Patent Grant
7309887
1. Field of the Invention
In general, the present invention relates to spintronics. In particular, the present invention relates to creating a spin polarization of virtually all of the electrons in nonmagnetic semiconductors at an arbitrary spin polarization current in ferromagnetic material and at a wide range of temperatures including room temperature.
2. Description of the Related Art
The entire contents of each document listed below is expressly incorporated herein by reference:
Over the past decade, new ventures in solid state electronic devices based on both the electron density and spin of electrons has led to the development of a new field: spintronics. Spintronics is the manipulation of electron spin in solid state materials. Spintronics creates the possibilities for designing ultra-fast, low-power scalable devices and applications for quantum computing. Among the practical spintronic effects is a giant magnetoresistance (GMR) in magnetic multilayers and tunnel ferromagnet-insulator-ferromagnet (FM-I-FM) structures. Discovery of GMR in magnetic multilayers has quickly led to important applications in storage technology. GMR is a phenomenon in which a relatively small change in a magnetic field results in a large change in the resistance of the material. The phenomenon of a large tunnel magnetoresistance (TMR) of FM-I-FM structures is being studied by product development teams in many leading companies. TMR is typically observed in FM-I-FM structures made of two ferromagnetic layers of similar or different materials, separated by an insulating thin tunnel barrier I, with thickness ranging between 1.4-2 nm. The tunnel current through the structure may differ significantly depending on whether the magnetic moment is parallel (low resistance) or anti parallel (high resistance). For example, in ferromagnets such as Ni80Fe20, Co—Fe, and the like, resistance may differ by up to 50% at room temperature for parallel (low resistance) versus antiparallel (high resistance) moments on ferromagnetic electrodes.
Recently, studies have been made in regard to giant ballistic magnetoresistance of Ni nano-contacts. Ballistic magnetoresistance is observed in Ni and some other nanowires in which the typical cross-section of the nano-contacts of the nanowire is a few square nanometers. The transport in this case is through very short constriction and it is believed to be with conservation of electron momentum (ballistic transport). The change in the contact resistance can exceed 20-fold.
Of particular interest is injection of spin-polarized electrons into nonmagnetic semiconductors, because of the relatively large spin-coherence lifetime of electrons and the possibility of controlling the electron spin by external fields. The use of different ferromagnetic-semiconductor-ferromagnetic (FM-S-FM) heterostructures have recently been suggested, including those using an electric field, an external magnetic field, and a nanowire current. All the proposed spintronic devices are spin valves in which one of the ferromagnetic-semiconductor junctions works as a spin injector, and another one works as a spin polarizer (spin filter). Spin injection into nonmagnetic semiconductors (NS) holds promise both for the new generation of high-speed low-power electronic devices and quantum computing.
Relatively efficient spin injection in heterostructures with magnetic semiconductor as a spin source has been reported in {Refs. [9]}, the entire contents of which are expressly incorporated herein by reference. High enough spin injection from ferromagnets into nonmagnetic semiconductors has recently been demonstrated at low temperatures. However, the highest degree of spin polarization (the amount of electrons whose spin is coherent, or oriented the same) of injected electrons in nonmagnetic semiconductors, Pn, observed in all of existent works was less than 32% at low temperatures, and less than 10% at room temperatures. Thus far, all of the attempts to achieve higher spin polarization have faced fundamental difficulties.
The principal difficulty of the spin injection from a ferromagnetic (FM) into a nonmagnetic semiconductor is that a potential barrier (Schottky barrier) always arises in the semiconductor near the metal-semiconductor interface. Numerous experiments show that the barrier height Δ is determined by surface states forming on the interface, and is approximately (⅔) Eg, practically independently of the type of the metal. Eg is the energy band gap of the semiconductor, that is, the difference between the conduction band energy level EC and the valence band energy level EV. For example, for GaAs and Si the barrier height is equal to 0.5 eV-0.8 eV, with practically all metals, including Fe, Ni, and Co, and the barrier width, the length of the Schottky depleted layer lD, is relatively large (lD≈40 nm for doping concentration Nd≈1017 cm−3).
The amount of spin injection from FM into NS materials is determined by the current in reverse direction through the Schottky barrier, minus bias voltage applied to the FM (electron flow is directed from FM to semiconductor, and the current is directed to opposite direction). This current is usually extremely small, mainly due to the relatively large Schottky depleted layer lD and Δ>>kBT, where kB is the Boltzmann constant and T is the device temperature. In the forward-biased FM-S (ferromagnetic semiconductor) Shottky junctions, a minus-bias voltage is applied to the semiconductor, and the current can reach a large value only at a bias voltage qV close to Δ, where q is the elementary charge.
Realization of an efficient spin polarization in nonmagnetic semiconductors (NS) due to such a thermoemission current is problematic for several reasons. First, electrons in FMs with an energy F+Δ are weakly spin polarized, where F is the Fermi level. Second, according to standard theory, the thermionic current through Schottky junctions depends solely on the parameters of the semiconductor and not on the parameters of the metallic ferromagnet {13}. Therefore, the current could formally be spin-polarized in Schottky contacts. Thus, the effective spin injection in the conventional FM-S Schottky junction 100 is impossible for all practical purposes.
It has been proposed to use an ultrathin heavily doped semiconductor layer (δ-doped layer) between the FM material and a nondegenerate nonmagnetic semiconductor to increase the spin injection at room temperature, as shown in 1 nm sharply reduces the thickness of the Schottky barrier, and increases its tunneling transparency. According to {14, “EFFICIENT NONLINEAR ROOM-TEMPERATURE SPIN INJECTION FROM FERROMAGNETS INTO SEMICONDUCTORS THROUGH A MODIFIED SCHOTTKY BARRIER”, V. V. Osipov and A. M. Bratkovsky, Phys. Rev. B 70, 205312 (2004); cond-mat/0307030 (2003).}, the entire contents of which are expressly incorporated herein by reference, the thickness of the δ-doped layer, l+, should be on the order of a typical tunneling length for the barrier l+
l0 where
l0=(h2/8π2m*Δ)1/2 (1)
And m* is the effective mass of electrons in the semiconductor δ-doped layer. Moreover, the bottom of conduction band, Ec0, in the semiconductor δ-doped layer and the nonmagnetic in equilibrium should be higher than the Fermi level, Ec0>F. The semiconductor has to be nondegenerate in whole semiconductor region including the δ-doped layer, as shown in
Characteristics of all of spintronic devices improve dramatically with increase in the degree of the electron spin polarization, P.sub.n, and achieve to them, limited values when Pn=1 (100%). Moreover, a fundamental problem for quantum computing is to obtain an electron spin polarization in nonmagnetic semiconductors (NS) of P.sub.n=100% at very low temperatures, such as, T<1.degree. K.
An object of the present invention is to substantially solve at least the above problems and/or disadvantages and to provide at least the advantages described below. Accordingly, it is an object of the present invention to provide a spin polarizer comprising a semiconductor, a ferromagnetic layer, and a thin degenerate semiconductor layer formed between the ferromagnetic layer and the semiconductor which is more highly doped than the semiconductor layer. The concentration of shallow donors N.sub.d.sup.+ in this layer satisfies the condition: 4.pi.N.sub.d.sup.+a.sub.B.sup.3/3>1, where a.sub.B is Borh radius of the shallow donor; the thickness, l, of this layer satisfies a condition: 6l.sub.0.ltoreq.2l.sub.D.ltoreq.l<<L.sub.S.sup.+wherein:
l.sub.0 represents a tunneling length for a Schottky barrier between the ferromagnetic layer and the thin degenerate semiconductor layer given by the equation l.sub.0=(h.sup.2/8.pi..sup.2m*.DELTA.).sup.1/2
l.sub.D represents a thickness of the Schottky barrier given by l.sub.D=(2.epsilon..epsilon..sub.0.DELTA./q.sup.2N.sub.d.sup.+).sup.1/2 wherein .epsilon..sub.0 is the permittivity of free space, .epsilon. is the relative permittivity of the thin degenerate semiconductor layer, q>0 is the elementary charge, and N.sub.d.sup.+is the concentration of shallow donors in the highly doped degenerate semiconductor layer, .DELTA. is a height of the Schottky barrier; and
L.sub.S.sup.+ represents a length of electron spin relaxation in the thin degenerate semiconductor layer given by the L.sub.S.sup.+={square root over (D.sup.+.tau..sub.s.sup.+)} where D.sup.+ and .tau..sub.S.sup.+ are diffusion coefficient and time of spin coherence of electrons in the thin degenerate semiconductor n.sup.+-S layer, respectively.
According to an embodiment of the present invention, efficient spin polarizer of electrons in nonmagnetic semiconductors that are ferromagnetic-semiconductor heterostructures comprises a magnetic semiconductor layer or ferromagnetic metal layer, a nonmagnetic semiconductor, and a thin high doped degenerate semiconductor layer, satisfying certain requirements and situated between the ferromagnetic layer and the nonmagnetic semiconductor. The spin polarizer ensures spin polarization of electrons in the nonmagnetic semiconductor at substantially 100% near the ferromagnetic-semiconductor junctions at temperatures ranging from very low temperatures (T<1° K.) to room temperatures.
The various objects, advantages and novel features of the present invention will be best understood by reference to the detailed description of the preferred embodiments that follow, when read in conjunction with the accompanying drawings, in which:
Throughout the drawings, like reference numbers will be understood to refer to like elements, features and structures.
Several embodiments of the present invention will now be described in detail with reference to the annexed drawings. In the following description, detailed descriptions of known functions and configurations incorporated herein have been omitted for conciseness and clarity.
For simplicity and illustrative purposes, the principles of the present invention are described by referring mainly to exemplary embodiments thereof. In the following description, numerous specific details are set forth in order to provide a thorough understanding of the present invention. Those with skill in the art will recognize that various changes and modifications can be made to the examples provided herein without departing from the scope and spirit of the invention.
The exemplary embodiments of the present invention are a spin polarizer that in the general case, can contain a ferromagnetic-semiconductor (FM-S) junction ensuring a spin polarization of current, PJ, near a boundary with a nonmagnetic semiconductor (NS) depending relatively weakly on the current. The spin polarizer can create spin polarization of electrons virtually to 100%, inside some areas of the nonmagnetic semiconductor (NS) near the FM-S junction. This occurs when the electrons drift under the action of a strong enough electrical field from the NS into the FM even in the case when PJ is relatively small (Pj can be even ˜5%-15%).
The FM layer 330 can be formed from various magnetic materials, preferably Ni, Fe and Co, as well as various magnetic alloys, which can include one or a combination of Fe, Co, and Ni. The NS layer 310 can be formed from various semiconductor materials including any one of Si, GaAs, ZnTe, GaSb, GaP, Ge, InAs, CdSe, InP, InSb, CdTe, CdS, ZnS, ZnSe, AlP, AlAs, AlSb, and also alloys of these materials. In an exemplary embodiment of the present invention, the semiconductor 310 can be formed from semiconductor materials with relatively large electron spin relaxation time, Ls. These include, for example GaAlAs, InAs, ZnSe and ZnCdSe among others. The NS layer 310 can be negatively doped. Negative dopant metals that can be used include P, As, Sb for Si and Ge, and Ge, Se, Te, Si, Pb and Sn for GaAs.
The high doped semiconductor, the n+-S′ layer 320, may be formed from various semiconductor materials having an energy bandgap narrower than that for the semiconductor 310. For example, the n-dopant metals may be P, As, Sb for Si and Ge, and Ge, Se, Te, Si, Pb and Sn for GaAs. The thin degenerate semiconductor layer 320 may be used to increase tunneling transparency of the Schottky barrier for electrons with energies E>F and to ensure a spin polarization of current near the FM-n+-S′ junction weakly depending on the current. The parameters of the n+-S′ layer 320 should be satisfied by certain conditions listed below.
The FM-n+-S′ junction shown in
The currents of electrons with spin σ=↑, ↓ in NS are given by the following equations (See, for example, Ref's [7], [8], [16], and [17]):
Jσ=qμnσE+qD(dnσ/dx), (2)
dJσ/dx=qδnσ/τs, (3)
where D, μ and τs are the diffusion constant, mobility and spin-coherence lifetime of the electrons, respectively, and E the electric field. From conditions of continuity of the total current J(x)=J↑+J↓=const and quasineutrality
n(x)=n↑+n↓=nS (4)
it follows that
E(x)=J/qμnS=const (5)
and
δn↑(x)=n↑−nS/2=−δn↓(x) (6)
where nS is total electron density in the semiconductor 310. From Equations (2) through (6), it follows that spin density in the semiconductor 310, that is, for x≧l can be written as:
δn↑(x)=δn↑lexp[−(x−l)/L]=nl(nS/2)exp[−(x−l)/L] (7)
where
L=(1/2){[(LE)2+(2LS)2]1/2−(±)LE}==LS{[(1+(J/2JS)2]1/2−J/2JS}, (8)
LS=√{square root over (DτS)} and LE=μτs|E|=Ls|J|/JS (9)
are the diffusion and drift lengths of electron spin, respectively; the index ±corresponds to the forward, J>0, and reverse bias voltage, J<0, respectively. Here we introduce a typical current:
JS≡qnSD/Ls=qnSLs/τs (10)
and spin polarization of electrons in the semiconductor 310 (for x≧l)
Pn=(δn↑−δn↓)/nS=Pnlexp[−(x−l)/L], (11)
where
Pnl=Pnl=Pn(l)=(δn↑l−δn↓l)/nS=2δn↑l/nS (12)
is spin polarization of electrons at the boundary of the semiconductor 310 (at the point x=l,
J↑l,↓l=(J/2)≅(JS/2)(L/LS)Pnl (13)
From Equation (13) it follows that the relationship between the spin polarization of current
PJl=(J↑l−J↓l)/(J↑l+J↓l)/=(J↑l−J↓l)/J (14)
and the spin polarization of electrons, Pnl, at the point x=1
Pnl=−PJl(JLs)/(JSL) (15)
(PJl is also called spin injection coefficient of the FM-n±S′ contact.)
According to Equation (8) L=Ls at J<<JS therefore, as expected Pnl θ-J at PJl>0 (in certain cases PJl<0). In the reversed-biased FM-S junctions, J<0, according to (15) the value of PJl=2δn↑l/nS>0 (δn↑l>0), that is, the accumulation of electrons with spin σ=↑ is realized in the semiconductor 310 near the boundary with the FM-S junction. At |J|>JS the spin penetration depth L (8) increases with current J and Pnl→PJl at |J|>>JS. Thus, the spin polarization of electrons in the semiconductor injected from FM can achieve spin polarization of current in the reversed-biased FM-S junction.
Another situation is realized in the forward-biased FM-S junctions, J>0, when electrons drift under the action of the electric field from the semiconductor into FM. Here the value δn↑l<0 and δn↓l>0 at PJl>0, that is, electrons with spin σ=↑ are extracted from NS and electrons with spin σ=↓ are accumulated in the NS. The opposite situation is realized at PJl<0. At J>JS the spin penetration depth L (Equation (8)) decreases with current J and according to Equation (15) |Pnl| rises to 1 (100%) at:
J=Jt≡JS[|PJl/(1+|PJl|)]−1/2 (16)
when
L=Lt≡Ls[|PJl|/(1+|PJl|)]1/2 (17)
Thus, spin polarization of electrons in the semiconductor near the forward-biased FM-S junction achieves 100% even at relatively small spin polarization of current, PJl, in the FM-S junction. This is valid both for a degenerate semiconductor 310, as shown in
|Pnl|=1 at J=Jt. (18)
The one requirement is a weak dependence of the spin polarization of current in the FM-S junction (or spin injection coefficient) PJl, on the current J. We note that when the current J>Jt the value |Pnl|=2|δn↑l|/nS=|2n↑l−nS|/nS becomes formally more than 1, that is, the density of electrons n↑l or n↓l with spin σ=↑ or σ=↓ at the point x=l becomes more than the total electron density nS. This means that the condition of quasineutrality (4) is violated and a negative space charge arises near the boundary of the semiconductor with the FM-S junction, x=l in
Thus, embodiments of the present invention provide FM-S junctions which have the spin polarization of P.sub.Jl, weakly depending on the current J in the junctions. This requirement is valid, in particular, for the FM-n+-S′ junction shown in
Because of the very high density of electrons in the FM metal 330 and the degenerate semiconductor layer 320 the tunneling current through the FM-n+-S′ layer is determined by the well-known formula (See, for example, Ref.'s [18] and [19]): J .sigma.0=qh.times..intg.dE.function.[f.function.(E-F-eV)-f.function.(E-F)].times..intg.d2.times.k(2.times..pi.)2.times.T.sigma.(22 ) where k.sub.II is the component of the wave vector k parallel to the FM-S interface, f(E-F) the Fermi function, V is a bias voltage and T.sub.sigma is the tunneling transmission probability of the FM-n+-S′ junction.
The value of Tσ may be estimated in a semiclassical approximation (WKB) (See, for example, Ref.'s [14] and [15]) as follows:
Taking into account that the velocity νx is real only at E>Ec0+qV+EII and also a property of the Fermi function at kBT<<μ+s one can find from Equations (22) and (23) that the spin current at the FM-n+-S′ interface, at the point x=0 in
wherein νσ0=νσ(F+qV) and νμ=(3μS+/m*)1/2 are velocities of electrons with spin σ and the energies E=F+qV and μs+ in FM and n+-S′ layers 330 and 320, respectively; νt0=(2(Δ−qV)/m*. From Equations (24)-(26) it follows that the total current J=J↑0+J↓0 is equal to:
J=J0dσ[1−(1−qV/μs+)5/2], (27)
wherein
J0=dqns+νμα0Tt(V) (28)
d0=(d↑+d↓) (28)
and the spin polarization of current, Pj0, at the FM-n+-S′ interface is equal to:
The expression for P.sub.j0=P.sub.F coincides with that for spin polarization of current in usual tunneling FM-I-FM structures [18,19]. One can see that P.sub.j0.sup.--=P.sub.F does not depend on the current. When the thickness of the n+-S′ layer l<<L.sub.S.sup.+, where L.sub.S.sup.+=(D.sup.+.tau..sub.S.sup.+).sup.1/2 and .tau..sub.S.sup.+ are the length and relaxation time of electron spin in the n+-S′ layer, but l>l.sub.D, spin currents in the n+-S′ layer do not change practically, therefore we can put J.sub..sigma.0=J.sub..sigma.l and P.sub.j0=P.sub.Jl where P.sub.Jl is the spin polarization of the current at the boundary between the n+-S′ layer 320 and the n-S region 310. By analogy with Equation (13) the spin current in the n+-S′ layer is equal to
J↑l,↓l=(J/2)≅(JS+/2)P+nl (30)
wherein P+nl=2δn+↑l/n+S is the spin polarization of electrons in the n+-S′ layer changing with the typical length L.sub.S.sup.+ and the typical current is:
JS+=qD+n+S/LS+, (31)
where n+S is the electron density in the degenerated region of the n+-S′ layer.
Therefore for arbitrary l the value of P.sub.Jl=P.sub.F/cos h(l/L.sub.S.sup.+). Thus, P.sub.JI.apprxeq.P.sub.F when l<<L.sub.S.sup.+ in the considered FM-n.sup.+-n-S heterostructure shown in
lLS(β+S/βS)[(1+PF)/PF), but l>3lD. (32)
The larger l is, the less P.sub.Jl is, and the greater the threshold current J.sub.t (Equation (15)) is.
The conditions of the 100% spin polarization electrons are JS+>>J0>>JS. Taking into account Equations (10), (28) and (31) these conditions can be written as:
wherein the parameter Tt(μS+) is equal to
The conditions of Equations (19) and (33)-(35) can be rewritten as:
where lD is given by Equation (20), that is, lD is determined by nS+=Nd+.
The condition of Equations (33)-(36) determine the requirements of the electron densities nS=Nd and nS+=Nd+ in the n+-S′ layer 320 and the n-semiconductor 310, the thickness lD of the Schottky depletion layer of FM-n+-S′ junction, the thickness l of the n+-S′ layer and also the value of a jump Δ0 of the bottom of the conduction band, Ec(x), at the boundary of the n±S′ layer 320 and the semiconductor 310, Δ0=(Ec0−Ec0+) both for the case of a degenerate semiconductor 310 as shown in
The ferromagnetic layer 430 may be formed from various magnetic materials, preferably Ni, Fe and Co, as well as various magnetic alloys, which may include one or a combination of Fe, Co, Ni. The semiconductor 410 may be formed from various nonmagnetic semiconductor materials including Si, GaAs, ZnTe, GaSb, GaP, Ge, InAs, CdSe, InP, InSb, CdTe, CdS, ZnS, ZnSe, AlP, AlAs, AlSb and also alloys of these materials. In general, it is preferred that the semiconductor 410 be formed from semiconductor materials with relatively large electron spin relaxation time, Ls, for example GaAlAs, InAs, ZnSe and ZnCdSe. The semiconductor 410 can be negatively doped.
A spin polarization close to 100% in the FM-n.sup.+-p.sup.+-n-S heterostructure shown in
lD≦lp≦lLS± (38)
and
Nalp2≈2εε0(Ec0−Ec0+)/q2 (39)
wherein E.sub.c0 and E.sub.c0.sup.+ are the bottoms of the conduction band in the n-S region 410 and the part of the n.sup.+-S layer 420 corresponding to the degenerate semiconductor, where lD<x<(l−lp), in
All of the above described structures and conditions are also valid for a negatively doped semiconductor. In this case the words electrons, donor and acceptor should be substituted for the words holes, acceptor and donor, respectively, and the n-, n+- and p-semiconductor regions should be substituted for p-, p+- and n-semiconductor regions.
Different spintronic devices based on ferromagnetic-semiconductor-ferromagnetic (FM-S-FM) structures have been suggested, including those using an electric field [5,6], external magnetic field [7], and a nanowire current [8] to control an electron spin. All of these devices are spin valves where one of FM-S junctions works as a spin injector and another one as a spin filter. The spin filter efficiently admits electrons with a certain spin projection and efficiently reflects electrons with the opposite spin. The spin polarizer and the FM-n+-n-S heterostructures shown in the
One of possible variant of use of the spin polarizer and the FM-n+-n-S heterostructures is shown in
The present invention has been described with reference to an exemplary embodiment. However, it will be readily apparent to those skilled in the art that it is possible to embody the invention in specific forms other than that of the exemplary embodiment described above. This may be done without departing from the spirit and scope of the invention. The exemplary embodiment is merely illustrative and should not be considered restrictive in any way. The scope of the invention is given by the appended claims, rather than the preceding description, and all variations and equivalents that fall within the range of the claims are intended to be embraced therein.
| Number | Name | Date | Kind |
|---|---|---|---|
| 20050006682 | Bae et al. | Jan 2005 | A1 |
| Number | Date | Country | |
|---|---|---|---|
| 20060197128 A1 | Sep 2006 | US |
