Abstract
It is shown, for the first time, that approaching the Condon domain phase in temperature from above is accompanied by critical temperature growth of the susceptibility thereby indicating formation of Condon domains, which occurs as a phase transition. The study is based on a recent measurement of the temperature dependence of the susceptibility in silver in magnetic field of 25 T under conditions of the nonlinear de Haas-van Alphen effect. Experimental results for the positive and negative slopes of the magnetization in one de Haas-van Alphen period are in good agreement with results of the calculations presented here. The Curie-Weiss law for the susceptibility is derived for a needle-type specimen. The Curie constant is calculated.
Original language | English |
---|---|
Pages (from-to) | 135-138 |
Number of pages | 4 |
Journal | Solid State Communications |
Volume | 133 |
Issue number | 2 |
DOIs | |
State | Published - Jan 2005 |
Externally published | Yes |
Bibliographical note
Funding Information:We are indebted to M.A. Itskovsky, V. Egorov, R. Kramer, A.G.M. Jansen, I. Sheikin and especially to J. Hinderer for illuminating discussions. One of us (A.G.) is grateful to J.L. Smith for providing us with his paper before publication. We express our deep gratitude to P. Wyder for his interest in this work. One of us (A.G.) thanks the Center for Computational Mathematics and Scientific Computation of the University of Haifa for support.
Funding
We are indebted to M.A. Itskovsky, V. Egorov, R. Kramer, A.G.M. Jansen, I. Sheikin and especially to J. Hinderer for illuminating discussions. One of us (A.G.) is grateful to J.L. Smith for providing us with his paper before publication. We express our deep gratitude to P. Wyder for his interest in this work. One of us (A.G.) thanks the Center for Computational Mathematics and Scientific Computation of the University of Haifa for support.
Funders | Funder number |
---|---|
Center for Computational Mathematics and Scientific Computation of the University of Haifa |
Keywords
- D. Condon domains
- D. Electron gas in quantizing magnetic fields
- D. de Haas-van Alphen effect