On the rate of convergence for the mean field approximation of Bosonic many-body quantum dynamics

Ammari, Zied; Falconi, Marco; Pawilowski, Boris

doi:10.4310/cms.2016.v14.n5.a9

Cited by 42 publications

(59 citation statements)

References 48 publications

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“…for ǫ fixed, has been proved by other methods in this case (see [29,4]). Moreover, quantitative estimates for that limit for ǫ fixed and N → ∞ have been obtained in [28,26,2]. Therefore, only the case where both N → ∞ and ǫ → 0 remains to be treated, and the present work answers precisely this question.…”

Section: Next We Define Two Unbounded Operators Onmentioning

confidence: 73%

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On the Mean Field and Classical Limits of Quantum Mechanics

Golse

Mouhot

Paul

2016

Commun. Math. Phys.

114

154

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Abstract. The main result in this paper is a new inequality bearing on solutions of the N -body linear Schrödinger equation and of the mean field Hartree equation. This inequality implies that the mean field limit of the quantum mechanics of N identical particles is uniform in the classical limit and provides a quantitative estimate of the quality of the approximation. This result applies to the case of C 1,1 interaction potentials. The quantity measuring the approximation of the N -body quantum dynamics by its mean field limit is analogous to the Monge-Kantorovich (or Wasserstein) distance with exponent 2. The inequality satisfied by this quantity is reminiscent of the work of Dobrushin on the mean field limit in classical mechanics [Func. Anal. Appl. 13 (1979), 115-123]. Our approach of this problem is based on a direct analysis of the N -particle Liouville equation, and avoids using techniques based on the BBGKY hierarchy or on second quantization.In memory of Louis Boutet de Monvel (1941Monvel ( -2014 Statement of the problemIn nonrelativistic quantum mechanics, the dynamics of N identical particles of mass m in R d is described by the linear Schrödinger equationwhere the unknown is Ψ ≡ Ψ(t, x 1 , . . . , x N ) ∈ C, the N -particle wave function, while x 1 , x 2 , . . . , x N designate the positions of the 1st, 2nd,. . . , N th particle. The interaction between the kth and lth particles is given by the potential V , a realvalued measurable function defined a.e. on R d , such thatDenoting the macroscopic length scale by L > 0, we define a time scale T > 0 such that the total interaction energy of the typical particle with the N −1 other particles is of the order of m(L/T ) 2 . With the dimensionless space and time variables defined asx := x/L ,t := t/T , the interaction potential is scaled aŝ V (ẑ) := N T 2 mL 2 V (z) .1991 Mathematics Subject Classification. 82C10, 35Q55 (82C05,35Q83).

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Section: Next We Define Two Unbounded Operators Onmentioning

confidence: 73%

“…The mean field limit is the asymptotic regime where N → ∞, with ǫ > 0 fixed. Set the initial data in (2) and let Ψ ǫ,N be the solution of the Cauchy problem (2) -which exists for all times provided that V is such that…”

Section: Statement Of the Problemmentioning

confidence: 99%

On the Mean Field and Classical Limits of Quantum Mechanics

Golse

Mouhot

Paul

2016

Commun. Math. Phys.

114

154

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“…In the simpler case β = 0, i.e. in the mean-field regime, the convergence of the one-particle reduced density towards the orthogonal projection onto the solution of the nonlinear Hartree equation i∂ t ϕ t = −∆ϕ t + (V * |ϕ t | 2 )ϕ t (5) has been proved in several situations; see, e.g., [47,6,20,1,16,4,21,22,31,30,3,13,2]. In the present paper, we are interested in the norm approximation to the manybody evolution, which is more precise than the convergence of the one-particle reduced density.…”

Section: Introductionmentioning

confidence: 99%

“…is the Fock space vacuum and, for any f ∈ L 2 (R 3 ), W (f ) = exp(a * (f ) − a(f )) is a Weyl operator. The normalization of ϕ guarantees that W ( √ Nϕ)Ω, N W ( √ N ϕ)Ω = N. The time-evolution of initial coherent states of the form (8), generated by the natural extension of the Hamiltonian (2) to the Fock space F…”

Section: Introductionmentioning

confidence: 99%

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

Brennecke

Nam

Napiórkowski

et al. 2019

Ann. Inst. H. Poincaré C Anal. Non Linéaire

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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.

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“…For β = 0 (mean-field regime), the solution of (1.2) can be approximated by products of the Hartree equation i∂ t ϕ t = −∆ϕ t + V * |ϕ t | 2 ϕ t with initial data ϕ 0 ∈ L 2 (R 3 ). See for example [1,2,3,4,5,9,15,19,20,21,23,24,31]. For 0 < β ≤ 1, on the other hand, the solution ψ N,t of (1.2) can be approximated by the non-linear Schrödinger equation…”

Section: Introductionmentioning

confidence: 99%

Central limit theorem for Bose gases interacting through singular potentials

Rademacher

2020

Lett Math Phys

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We consider a system of N bosons in the limit N → ∞, interacting through singular potentials. For initial data exhibiting Bose-Einstein condensation, the many-body time evolution is well approximated through a quadratic fluctuation dynamics around a cubic non-linear Schrödinger equation of the condensate wave function. We show that these fluctuations satisfy a (multi-variate) central limit theorem.where α (n) ∈ L 2 ⊥ϕ N,t (R 3 ) ⊗sn for all n = 1, · · · , N . Then,This unitary satisfies the following properties proven in [25] U ϕ N,t a * (ϕ N,t )a(ϕ N,t )U * ϕ N,t =N − N + (t) U ϕ N,t a * (ϕ N,t )a(f )U * ϕ N,t = N − N + (t)a(f )

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On the rate of convergence for the mean field approximation of Bosonic many-body quantum dynamics

Cited by 42 publications

References 48 publications

On the Mean Field and Classical Limits of Quantum Mechanics

On the Mean Field and Classical Limits of Quantum Mechanics

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

Central limit theorem for Bose gases interacting through singular potentials

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