscow, (in Russian).[Google Scholor]
  3. Ramm, A. G. (2019). Symmetry Problems. The Navier-Stokes Problem, Morgan & Claypool Publishers, San Rafael, CA. [Google Scholor]
  4. Ramm, A. G. (2018). Existence of the solutions to convolution equations with distributional kernels. Global Journal of Math. Analysis, 6(1), 1-2.[Google Scholor]
  5. Ramm, A. G. (2019). Solution of the Navier-Stokes problem. Applied Mathematics Letters , 87, 160-164. [Google Scholor]