Physics – Mathematical Physics
Scientific paper
2003-12-10
Physics
Mathematical Physics
28 pages
Scientific paper
The Hamiltonian of a system of three quantum mechanical particles moving on the three-dimensional lattice $\Z^3$ and interacting via zero-range attractive potentials is considered. For the two-particle energy operator $h(k),$ with $k\in \T^3=(-\pi,\pi]^3$ the two-particle quasi-momentum, the existence of a unique positive eigenvalue below the bottom of the continuous spectrum of $h(k)$ for $k\neq0$ is proven, provided that $h(0)$ has a zero energy resonance. The location of the essential and discrete spectra of the three-particle discrete Schr\"{o}dinger operator $H(K), K\in \T^3$ being the three-particle quasi-momentum, is studied. The existence of infinitely many eigenvalues of H(0) is proven. It is found that for the number $N(0,z)$ of eigenvalues of H(0) lying below $z<0$ the following limit exists $$ \lim_{z\to 0-} \frac {N(0,z)}{\mid \log\mid z\mid\mid}=\cU_0 $$ with $\cU_0>0$. Moreover, for all sufficiently small nonzero values of the three-particle quasi-momentum $K$ the finiteness of the number $ N(K,\tau_{ess}(K))$ of eigenvalues of $H(K)$ below the essential spectrum is established and the asymptotics for the number $N(K,0)$ of eigenvalues lying below zero is given.
Albeverio Sergio
Lakaev Saidakhmat N.
Muminov Zahriddin I.
No associations
LandOfFree
Schrödinger operators on lattices. The Efimov effect and discrete spectrum asymptotics does not yet have a rating. At this time, there are no reviews or comments for this scientific paper.
If you have personal experience with Schrödinger operators on lattices. The Efimov effect and discrete spectrum asymptotics, we encourage you to share that experience with our LandOfFree.com community. Your opinion is very important and Schrödinger operators on lattices. The Efimov effect and discrete spectrum asymptotics will most certainly appreciate the feedback.
Profile ID: LFWR-SCP-O-461024