We present explicit expressions for Fock-space projection operators that correspond to realistic final states in scattering experiments. Our operators automatically sum over unobserved quanta and account for non-emission into sub-regions of momentum space
Spin-projected Hartree-Fock is written as a particle-hole excitation ansatz over a symmetry-adapted ...
We present a Pfaffian formula for projection and symmetry restoration for wave functions of the gene...
A variation of the Zamolodchikov–Faddeev algebra over a finite-dimensional Hilbert space H and an in...
We present explicit expressions for Fock-space projection operators that correspond to realistic fin...
In this paper we discuss probability operator measure and phase measurement in one mode interacting...
We show that a theory of com plex scattering between many-body (Fock) states can be constructed such...
Original article can be found at: http://prl.aps.org/--Copyright American Physical SocietyWe describ...
AbstractThe (q,t)-Fock space Fq,t(H), introduced in this paper, is a deformation of the q-Fock space...
A simple approach to phase-space representation of quantum state vectors using the displacement-oper...
We predict a generic signature of quantum interference in many-body bosonic systems resulting in a c...
The semi‐Euclidean formulation, developed in constructive quantum field theory to handle boson–fermi...
Quantum states of systems made of many identical particles, e.g. those described by Fermi-Hubbard an...
During the last decades, semiclassical techniques for single particle systems have been successfully...
Beam splittings with an arbitrary number of beams of in- and output are introduced as second quantis...
By representing the field content as well as the particle creation operators in terms of fermionic F...
Spin-projected Hartree-Fock is written as a particle-hole excitation ansatz over a symmetry-adapted ...
We present a Pfaffian formula for projection and symmetry restoration for wave functions of the gene...
A variation of the Zamolodchikov–Faddeev algebra over a finite-dimensional Hilbert space H and an in...
We present explicit expressions for Fock-space projection operators that correspond to realistic fin...
In this paper we discuss probability operator measure and phase measurement in one mode interacting...
We show that a theory of com plex scattering between many-body (Fock) states can be constructed such...
Original article can be found at: http://prl.aps.org/--Copyright American Physical SocietyWe describ...
AbstractThe (q,t)-Fock space Fq,t(H), introduced in this paper, is a deformation of the q-Fock space...
A simple approach to phase-space representation of quantum state vectors using the displacement-oper...
We predict a generic signature of quantum interference in many-body bosonic systems resulting in a c...
The semi‐Euclidean formulation, developed in constructive quantum field theory to handle boson–fermi...
Quantum states of systems made of many identical particles, e.g. those described by Fermi-Hubbard an...
During the last decades, semiclassical techniques for single particle systems have been successfully...
Beam splittings with an arbitrary number of beams of in- and output are introduced as second quantis...
By representing the field content as well as the particle creation operators in terms of fermionic F...
Spin-projected Hartree-Fock is written as a particle-hole excitation ansatz over a symmetry-adapted ...
We present a Pfaffian formula for projection and symmetry restoration for wave functions of the gene...
A variation of the Zamolodchikov–Faddeev algebra over a finite-dimensional Hilbert space H and an in...
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