Yan-Hsiou Cheng scite author profile

We study the inverse nodal problem for Hill's equation. In particular, we solve the uniqueness, reconstruction and stability problems using the nodal set of periodic (or anti-periodic) eigenfunctions. Furthermore, we show that the space of periodic potential functions q normalized by ∫10q = 0 is homeomorphic to the partition set of the space of quasinodal sequences. Our method is to make a translation so that the periodic (or anti-periodic) problem is reduced to a Dirichlet problem.

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$L^1$ convergence of the reconstruction formula for the potential function

Yating

Cheng

Law

et al. 2002

Proc. Amer. Math. Soc.

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Reconstruction of the Sturm-Liouville operator on a $p$-star graph with nodal data

Cheng¹

2012

Rocky Mountain J. Math.

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The dual eigenvalue problems for the Sturm–Liouville system

Cheng

Kung

Law

et al. 2010

Computers & Mathematics with Applications

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a b s t r a c tIn this paper, we find the minimizer of the eigenvalue gap for the Schrödinger equation and vibrating string equation. In the first part, we show the first two Neumann eigenvalue gap of the Schrödinger equation with single-well potentials is not less than 1 and the equality holds if and only if the potential is constant. In the second part, since the first Neumann eigenvalue of the vibrating string equation is 0, we turn to show that the minimizing density function of the second Neumann eigenvalue is of the form hχ (a,π−a) +Hχ [0,π]\(a,π−a) for some a.

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Yan-Hsiou Cheng

Remarks on a New Inverse Nodal Problem

The inverse nodal problem for Hill's equation

$L^1$ convergence of the reconstruction formula for the potential function

Reconstruction of the Sturm-Liouville operator on a $p$-star graph with nodal data

The dual eigenvalue problems for the Sturm–Liouville system

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