Fluctuations of $N$-particle quantum dynamics around the nonlinear Schrödinger equation

Abstract: We consider a system of N bosons interacting through a singular twobody potential scaling with N and having the form N 3β−1 V (N β x), for an arbitrary parameter β ∈ (0, 1). We provide a norm-approximation for the many-body evolution of initial data exhibiting Bose-Einstein condensation in terms of a cubic nonlinear Schrödinger equation for the condensate wave function and of a unitary Fock space evolution with a generator quadratic in creation and annihilation operators for the fluctuations.

“…As proven in [10,Proposition 8], any moments of the number of particles operator are approximately preserved with respect to conjugation with the Bogoliubov transformation T N,t . To be more precise for every fixed k ∈ N and δ > 0, there exists C > 0 such that…”

“…The proof of Theorem 1.2 is based on the norm approximation (1.29) from [10]. In the following we collect useful properties of the unitaries used therein.…”

“…The norm approximation (1.29) from [10] implies, that for every α < min{β/2, (1 − β)/2} there exists C > 0 such that…”

“…Besides the convergence of the one-particle reduced density γ N,t associated with ψ N,t , the norm approximation of ψ N,t has been studied for different settings of β ∈ (0, 1) in [10,22,26,27]. Our result is based on the norm approximation obtained in [10] covering β < 1 whose ideas we explain in the following.…”

“…Note that G N,t consists of terms which quadratic in creation and annihilation operators and of terms of higher order. Nevertheless, in [10,Lemma 5] it is shown that G N,t can be approximated through the generator G 2,N,t containing quadratic terms only.…”

Central limit theorem for Bose gases interacting through singular potentials

“…As proven in [10,Proposition 8], any moments of the number of particles operator are approximately preserved with respect to conjugation with the Bogoliubov transformation T N,t . To be more precise for every fixed k ∈ N and δ > 0, there exists C > 0 such that…”

“…The proof of Theorem 1.2 is based on the norm approximation (1.29) from [10]. In the following we collect useful properties of the unitaries used therein.…”

“…The norm approximation (1.29) from [10] implies, that for every α < min{β/2, (1 − β)/2} there exists C > 0 such that…”

“…Besides the convergence of the one-particle reduced density γ N,t associated with ψ N,t , the norm approximation of ψ N,t has been studied for different settings of β ∈ (0, 1) in [10,22,26,27]. Our result is based on the norm approximation obtained in [10] covering β < 1 whose ideas we explain in the following.…”

“…Note that G N,t consists of terms which quadratic in creation and annihilation operators and of terms of higher order. Nevertheless, in [10,Lemma 5] it is shown that G N,t can be approximated through the generator G 2,N,t containing quadratic terms only.…”

Central limit theorem for Bose gases interacting through singular potentials

Some Connections Between Stochastic Mechanics, Optimal Control, and Nonlinear Schrödinger Equations

Uniform in Time Convergence to Bose–Einstein Condensation for a Weakly Interacting Bose Gas with an External Potential