FD SOI MOSFETs with a compact model for floating body effects

Solid-State Electronics 47 (2003) 1909–1915 www.elsevier.com/locate/sse

A unified I–V model for PD/FD SOI MOSFETs with a compact model for floating body effects Sara Bolouki a, Mahnaz Maddah a, Ali Afzali-Kusha

a,*

, Mahmoud El Nokali

b

a

b

Department of Electrical and Computer Engineering, Faculty of Engineering, University of Tehran, North Kargar Avenue, P.O. Box 14395/515, Tehran, Iran Department of Electrical Engineering, University of Pittsburgh, 440 Benedum Hall, Pittsburgh, PA 15261, USA Received 19 July 2002; received in revised form 29 May 2003; accepted 16 June 2003

Abstract In this paper, a unified analytical I–V model for silicon-on-insulator (SOI) MOSFET is presented. The model is valid for possible transitions between partially depleted and fully depleted modes during the transistor operation. It is based on a non-pinned surface potential approach that is valid for all regions of operation. Small geometry effects such as channel length modulation and high field mobility effects are also included. It also considers the self-heating effect, which is important for complete modeling of SOI devices. To include the floating body effect, the parasitic current in each mode of operation is modeled with a proper formulation while a smoothing function is invoked for the transition between the operation modes. A comparison between the model and the experimental results shows good agreement over a wide range of drain and gate voltages. Ó 2003 Elsevier Ltd. All rights reserved. Keywords: SOI MOSFETs; Unified model; Body effect; Parasitic BJT current; Fully depleted; Partially depleted

1. Introduction Silicon-on-insulator (SOI) MOSFETs switch signals faster, run at lower voltages and are much less vulnerable to signal noise from background cosmic ray particles. Since on an SOI wafer each transistor is isolated from its neighbor by a complete layer of silicon dioxide, they are immune to ‘‘latch-up’’ problems and can be spaced closer together than transistors built on bulk silicon wafers. This results in smaller IC devices and more chips per wafer. MOS transistors fabricated in SOI technologies have relatively thin body regions which are isolated from the Si substrate, as depicted in Fig. 1. During normal device operation, this region is either

*

Corresponding author. Tel.: +98-21-802-0403; fax: +98-21877-8690. E-mail addresses: [email protected] (S. Bolouki), [email protected] (M. Maddah), [email protected] (A. AfzaliKusha), [email protected] (M. El Nokali).

fully- or partially depleted from majority carriers. The amount of depletion is a function of the applied biases, the silicon film thickness, and doping concentration. Depending on the silicon film thickness, a transistor is considered an fully depleted (FD) or a partially depleted (PD) device. Compact I–V models for circuit simulations have been developed for the FD operation mode (see, e.g., [3–6]) and for the PD operation mode (see, e.g., [1,2,7,8]). A practical device may, however, go through transitions between FD and PD modes. For example, an FD device becomes PD when the gate bias approaches the flat-band voltage [9]. This may occur during the read/write operation of SOI SRAM cells, if the pass transistors are biased into accumulation. Similarly, a short-channel PD device may become FD under high enough applied gate and/or drain biases. An accurate model therefore must take into account the transitions between FD and PD modes of operation [9]. Two unified approaches have been published in the literature to deal with this modeling problem [9,10]. In [9], the mode of operation is not known a priori and hence

0038-1101/$ - see front matter Ó 2003 Elsevier Ltd. All rights reserved. doi:10.1016/S0038-1101(03)00259-4

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This paper organized as follows: In Section 2, we discuss how to determine the operation mode and the front surface potential. The modeling of the drain current is given in Section 3. The results and discussion are presented in Section 4 while Section 5 contains the summary.

2. Operation mode and surface potential

Fig. 1. The cross-section of an SOI MOSFET.

to calculate the drain current, a numerical technique with an iterative procedure is employed to determine the operation mode and calculate the front surface potential. This approach is computationally expensive for circuit simulation applications. In [10], first the critical gate voltage at which the transition between the operation modes occur, is obtained. Then, the surface potential values for both PD and FD modes are calculated and by utilizing a smoothing function, a unified surface potential formula is proposed. This, however, may not be an accurate model due to the fact that the values of the front surface potential in the accumulation and the strong inversion regions are considerably different from numerical result [11]. In this work, we present a new unified I–V model for PD/FD SOI, which includes channel length modulation (CLM), self-heating, impact ionization and parasitic BJT current effects. We first obtain the switching gate voltage in terms of channel doping and SOI thickness and thus for a given gate voltage, the mode of operation is defined. Then an iterative procedure is used to extract an accurate surface potential. This method, however, is faster than the method of [9], as the mode of operation has previously been determined. Having the unified surface potential, we derive the I–V characteristics of the device. Since the formulations for the impact ionization and the parasitic BJT currents are different for PD and FD modes of operation, to have an accurate unified model, each mode of operation should use its corresponding expressions. The previous works have not considered this difference and have taken into account either PD [9] or FD [10] BJT current for their unified I–V models. In our model, the floating body effects are calculated for both modes of operation and then combined to a unified form by using a smoothing function. The simulation results show the accuracy and efficiency of the presented model.

In the modeling approach taken in this work, the front surface potential is required to calculate the drain current. As will be explained later in this section, for a more efficient calculation of the potential, the operation mode of the transistor should be known as a priori. The mode, for a given film thickness and film doping, may alternate between PD and FD when changing the (front) gate bias voltage, VGF (the source is assumed to be at zero potential). To determine the gate voltage at which this mode change occurs, a critical gate voltage, VGFD , is defined [10]. When VGF is larger than VGFD , the entire film thickness becomes depleted and the device operates in FD mode. For lower gate voltages, just part of the film thickness is depleted and a floating body exits between the depleted part and the back oxide leading to the PD operation mode. Solving the 2-D PoissonÕs equation, one can obtain the critical gate voltage, VGFD , as VGFD ¼

qNch tsi2 tsi þ VFf
Vt Cd es es VGFD
ðVT
DVT Þ
gf Vcs  exp ; gf Vt

ð1Þ

where q is the electronic charge, Nch is the substrate concentration, Vt is the thermal voltage, es is the silicon permittivity, VT is the threshold voltage, DVT is the threshold voltage reduction due to longitudinal electric field, VFf is the front flat-band voltage, tsi is the SOI film thickness, Cd is the bulk depletion capacitance, gf is a factor accounting for the reduction of the free channel charge due to the channel potential, and Vcs is the channel-source electron quasi-Fermi potential. The critical gate voltage as a function of the film doping and thickness is plotted in Fig. 2. As expected, this voltage increases by increasing the doping and the thickness of the film. The next step in calculating the drain current is to obtain the front surface potential. PoissonÕs equation and the boundary conditions at the Si/SiO2 interface are utilized to derive an implicit equation of both the front and back gate surface potentials, wsf and wsb , respectively. Integrating 1-D surface potential and applying the boundary conditions at the Si/SiO2 interface, the following implicit equation for the front and back surface potential is derived [9]:

S. Bolouki et al. / Solid-State Electronics 47 (2003) 1909–1915

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Fig. 2. The critical gate voltage, VGFD , as a function of the film thickness for different doping levels. For gate voltages higher than VGFD , the transistor operates in FD mode.


 2 1 tox 2 2
V ðV
u Þ
ðV
V
u Þ GB Fb GB Fb sf sb 2 c2 toxb ¼ Vt e
ð2/f
Vb ÞVt ðeusf =Vt
eusb =Vt Þ þ Vt ðe
usf =Vt
e
usb =Vt Þ þ usf
usb ; ð2Þ where toxf and toxb are the top and back insulator thicknesses, respectively, Vb is the body potential and VGB is the back gate voltage. Eq. (3) is then used to omit the back surface potential from the above implicit expressions of the surface potentials.  wsb ¼

0 wsf
qNch tsi2 =es

in PD mode; in FD mode:

ð3Þ

Comparing to [9], no iteration is necessary to determine the operation mode as has been determined by Eq. (1) in the proposed method. Hence, this new implicit equation is simpler compared to the equations used in [9], and can be solved using a second order Newton-RaphsonÕs method coupled with a good initial guess in about 30% less time. In Fig. 3, the front and back surface potentials as a function of the gate voltage are shown for 50 and 150 nm-thick devices. The difference between the two potentials in the PD mode is greater for a larger silicon film thickness as is predicted by (3).

3. Drain current model 3.1. Channel current model Having a unified front surface potential, the drain current and the bulk charge can be derived following the approach presented in [12]. Small geometry effects such

Fig. 3. Front and back surface potentials for (a) tsi ¼ 150 nm, (b) tsi ¼ 50 nm.

as channel length modulation (CLM) and high field mobility effects are included in the formulation. Selfheating effect, which is important for complete modeling of SOI devices, is also included in our model based on the approach of [13]. 3.2. Floating body effects SOI MOSFETs can operate with or without body contact. In body-contacted structures, the body-ties, which are typically non-ideal, consume extra area, introduce source/drain asymmetry, and add more complexity to layout and fabrication. For mainstream digital applications, floating body operation is more desirable [14]. The floating body however gives rise to a parasitic BJT current flowing in the body of the transistor. In the PD mode, a portion of the silicon film is not completely depleted while in the FD mode the whole thickness is depleted. This difference between the two modes leads to different formulations for the parasitic BJT current in the PD and FD modes of operation. For an accurate unified model, corresponding formalism should be used in each mode of operation. In the previously reported

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unified models, either the PD model [9] or the FD model [10] has been used to include the parasitic BJT current in the model. In the model proposed in this paper, we incorporate suitable models for the parasitic current in each mode of operation. In the following, first, the modeling approaches of the parasitic BJT and the impact ionization currents in PD and FD modes are described, and then a smoothing function is introduced to model the parasitic current in the transition between the modes. 3.2.1. The impact ionization and parasitic BJT effects in FD As the device is biased in the saturation region with a large lateral electric field in the inversion layer at the oxide/silicon interface, there is a channel current, Ich , which is due to the drifting of the electrons and is modeled as discussed in Section 3. In the high electric field region near the drain, the drifting electrons collide with the lattice, giving rise to the generation of electron and hole pairs. The generated electrons and holes move in the opposite direction as a result of the electric field. This results in the impact ionization current, Iii [3]. For FD devices, the parasitic BJT with its emitter at the source and its collector at the drain above the buried oxide should be also considered. A portion of the impact ionization current KIii is directed vertically toward the buried oxide owing to the vertical field. As a result, in the area above the buried oxide, accumulation of holes exists, which leads to the activation of the parasitic bipolar transistor and the flow of the emitter and collector currents, Ie and Ic , respectively. As the parasitic BJT is activated, these holes recombine with the electrons in the base region. In the parasitic bipolar device, a portion of the collector current, K 0 Ic , which is mainly composed of electrons, moves toward the high electric field region due to the vertical electric field. These electrons also collide with the lattice, and consequently generate additional electron-hole pairs increasing the impact ionization current. The total drain current, Id , is composed of the channel current, Ich , the impact ionization current, and the collector current [3]: Id ¼ Ich þ Iii þ Ic :

Icbo ¼ Wtsi

Is ¼ Ich þ ð1
KÞIii þ Ie :

Iii ¼ ðM
1ÞðIch þ K 0 Ic Þ: Here M is the multiplication factor given by [3]:  
b M
1 ¼ aðVds
VDSÞ exp ; Vds
VDS

ð8Þ

ð9Þ

where a and b are process-dependent fitting parameters. From a dc point of view, the source current should be equivalent to the drain current. Therefore, using Eqs. (5)–(8), one obtains the emitter current and the impact ionization current as [3]: Ie ¼

KðM
1Þ Ich 1
ð1 þ KK 0 ðM
1ÞÞa0 1 þ KK 0 ðM
1Þ þ Icho ; 1
ð1 þ KK 0 ðM
1ÞÞa0

ð10Þ



1
a0 Ich 1
ð1 þ KK 0 ðM
1ÞÞa0  K0 ; I þ cbo 1
ð1 þ KK 0 ðM
1ÞÞa0

Iii ¼ ðM
1Þ

ð11Þ

where a0 is a fitting parameter. Combining (5), (6), (10), (11), the total drain current is obtained as Id ¼ GIch þ HIcbo ;

ð12Þ

where G¼1þ

The last two terms on the RHS comprise the parasitic current, Ip . The collector current can be expressed in terms of the emitter current Ie :

H¼

where Icbo is the leakage current between the collector and the base with the emitter–base junction opened and is given by [4]:

ð7Þ

The impact ionization current is a function of the channel current and a portion of the collector current flowing through the high electric filed region:

and

ð5Þ

ð6Þ

Iso is the leakage current per unit crosses section in the collector–base junction and ht is a fitting parameter. The source current, Is , can be expressed as the sum of the channel current, some portion of the impact ionization current, ð1
KÞIii , and the emitter current [3]:

ð4Þ

Ic ¼ a0 Ie þ Icbo ;

Iso : 1 þ ht ðVGF
VT Þ

ðM
1Þð1
ð1
KÞa0 Þ 1
ð1 þ KK 0 ðM
1ÞÞa0

ðM
1ÞK 0 þ 1 : 1
ð1 þ KK 0 ðM
1ÞÞa0

ð13Þ

ð14Þ

3.2.2. The impact ionization and parasitic BJT effects in PD The injection in the upper depletion region of the PD mode is similar to that of the FD mode, but it is different in the underlying neutral region where we assume lowinjection conditions. The BJT transport current is hence

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modeled as consisting of components in both the depleted body and the neutral body [2]:     Vb Vb þ Ies exp ; ð15Þ Ie ¼ Ireco exp g2 Vt g1 Vt where Ireco ¼

qni Wtsi Wbe ; 2sr

ð16Þ

rffiffiffiffiffiffi 2 Dn ni Wtsi Ies ¼ q sn Nch

ð17Þ

and Vb is the body–source voltage. The ideality factors g1 and g2 are g1  1 and g2  2 [8]. In Eqs. (16) and (17) ni is the intrinsic carrier concentration, sr is the recombination lifetime, sn is the electron lifetime in the neutral region, Dn is the diffusion coefficient, and Wbe is the depletion width of the body–emitter junction. The width is given by sffiffiffiffiffiffiffiffiffiffiffi 2es /b ; Wbe ¼ qNch  /b ¼ 2Vt ln

3.2.3. Compact model for the transition regime For the transition regime between the FD and PD modes, the proposed unified model makes use of the following smoothing function to calculate the parasitic current Ip . Using this function, the total current is modeled in continues form:

 Nch : ni

The body–source voltage ðVb Þ can be obtained using [10]: pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi ! 2 Ireco þ Ireco
4Ies Ich 2KT Vb ¼ : ð18Þ ln 2Ies q The lifetime parameters in (16) and (17) are important parameters affecting the leakage current of the device and hence the temperature dependencies of these parameters should be incorporated in the model. Following [7], we invoke the following relations:  sn ¼ sn0

T 300

 sr ¼ 2sn0

2:2

T 300

ð19Þ

; 2:5 ;

ð20Þ

where sn0 is the electron lifetime at 300 K. Finally, the total generation current due to the impact ionization is expressed as Iii ffi ðM
1ÞðIch þ Ie Þ;

ð21Þ

where M is the multiplication factor given by (9). The total source and drain currents can be found from Eqs. (4) and (7). Id ¼ Ich þ Iii þ Ic :

Fig. 4. The transition between PD and FD parasitic current using the smoothing function with a ¼ 1 and b ¼ 0:2. The critical gate voltage is 1 V and the PD and FD parasitic currents are normalized to 1.2 and 1.0, respectively.

ð22Þ

Ip ¼

Ip;FD Ip;PD  þ  : VGF
VGFD GFD 1 þ a exp
bVt 1 þ a exp VGF
V bVt ð23Þ

Here a and b are fitting parameters. The parasitic current, Ip , reduces to Ip;FD ðIp;PD Þ as VGF becomes larger (smaller) than VGFD . The effect of the function on the smooth transition between the two currents, when the critical gate voltage is 1 V and the FD and PD parasitic currents are normalized to 1.0 and 1.2, respectively, is depicted in Fig. 4. The fitting parameters used for this figure are a ¼ 1 and b ¼ 0:2.

4. Results and discussion To illustrate the validity of the proposed unified model, the I–V characteristics predicted by the model have been compared with the measured dc drain characteristics of four practical devices of [9]. For the first device in which W =L ¼ 14=0:7 lm, tsi ¼ 150 nm, and Nch ¼ 4:3  1016 cm
3 , the drain current versus the drain voltages, VDS , for different values of gate voltage, VGS is shown in Fig. 5(a). In this case, the critical gate voltage is 0.53 V implying that the device operates in the PD mode for the smallest gate voltage and in the FD mode for the next five gate voltages. The characteristic with

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S. Bolouki et al. / Solid-State Electronics 47 (2003) 1909–1915

Fig. 5. The drain current versus the drain voltage for different gate voltages with (a) W =L ¼ 14=0:35 lm and tsi ¼ 150 nm; (b) W =L ¼ 14=0:7 lm and tsi ¼ 150 nm; (c) W =L ¼ 14=0:35 lm and tsi ¼ 200 nm; (d) W =L ¼ 14=0:35 lm and tsi ¼ 70 nm. Solid lines are the results predicted by the model and circles are the experimental results [9].

VGS ¼ 0:53 V, clearly reveal the well-known ‘‘kink’’ effect which shows itself as an increase in the drain current predicted by the model. Also, the effect of impact ionization at higher drain voltages is more pronounced in this device. The critical gate voltage for the second transistor is the same as in the previous case, which is due to the same silicon thickness and channel doping. Therefore, for the transistor whose I–V characteristics are given in Fig. 5(b), the device operation mode is PD for the smallest gate voltage and FD for the rest of the gate voltages. Fitting both of the devices shown in Fig. 5(a) and (b) with either an FD or PD model would be difficult, as a PD model would always show the presence of a ‘‘kink’’ and an FD model would never show a ‘‘kink’’. Devices that have a thicker and thinner tsi were also fitted to the model. Fig. 5(c) and (d) show results of fitting the model to 200 and 70 nm thick devices. The thicker tsi makes the device to be PD for the three smallest gate voltages and in the FD mode for higher voltages. This illustrates that even at relatively large tsi values, a model containing the correct transitions from

PD to FD behavior is important. The critical gate voltage is 1.57 V for this device. The thinner silicon thickness of the device in Fig. 5(d) will cause this device to behave more FD than the previously examined devices and no kink effect is present. Self-heating is increased for tsi ¼ 70 nm as expected and especially in higher VGS curves of Fig. 5(d).

5. Summary In this work, a unified I–V model for SOI MOSFETs was presented. The model is valid for both fully depleted and partially depleted modes of operation. First, a critical gate voltage was utilized to determine the operation mode of the device. Then, using the PoissonÕs equation the surface potential was calculated accurately and efficiently. Having the front surface potential, the drain current, including the channel length modulation, the velocity saturation and the self-heating effects, were calculated. The floating body effect which leads to kink effect was also included in the model. To have an ac-

S. Bolouki et al. / Solid-State Electronics 47 (2003) 1909–1915

curate model for the parasitic current due to the floating body effect, the proper formulations for each mode of operation were considered and then a function was used for a smooth transition between the two modes of operation. The results of the I–V characteristics predicted by the model showed a very good agreement with the experimental results.

[5]

[6]

[7]

Acknowledgements The co-authors from the University of Tehran acknowledge the financial support from the Research Council of the University of Tehran. The authors also appreciate Ali Khakifirooz of MIT for his kind assistance and useful discussion.

[8]

[9]

[10]

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