Stability and semiclassics in self-generated fields

Institut for Matematiske Fag

Stability and semiclassics in self-generated fields

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Standard

Stability and semiclassics in self-generated fields. / Erdös, Laszlo; Fournais, Søren; Solovej, Jan Philip.

I: Journal of the European Mathematical Society, Bind 15, Nr. 6, 2013, s. 2093-2113.

Publikation: Bidrag til tidsskrift › Tidsskriftartikel › Forskning › fagfællebedømt

Harvard

Erdös, L, Fournais, S & Solovej, JP 2013, 'Stability and semiclassics in self-generated fields', Journal of the European Mathematical Society, bind 15, nr. 6, s. 2093-2113. <http://arxiv.org/abs/1105.0506>

APA

Erdös, L., Fournais, S., & Solovej, J. P. (2013). Stability and semiclassics in self-generated fields. Journal of the European Mathematical Society, 15(6), 2093-2113. http://arxiv.org/abs/1105.0506

Vancouver

Erdös L, Fournais S, Solovej JP. Stability and semiclassics in self-generated fields. Journal of the European Mathematical Society. 2013;15(6):2093-2113.

Author

Erdös, Laszlo ; Fournais, Søren ; Solovej, Jan Philip. / Stability and semiclassics in self-generated fields. I: Journal of the European Mathematical Society. 2013 ; Bind 15, Nr. 6. s. 2093-2113.

Bibtex

@article{fc9780663b614cf1a97231408fb8576c,

title = "Stability and semiclassics in self-generated fields",

abstract = "We consider non-interacting particles subject to a fixed external potential V and a self-generated magnetic field B. The total energy includes the field energy β∫B^2 and we minimize over all particle states and magnetic fields. In the case of spin-1/2 particles this minimization leads to the coupled Maxwell-Pauli system. The parameter β tunes the coupling strength between the field and the particles and it effectively determines the strength of the field. We investigate the stability and the semiclassical asymptotics, h→0, of the total ground state energy E(β,h,V). The relevant parameter measuring the field strength in the semiclassical limit is κ=βh. We are not able to give the exact leading order semiclassical asymptotics uniformly in κ or even for fixed κ. We do however give upper and lower bounds on E with almost matching dependence on κ. In the simultaneous limit h→0 and κ→∞ we show that the standard non-magnetic Weyl asymptotics holds. The same result also holds for the spinless case, i.e. where the Pauli operator is replaced by the Schr{\"o}dinger operator. ",

author = "Laszlo Erd{\"o}s and S{\o}ren Fournais and Solovej, {Jan Philip}",

year = "2013",

language = "English",

volume = "15",

pages = "2093--2113",

journal = "Journal of the European Mathematical Society",

issn = "1435-9855",

publisher = "European Mathematical Society Publishing House",

number = "6",

}

RIS

TY - JOUR

T1 - Stability and semiclassics in self-generated fields

AU - Erdös, Laszlo

AU - Fournais, Søren

AU - Solovej, Jan Philip

PY - 2013

Y1 - 2013

N2 - We consider non-interacting particles subject to a fixed external potential V and a self-generated magnetic field B. The total energy includes the field energy β∫B^2 and we minimize over all particle states and magnetic fields. In the case of spin-1/2 particles this minimization leads to the coupled Maxwell-Pauli system. The parameter β tunes the coupling strength between the field and the particles and it effectively determines the strength of the field. We investigate the stability and the semiclassical asymptotics, h→0, of the total ground state energy E(β,h,V). The relevant parameter measuring the field strength in the semiclassical limit is κ=βh. We are not able to give the exact leading order semiclassical asymptotics uniformly in κ or even for fixed κ. We do however give upper and lower bounds on E with almost matching dependence on κ. In the simultaneous limit h→0 and κ→∞ we show that the standard non-magnetic Weyl asymptotics holds. The same result also holds for the spinless case, i.e. where the Pauli operator is replaced by the Schrödinger operator.

AB - We consider non-interacting particles subject to a fixed external potential V and a self-generated magnetic field B. The total energy includes the field energy β∫B^2 and we minimize over all particle states and magnetic fields. In the case of spin-1/2 particles this minimization leads to the coupled Maxwell-Pauli system. The parameter β tunes the coupling strength between the field and the particles and it effectively determines the strength of the field. We investigate the stability and the semiclassical asymptotics, h→0, of the total ground state energy E(β,h,V). The relevant parameter measuring the field strength in the semiclassical limit is κ=βh. We are not able to give the exact leading order semiclassical asymptotics uniformly in κ or even for fixed κ. We do however give upper and lower bounds on E with almost matching dependence on κ. In the simultaneous limit h→0 and κ→∞ we show that the standard non-magnetic Weyl asymptotics holds. The same result also holds for the spinless case, i.e. where the Pauli operator is replaced by the Schrödinger operator.

M3 - Journal article

VL - 15

SP - 2093

EP - 2113

JO - Journal of the European Mathematical Society

JF - Journal of the European Mathematical Society

SN - 1435-9855

IS - 6

ER -

ID: 102682868