%0 Report %D 2015 %T Stability of the (2+2)-fermionic system with zero-range interaction %A Alessandro Michelangeli %A Paul Pfeiffer %X We introduce a 3D model, and we study its stability, consisting of two distinct pairs of identical fermions coupled with a two-body interaction between fermions of different species, whose effective range is essentially zero (a so called (2+2)-fermionic system with zero-range interaction). The interaction is modelled by implementing the the celebrated (and ubiquitous, in the literature of this field) Bethe-Peierls contact condition with given two-body scattering length within the Krein-Visik-Birman theory of extensions of semi-bounded symmetric operators, in order to make the Hamiltonian a well-defined (self-adjoint) physical observable. After deriving the expression for the associated energy quadratic form, we show analytically and numerically that the energy of the model is bounded below, thus describing a stable system. %G en %U http://urania.sissa.it/xmlui/handle/1963/34474 %1 34649 %2 Mathematics %4 1 %# MAT/07 %$ Submitted by Alessandro Michelangeli (alemiche@sissa.it) on 2015-06-24T10:47:38Z No. of bitstreams: 1 sissa-preprint-29-2015-mate.pdf: 827153 bytes, checksum: e5268c2d26f348929a3c532f9ffd3097 (MD5)