Singular inverse square potential, limit cycles, and self-adjoint extensions

Abstract: We study the radial Schroedinger equation for a particle of mass m in the field of a singular attractive α/r 2 potential with 2mα > 1/4. This potential is relevant to the fabrication of nanoscale atom optical devices, is said to be the potential describing the dipole-bound anions of polar molecules, and is the effective potential underlying the universal behavior of three-body systems in nuclear physics and atomic physics, including aspects of Bose-Einstein condensates, first described by Efimov. New results i… Show more

“…In two previous studies of the 1/r 2 potential using renormalization theory, the regularization potential was chosen to be a spherical square well [11,12]:…”

“…The simplest example is the quantum mechanics of a particle in a potential whose long-range behavior is 1/r 2 . This problem has been studied previously within the renormalization group framework by two different groups using a spherical square-well regularization potential [11,12]. Beane et al [11] showed that there are infinitely many choices for the coupling constant of the square-well potential, including a continuous function of the shortdistance cutoff R and a log-periodic function of R with discontinuities which corresponds to an RG limit cycle.…”

“…Beane et al [11] showed that there are infinitely many choices for the coupling constant of the square-well potential, including a continuous function of the shortdistance cutoff R and a log-periodic function of R with discontinuities which corresponds to an RG limit cycle. Bawin and Coon [12] presented a closed-form solution for the coupling constant that is log-periodic, which suggests that the choice with the RG limit cycle is in some sense natural.…”

Renormalization-group limit cycle for the1∕r2potential

“…In two previous studies of the 1/r 2 potential using renormalization theory, the regularization potential was chosen to be a spherical square well [11,12]:…”

“…The simplest example is the quantum mechanics of a particle in a potential whose long-range behavior is 1/r 2 . This problem has been studied previously within the renormalization group framework by two different groups using a spherical square-well regularization potential [11,12]. Beane et al [11] showed that there are infinitely many choices for the coupling constant of the square-well potential, including a continuous function of the shortdistance cutoff R and a log-periodic function of R with discontinuities which corresponds to an RG limit cycle.…”

“…Beane et al [11] showed that there are infinitely many choices for the coupling constant of the square-well potential, including a continuous function of the shortdistance cutoff R and a log-periodic function of R with discontinuities which corresponds to an RG limit cycle. Bawin and Coon [12] presented a closed-form solution for the coupling constant that is log-periodic, which suggests that the choice with the RG limit cycle is in some sense natural.…”

Renormalization-group limit cycle for the1∕r2potential

“…Finally, in the core renormalization framework , the strength ℵ of the regularizing core is promoted to a running coupling ℵ = ℵ(a), while the conformal coupling λ remains fixed [22,23]. In this framework, our unified description leads to…”

“…(17) provides the characteristic logperiodic running coupling ℵ(a) of the core-the celebrated limit cycle for the renormalization group of the three-body problem [22,23,24]. For d = 3, l = 0, and zero energy,…”

Renormalization in conformal quantum mechanics

The Cauchy problem for Choquard equation with an inverse‐square potential