On the integrated density of states for the Schrödinger operators with certain random electromagnetic potentials
Hiroyuki MATSUMOTO
著者情報
-
Hiroyuki MATSUMOTO
Department of Mathematics Faculty of General Education Gifu University
ジャーナル
フリー
1993 年 45 巻 2 号 p. 197-214
詳細
- Published: 1993 Received: 1991/12/17 Available on J-STAGE: 2006/10/20 Accepted: - Advance online publication: - Revised: -
-
訂正情報
訂正日: 2006/10/20 訂正理由: - 訂正箇所: 引用文献情報 訂正内容: Wrong : 1) M. A. Akcoglu and U. Krengel, Ergodic theorems for superadditive processes, J. Reine Angew. Math., 323 (1981), 53-67.
2) J. Avron, I. Herbst and B. Simon, Schrödinger operators with magnetic fields, I. General interactions, Duke Math. J., 45 (1978), 847-883.
3) R. Carmona and J. Lacroix, Spectral theory of random Schrödinger operators, Birkhäuser, Boston, 1990.
4) Y. Colin de Verdière, L'asymptotique de Weyl pour les bouteilles magnétiques, Comm. Math. Phys., 105 (1986), 327-335.
5) B. Helffer and J. Sjöstrand, Equation de Schrödinger avec champ magnétique et équation de Harper, Schrödinger operators, (eds. H. Holden and A. Jensen), Lecture Notes in Phys., 345, Springer, 1989, pp. 118-197.
6) W. Kirsch and F. Martinelli, On the ergodic properties of the spectrum of general random operators, J. Reine. Angew. Math., 334 (1982), 141-156.
7) W. Kirsch and F. Martinelli, On the density of states of Schrödinger operators with a random potential, J. Phys. A, 15 (1982), 2139-2156.
8) W. Kirsch and F. Martinelli, On the essential selfadjointness of stochastic Schrödinger operators, Duke Math. J., 50 (1983), 1255-1260.
9) H. Kunz, The quantum hall effect for electrons in a random potential, Comm. Math. Phys., 112 (1987), 121-145.
10) E. H. Lieb and W. E. Thirring, Inequalities for the moments of the eigenvalues of the Schrödinger Hamiltonian and their relation to Sobolev inequalities, Studies in Mathematical Physics, Essays in Honor of Valentine Bargmann, (eds. E. H. Lieb, et al), Princeton Series in Physics, 1976, pp. 269-303.
11) I. M. Lifshitz, Energy spectrum structure and quantum states of disordered condensed systems, Soviet Phys. Uspekhi, 7 (1965), 549-573.
12) S. Nakao, On the spectral distribution of the Schrödinger operator with random potential, Japan. J. Math., 3 (1977), 111-139.
13) L. A. Pastur, Spectra of random selfadjoint operators, Russian Math. Surveys, 28 (1973), 1-67.
14) M. Reed and B. Simon, Methods of Modern Mathematical Physics, II. Fourier Analysis, Self-adjointness, Academic Press, London, 1975.
15) M. Reed and B. Simon, Methods of Modern Mathematical Physics, IV. Analysis of Operators, Academic Press, London, 1978.
16) N. Ueki, Spectral asymptotics for random Schrödinger operators with magnetic fields, preprint.
17) F. Wegner, Exact density of states for lowest Landau level in white noise potential, superfield representation for interacting systems, Z. Phys. B, 51 (1983), 279-285.
Right : [1] M. A. Akcoglu and U. Krengel, Ergodic theorems for superadditive processes, J. Reine Angew. Math., 323 (1981), 53-67.
[2] J. Avron, I. Herbst and B. Simon, Schrödinger operators with magnetic fields, I. General interactions, Duke Math. J., 45 (1978), 847-883.
[3] R. Carmona and J. Lacroix, Spectral theory of random Schrödinger operators, Birkhäuser, Boston, 1990.
[4] Y. Colin de Verdière, L'asymptotique de Weyl pour les bouteilles magnétiques, Comm. Math. Phys., 105 (1986), 327-335.
[5] B. Helffer and J. Sjöstrand, Equation de Schrödinger avec champ magnétique et équation de Harper, Schrödinger operators, (eds. H. Holden and A. Jensen), Lecture Notes in Phys., 345, Springer, 1989, pp. 118-197.
[6] W. Kirsch and F. Martinelli, On the ergodic properties of the spectrum of general random operators, J. Reine. Angew. Math., 334 (1982), 141-156.
[7] W. Kirsch and F. Martinelli, On the density of states of Schrödinger operators with a random potential, J. Phys. A, 15 (1982), 2139-2156.
[8] W. Kirsch and F. Martinelli, On the essential selfadjointness of stochastic Schrödinger operators, Duke Math. J., 50 (1983), 1255-1260.
[9] H. Kunz, The quantum hall effect for electrons in a random potential, Comm. Math. Phys., 112 (1987), 121-145.
[10] E. H. Lieb and W. E. Thirring, Inequalities for the moments of the eigenvalues of the Schrödinger Hamiltonian and their relation to Sobolev inequalities, Studies in Mathematical Physics, Essays in Honor of Valentine Bargmann, (eds. E. H. Lieb, et al), Princeton Series in Physics, 1976, pp. 269-303.
[11] I. M. Lifshitz, Energy spectrum structure and quantum states of disordered condensed systems, Soviet Phys. Uspekhi, 7 (1965), 549-573.
[12] S. Nakao, On the spectral distribution of the Schrödinger operator with random potential, Japan. J. Math., 3 (1977), 111-139.
[13] L. A. Pastur, Spectra of random selfadjoint operators, Russian Math. Surveys, 28 (1973), 1-67.
[14] M. Reed and B. Simon, Methods of Modern Mathematical Physics, II. Fourier Analysis, Self-adjointness, Academic Press, London, 1975.
[15] M. Reed and B. Simon, Methods of Modern Mathematical Physics, IV. Analysis of Operators, Academic Press, London, 1978.
[16] N. Ueki, Spectral asymptotics for random Schrödinger operators with magnetic fields, preprint.
[17] F. Wegner, Exact density of states for lowest Landau level in white noise potential, superfield representation for interacting systems, Z. Phys. B, 51 (1983), 279-285.
訂正日: 2006/10/20 訂正理由: - 訂正箇所: PDFファイル 訂正内容: -
PDFをダウンロード (1176K)
メタデータをダウンロード
RIS形式
BIB TEX形式
テキスト
メタデータのダウンロード方法
発行機関連絡先
(EndNote、Reference Manager、ProCite、RefWorksとの互換性あり)
(BibDesk、LaTeXとの互換性あり)
記事の1ページ目
