Two-body continuum states in non-integer geometry

Abstract

Wave functions, phase shifts and corresponding elastic cross sections are investigated for two short-range interacting particles in a deformed external oscillator field. For this we use the equivalent d-method employing a non-integer dimension d. Using a square-well potential, we derive analytic expressions for scattering lengths and phase shifts. In particular, we consider the dimension, dE, for infinite scattering length, where the Efimov effect occurs by addition of a third particle. We give explicitly the equivalent continuum wave functions in d and ordinary three dimensional (3D) space, and show that the phase shifts are the same in both methods. Consequently the d-method can be used to obtain low-energy two-body elastic cross sections in an external field.