[{"citation":{"ama":"Erdös L. Ground-state density of the Pauli operator in the large field limit. *Letters in Mathematical Physics*. 1993;29(3):219-240. doi:10.1007/BF00761110","short":"L. Erdös, Letters in Mathematical Physics 29 (1993) 219–240.","apa":"Erdös, L. (1993). Ground-state density of the Pauli operator in the large field limit. *Letters in Mathematical Physics*, *29*(3), 219–240. https://doi.org/10.1007/BF00761110","chicago":"Erdös, László. “Ground-State Density of the Pauli Operator in the Large Field Limit.” *Letters in Mathematical Physics* 29, no. 3 (1993): 219–40. https://doi.org/10.1007/BF00761110.","ista":"Erdös L. 1993. Ground-state density of the Pauli operator in the large field limit. Letters in Mathematical Physics. 29(3), 219–240.","ieee":"L. Erdös, “Ground-state density of the Pauli operator in the large field limit,” *Letters in Mathematical Physics*, vol. 29, no. 3, pp. 219–240, 1993.","mla":"Erdös, László. “Ground-State Density of the Pauli Operator in the Large Field Limit.” *Letters in Mathematical Physics*, vol. 29, no. 3, Springer, 1993, pp. 219–40, doi:10.1007/BF00761110."},"year":"1993","date_created":"2018-12-11T11:59:16Z","issue":"3","month":"11","doi":"10.1007/BF00761110","day":"01","status":"public","extern":1,"publist_id":"4169","page":"219 - 240","title":"Ground-state density of the Pauli operator in the large field limit","publication":"Letters in Mathematical Physics","publication_status":"published","intvolume":" 29","date_updated":"2019-04-26T07:22:19Z","quality_controlled":0,"author":[{"full_name":"László Erdös","orcid":"0000-0001-5366-9603","first_name":"László","id":"4DBD5372-F248-11E8-B48F-1D18A9856A87","last_name":"Erdös"}],"volume":29,"_id":"2723","type":"journal_article","abstract":[{"text":"The ground-state density of the Pauli operator in the case of a nonconstant magnetic field with constant direction is studied. It is shown that in the large field limit, the naturally rescaled ground-state density function is bounded from above by the megnetic field, and under some additional conditions, the limit density function is equal to the magnetic field. A restatement of this result yields an estimate on the density of complex orthogonal polynomials with respect to a fairly general weight function. We also prove a special case of the paramagnetic inequality. ","lang":"eng"}],"publisher":"Springer","date_published":"1993-11-01T00:00:00Z"}]