Title-affiliation

Constantinos Simserides1,2 1 Leibniz Institute for Neurobiology, Special Lab for Non-Invasive Brain Imaging, Magdeburg, Germany 2 University of Athens, Physics Department, Solid State Section, Athens, Greece Spin-polarization and magnetization of conduction-band dilute-magnetic-semiconductor quantum wells with non-step-likedensity of states Title-affiliation

e.g. n-doped DMS ZnSe / Zn1-x-yCdxMnySe / ZnSe QWs B in-plane magnetic field Keywords – Things to remember • DOS = density of states • DMS = dilute magnetic semiconductor conduction band, narrow to wide, DMS QWs

outline • How does in-plane B modify DOS ? - DOS diverges significantly from ideal step-like 2DEG form • considerable fluctuation of M • severe changes to physical properties e.g. • spin-subband populations, spin polarization • internal energy, U free energy, F • Shannon entropy, S • in-plane magnetization, M (if vigorous competition between spatial and magnetic confinement)

B applied parallel to quasi 2DEG DOS in simple structures not only the generalshape of the DOS varies, but this effect is also quantitative. ● the DOS deviates from the famous step-like (B→0) form. • interplay between spatial and magnetic confinement ● Ei(kx) must be determined self-consistently for quantum wells which are not ideally narrow [1]. ● The eigenvalue equation has to be solved for each i and kx [1]. ●The van Hove singularities, are not - in general - simple saddle points [1]. ●The singularities are e.g. crucial for the interpretation of magnetoresistance measurements [1,2].

n(ε) -ln|ε-Ei| DETAILS… DOS in simple structures LimitB → 0, Ei(kx) = Ei+ ħ2kx2/(2m*). DOS recovers simple famous 2DEG form Limit simple saddle point, Ei(kx) = Ei – ħ2kx2/(2n*), (n* > 0). DOS diverges logarithmically

Basic Theory and Equations Comparison with characteristic systems knowing DOS  we can calculate various electronic properties…

DOS in DMS structures enhanced energy splitting between spin-up and spin-down states (all possible degrees of freedombecomeevident) i, kx, σ for any typeofinterplay between spatial and magnetic confinement i.e. for narrow as well as for wide QWs

proportional to the cyclotron gap spin-spin exchange interaction between s- or p- conduction band electrons and d- electrons of Μn+2 cations Enhanced electron spin-splitting, Uoσ Higher temperatures. spin-splitting decreases enhanced contribution of spin-up electrons Feedback mechanism due tondown(r) - nup(r). Low temperatures. spin-splitting maximum, ~ 1/3 of conduction band offset

Equations

Results and discussion (a) Low temperatures, N = constant, T = constant

L = 10 nm (spatial confinement dominates) ~ parabolic spin subbands increase B more flat dispersion  few % DOS increase A single behavior of Internal Energy Free Energy Entropy

L = 30 nm(drastic dispersion modification) Spin-subband dispersion and DOS

L = 30 nm Spin-subband Populations Internal energy Free Energy Entropy + Depopulation of higher spin-subband

L = 60 nm(~ spin-down bilayer system) Spin-subband dispersion and DOS

L = 60 nm Spin-subband Populations Internal Energy Free Energy Entropy + Depopulation of higher spin-subband

Magnetization considerable fluctuation of M (if vigorous competition between spatial and magnetic confinement)

Magnetization considerable fluctuation of M (if vigorous competition between spatial and magnetic confinement) Magnetization fluctuation: 5 A/m (as adding 1017 cm-3 Mn).

Results and discussion (b) Higher temperatures, N = constant

Spin-subband populations – Depopulation ● exploit the depopulation of the higher subbands to eliminate spin-up electrons ● choose the parameters so that only spin-down electrons survive or Subband populations, L = 30 nm Subband populations, L = 60 nm

Spin Polarization Ns = Ns,up + Ns,down (free carrier 2D concentration) ● spin-polarization 10 nm

Synopsis - Conclusion - Results for different degrees of magnetic and spatial confinement. - Valuable system for conduction-band spintronics. - How much the classical staircase 2DEG DOS must be modified, under in-plane B. - The DOS modification causes considerable effects on the system’s physical properties. Spin-subband Populations, Spin Polarization Internal energy Free energy Entropy Magnetization We predict a significant fluctuation of the M when the dispersion is severely modified by the parallel magnetic field.

Bibliography 1 [1] C. D. Simserides, J. Phys.: Condens. Matter11(1999) 5131. [2] O. N. Makarovskii, L. Smr\u{c}ka, P. Va\u{s}ek, T. Jungwirth, M. Cukr and L. Jansen, Phys. Rev. B 62 (2000) 10908. [3] H. Ohno, J. Magn. Magn. Mater. 200 (1999) 110 ; ibid. 242-245 (2002) 105. [4] S. P. Hong, K. S. Yi, J. J. Quinn, Phys. Rev. B {\bf 61} (2000) 13745. [5] B. Lee, T. Jungwirth, A. H. MacDonald, Phys. Rev. B {\bf 61} (2000) 15606. [6] H. J. Kim and K. S. Yi, Phys. Rev. B {\bf 65} (2002) 193310. [7] C. Simserides, to be published in Physica E. [8] H. Venghaus, Phys. Rev. B {\bf 19} (1979) 3071 ; S. Adachi and T. Taguchi, Phys. Rev. B 43 (1991) 9569. [9] C. E. Shannon, Bell Syst. Tech. J. {\bf 27} (1948) 379. [10] $N = \Gamma \sum_{i,\sigma} \int_{-\infty}^{+\infty} \! dk_x I$, $S = -k_B \Gamma \sum_{i,\sigma} \int_{-\infty}^{+\infty} \! dk_x K$, $U = \Gamma \sum_{i,\sigma}\int_{-\infty}^{+\infty} \! dk_x [E_{i,\sigma}(k_x) I + J]$. $\Gamma = \frac {A \sqrt{2m^*}}{4 \pi^2 \hbar}$. $I = \int_{0}^{+\infty} \! \frac {da}{\sqrt{a}} \Pi$, $J = \int_{0}^{+\infty} \! da \sqrt{a} \Pi$, $K = \int_{0}^{+\infty} \! \frac {da}{\sqrt{a}} \Pi ln\Pi$, $\Pi = (1+exp(\frac{a+E_{i,\sigma}(k_x)-\mu}{k_B T}))^{-1}$. [11] M. S. Salib, G. Kioseoglou, H. C. Chang, H. Luo, A. Petrou, M. Dobrowolska, J. K. Furdyna, A. Twardowski, Phys. Rev. B {\bf 57} (1998) 6278. [12] W. Heimbrodt, L. Gridneva, M. Happ, N. Hoffmann, M. Rabe, and F. Henneberger, Phys. Rev. B {\bf 58} (1998) 1162. [13] M. Syed, G. L. Yang, J. K. Furdyna, M. Dobrowolska, S. Lee, and L. R. Ram-Mohan,Phys. Rev. B {\bf 66} (2002) 075213. [14] S. Lee, M. Dobrowolska, J. K. Furdyna, and L. R. Ram-Mohan, Phys. Rev. B {\bf 61} (2000) 2120.

Bibliography 2 [1] H. Ohno, J. Magn. Magn. Mater. (2004) in press ; J. Crystal Growth 251, 285 (2003). [2] M. Syed, G. L. Yang, J. K. Furdyna, et al, Phys. Rev. B 66, 075213 (2002). [3] S. Lee, M. Dobrowolska, J. K. Furdyna, and L. R. Ram-Mohan, Phys. Rev. B 61, 2120 (2000). [4] C. Simserides, J. Comput. Electron. 2, 459 (2003); Phys. Rev. B 69, 113302 (2004). [5] S. P. Hong, K. S. Yi, J. J. Quinn, Phys. Rev. B 61, 13745 (2000). [6] H. J. Kim and K. S. Yi, Phys. Rev. B 65, 193310 (2002). [7] C. Simserides, Physica E 21, 956 (2004). [8] H.Venghaus, Phys. Rev. B 19, 3071 (1979). [9] H. W. Hölscher, A. Nöthe and Ch. Uihlein, Phys. Rev. B 31, 2379 (1985). [10] B. Lee, T. Jungwirth, A. H. MacDonald, Phys. Rev. B 61, 15606 (2000). [11] L. Brey and F. Guinea, Phys. Rev. Lett. 85, 2384 (2000). [12] For holes, the value Jpd = 0.15 eV nm3, is commonly used [10,11]. ZnSe has a sphalerite type structure and the lattice constant is 0.567 nm. Hence, -Jsp-d ~ 12 10-3 eV nm3.

Acknowledgments Many thanks to Prof. G. P. Triberis Prof. J. J. Quinn Prof. Kyung-Soo Yi

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Landau Levels DOS

Spin Polarization, to be continued … ● spin-polarization 30 nm ● comparison 10 nm, 30 nm, 60 nm We keep N = constant ! ● spin-polarization 60 nm

Spin Polarization – Non homogeneous spin-splitting ● non-homogeneous spin-splitting, 30 nm

Spin Polarization – Non homogeneous spin-splitting ● non-homogeneous spin-splitting, 60 nm

-ln|ε-Ei| n(ε) DETAILS… quasi 2DEG DOS modification under in-plane B LimitB → 0, Ei(kx) = Ei+ ħ2kx2/(2m*). DOS recovers simple famous 2DEG form • Sometimes this step-like DOS may become a stereotype, although even e.g. in the excellent old review [AFS] the authors pointed out that “for more complex energy spectra” - than the simple parabola – “the density of states must generally be found numerically”. At that time most of the calculations referred to parabolic bands and the in-plane magnetic field was treated as a perturbation which gave a few percent correction in the effective mass. This is one of the two asymptotic limits of the present case. The need to understand and calculate self-consistently the dispersion of a quasi 2DEG in the general case of interplay between spatial and magnetic localization, when the system is subjected to an in-plane magnetic field, can be justified in [SIMS] and [MAKAR] and in the references therein. Nice calculations of the DOS under in-plane magnetic field can be found in Lyo’s paper [LYO], in a tight-binding approach for narrow double quantum wells. The crucial features of the present DOS, i.e. the van Hove singularities, are not - in general - simple saddle points [1] because the Ei(kx), as we approach the critical points, are not of the form -akx2, a > 0. Simple analytical models are insufficient to explain e.g. the magnetoresistance and have to be replaced by self-consistent calculations in the case of wider quantum wells [SIMS,MAKAR]. Limit simple saddle point, Ei(kx) = Ei – ħ2kx2/(2n*), (n* > 0). DOS diverges logarithmically

Enhanced electron spin-splitting DETAILS

Detailed Equations

Spin Polarization For conduction band electrons Ns = Ns,up + Ns,down(free carrier 2D concentration)

Spin-subband populations– Depopulation ● choose the parameters so that only spin-down electrons survive or ● exploit the depopulation of the higher subbands to eliminate spin-up electrons

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