Ultrarelativistic (Cauchy) spectral problem in the infinite well

Abstract

We analyze spectral properties of the ultrarelativistic (Cauchy) operator | |1/2, provided its action is constrained exclusively to the interior of the interval [-1,1] ⊂ R. To this end both analytic and numerical methods are employed. New high-accuracy spectral data are obtained. A direct analytic proof is given that trigonometric functions (nπ x/2) and (nπ x), for integer n are not the eigenfunctions of | |D1/2, D=(-1,1). This clearly demonstrates that the traditional Fourier multiplier representation of | |1/2 becomes defective, while passing from R to a bounded spatial domain D⊂ R.