On string density at the origin (1307.6171v1)
Abstract: In [V. Barcilon Explicit solution of the inverse problem for a vibrating string. J. Math. Anal. Appl. {\bf 93} (1983) 222-234] two boundary value problems were considered generated by the differential equation of a string $$ y{\prime\prime}+\lambda p(x)y=0, \ \ 0\leq x \leq L<+\infty \eqno{()} $$ with continuous real function $p(x)$ (density of the string) and the boundary conditions $y(0)=y(L)=0$ the first problem and $y{\prime}(0)=y(L)=0$ the second one. In the above paper the following formula was stated $$ p(0)={1}{L2\mu_1}\mathop{\prod}\limits_{n=1}{\infty}{\lambda_n2}{\mu_n \mu_{n+1}} \eqno{()} $$ where ${\lambda_k}{k=1}{\infty}$ is the spectrum of the first boundary value problem and ${\mu_k}{k=1}{\infty}$ of the second one. Rigorous proof of () was given in [C.-L. Shen On the Barcilon formula for the string equation with a piecewise continuous density function. Inverse Problems {\bf 21}, (2005) 635--655] under more restrictive conditions of piecewise continuity of $p{\prime}(x)$. In this paper () was deduced using $$ p(0)=\lim\limits_{\lambda\to +\infty}({\phi(L,-\lambda)}{\lambda{{1}{2}}\psi(L,-\lambda)})2 \eqno{(}) $$ where $\phi(x,\lambda)$ is the solution of () which satisfies the boundary conditions $\phi(0)-1=\phi{\prime}(0)=0$ and $\psi(x,\lambda)$ is the solution of () which satisfies $\psi(0)=\psi{\prime}(0)-1=0$. In our paper we prove that () is true for the so-called M.G. Krein's string which may have any nondecreasing mass distribution function $M(x)$ with finite nonzero $M{\prime}(0)$. Also we show that (*) is true for a wide class of strings including those for which $M(x)$ is a singular function, i.e. $M{\prime}(x)=p(x)\mathop{=}\limits{a.e.}0$.