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The Point Spectrum of the Three-Particle Schrödinger Operator on $$\boldsymbol{\mathbb{Z}}$$ with Masses $$\boldsymbol{m_{1}=m_{2}=\infty}$$ and $$\boldsymbol{m_{3}<\infty}$$

Zahriddin MuminovRomanovskii Institute of Mathematics, 100174, Tashkent, UzbekistanVasila AktamovaSamarkand Institute of Veterinary Medicine, 140103, Samarkand, Uzbekistan

Lobachevskii Journal of Mathematicsjournal2024en

ABI

Annotatsiya

In this article, the hamiltonian $$H(K)$$ of a system of three-particles moving on the lattice $$\mathbb{Z}$$ interacting through repulsive or attractive zero-range pairwise potentials is considered. It is studied the point spectrum of the Schrödinger operator which possesses infinitely many eigenvalues depending on repulsive or attractive interactions, assuming that two particles in the system have infinite mass.

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Spectral Theory in Mathematical Physics Differential Equations and Boundary Problems Advanced Mathematical Physics Problems

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DOI: 10.1134/s1995080224606817

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The Point Spectrum of the Three-Particle Schrödinger Operator on $$\boldsymbol{\mathbb{Z}}$$ with Masses $$\boldsymbol{m_{1}=m_{2}=\infty}$$ and $$\boldsymbol{m_{3}&lt;\infty}$$

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The Point Spectrum of the Three-Particle Schrödinger Operator on $$\boldsymbol{\mathbb{Z}}$$ with Masses $$\boldsymbol{m_{1}=m_{2}=\infty}$$ and $$\boldsymbol{m_{3}<\infty}$$