Electronic systems, such as cellular telephones, magnetic disk drives and speech recognition systems [ 1 ], require an interface with the external world. Since the world is analog in nature all these kind of electronic systems require analog circuits. In the analog design automation (ADA) tools, new techniques need to be developed to improve the design of integrated circuits (ICs), in order to reduce the costs of the production, to shorten the time to market [ 2 ], and to enhance the quality and optimality of integrated circuits.

Different kinds of active elements that are used in analog signal processing applications, such as to design chaotic oscillators [ 3 ], to design current conveyors [ 4 ], to design filters [ 5 ] and to develop secure communication systems [ 6 ], are designed by using unity-gain cells (UGCs) such as Voltage Followers (VFs) [ 7 ]. In order to improve the performance of these applications, it is needed to compute optimal sizes of the VFs [ 8 ]. In [ 8 ][ 9 ][ 10 ][ 11 ][ 12 ] some ADA procedures to automate the sizing process are given, but an open problem remains related to the selection of an optimal sized topology whose parameters such as gain, bandwidth (BW), input and output impedances, among others, need to be classified.

The automatic selection of an optimum sized VF topology is addressed in this paper. Given a VF its gain is optimized to be closer to unity and with the large BW. In this problem there are two linguistic variables: ”closer to unity” and ”large”, then the fuzzy sets are well suited to represent the behavior of the VF under several values of its parameters, such as width (W) and length (L) of the transistors, and current bias, since the fuzzy sets allow formalizing linguistic sentences to express ideas that are subjective and which can be interpreted in different ways by various individuals [ 13 ]. Then, defining appropriate membership functions it is possible to construct two fuzzy sets: a fuzzy set to represent the higher BWs and a fuzzy set to represent the gains closer to unity.

In this manner, the proposed approach finds the optimum sizes of the VF where both conditions (higher BW and gain closer to unity) are satisfied: first selecting the parameters of the VF such that the gain is far from the maximum gain in certain distance, that is defined by a threshold, and such that the gain is greater than certain lower bound; second defining the fuzzy sets; then computing the intersection of both fuzzy sets that takes the minimum between both membership values; finally, taking the maximum of intersection result. The threshold and the lower bound, as well as the parameter values of the VF, are defined by the circuit design expert. 2

Let X be the universe set of all sizes combinations of a VF and their performances. Since in this paper a VF is characterized by its length and width, and the current bias used, it is defined a conventional set on X as follows: Let P be a set of parameters defined by [ 14 ] [ 15 ]

P = {x |x = {L(μm), I(μA), W (μm) }} where L is the length of all transistors, W is the width of each transistor, and I is the current bias. Each x associates sizes to perform a SPICE simulation, which results are introduced in two fuzzy sets defined on X as follows: The BWs are collected in A, the fuzzy set of large bandwidths, defined as e x is a large bandwidth and μA(x) = e

x max bandwidth ) , , (1) A = e ( μA(x) ex B = e ( μB (x)

ex where max bandwidth is the maximum BW of all P sizes and the membership value of each BW, μA(x), depends on how much its value is large. The gains are collected in B, the fuezzy set of gains close to unity, defined as e ) x is a gain close to unity and μB(x) = x , (2) e where the membership value of each gain, μB(x), depends on how much its value is closer to unity. Then, there is a corresponedence among elements in P , A and B. e e The proposed method allows to the circuit design expert to define the P set through the definition of L, I and W values of a VF, and the expert can request that the gain obtained from SPICE simulation is greater than a certain lower bound, low bou, then if

gain ≥ low bou, the gain, that is represented with an element of B, along with the corresponding elements in P and A are desired values, else ethey are eliminated. Also, the expert may request thaet the gain is far from maximum gain in certain desired distance given through a threshold, defined as thr = max gain − des dis×Δgain , 100 where max gain is the maximum gain of all P configurations, des dis is the desired distance from maximum gain (measured in a percentage), and Δgain = max gain − min gain, where min gain is the minimum gain of all P configurations. Then if gain ≥ thr, (3) (4) the gain (represented with an element of B) along with the corresponding elements in P and A are desired values, else tehey are elminated.

Once the lowebou and thr are defined, and the gains (with the corresponding bandwidths and parameters) are selected under the two restrictions (3) and (4), the proposed method builds the fuzzy sets A and B in accordance with (1) and (2) and computes the intersection of these feuzzy seets as follows

C = A \ B = ( μC (x) ex

) μC(x) = min{μA(x), μB(x)} .

e e e e e e In this case, as A is the fuzzy set of large bandwidth and B is the fuzzy set of gains close to unity, tehe intersection of A and B represents thee set of P configurations where the gain is close to unity aned the BeW is large. Then the optimum sizes are computed by OptV F = max nμC (x)o, where the correspondient P element of this maximum is the optimum sieze of the given VF. All these steps to compute the optimum sizes of a VF automatically are collected in the following algorithm. ALGORITHM FuzzySetIntersecMethod IN: VF:file;Lvalues,Ivalues,Wvalues:Set;desDis:int;lowBou:real OUT: optLvalue,optIvalue,optWvalue,optGain,optBandwidth:real BEGIN /* Define P set of the VF parameters */ t = 1 FOR i = 1, 2, ..., cardinality of Lvalues

FOR j = 1, 2, ..., cardinality of Ivalues

FOR k = 1, 2, ..., cardinality of Wvalues BEGIN

P(t) = [Lvalues(i), Ivalues(j), Wvalues(k)] t = t+1

END /* Collect gains and bandwidths using Montecarlo simulation */ FOR i = 1, 2, ..., cardinality of P BEGIN

[GAINS(i), BANDWIDTH(i)] = SPICE(VF with P(i) parameters)

This algorithm allows to compute the optimum parameters of a VF such that its bandwidth is large and its gain is close to unity at the same time through a single operation (the fuzzy sets intersection), based on the proper definition of the fuzzy sets, meanwhile other methods compute the optimum using different stages. For example, the approach [ 8 ] takes a few VF parameters to simulate the VF, first computing the VF parameters where the gains are close to unity, then selecting from these computed gains the larger bandwidth. 3

In Fig. 1 are shown the VFs used to compute their optimum sizes by using SPICE and under several P set, des dis and low bou values. These VFs are synthesized by P–MOSFETs and N–MOSFETs [ 9 ]. For each VF of Fig. 1 the circuit design expert has defined the following P set

P = {L, I, {WA, WB, WC}} , (5) by the proposed fuzzy set intersection where L = {0.4, 0.7, 1.0} μm, I = {10, 20, ..., 100} μA, WA = {10, 20, ..., 100} μm, WB = {300, 310, ..., 400} μm, and WC = {600, 610, ..., 700} μm. Then, the VFs were sized using three different lengths (L), ten different currents for biasing (I) and thirty different VF widths (WA, WB, WC ). This leads us to 4950 combinations in sizing when the P–MOSFETs widths are greater than or equal to the N–MOSFETs widths, that means that WM1,M2 ≥ WM3,M4 for VF of Fig. 1(a), WM1,M4 ≥ WM2,M3 for VF of Fig. 1(b), and WM3,M4 ≥ WM1,M2 for VFs of Fig. 1(c) and Fig. 1(d).

The results obtained with the proposed method to size the VFs of Fig. 1, under (5) parameters, are given in Fig. 2–3. In all cases, the optimums computed by the proposed method are marked under several des dis values, des dis = {2%, 5%, 10%, 20%}, and low bou = 0.5. It is easy to see that the proposed method gives good optimums applying the fuzzy sets intersection, sice although there are some results where the BW is greater, the method has selected the sizes–combinations where the BW is greater but AV is closer to unity.

Some details of the results obtained in each graphic of Fig. 2–3 are given in Table 1. For VF of Fig. 1(a), good results are given when des dis = {5%, 10%} (Av=0.9723, BW =69.98M Hz and Av=0.9526, BW =86.1M Hz, respectively). Meanwhile a good result is obtained for VF of Fig. 1(b) with des dis = 20%, where the bandwidth is almost larger among all results (BW =248.3M Hz) and the gain is good enough (Av=0.9891). When des dis = {5%, 10%} good optimums are obtained (BW =199.5 M Hz, Av=0.9942 and BW =201.8M Hz, Av= 0.9935, respectively).

A good behavior for VF of Fig. 1(c) in Table 1 is provided when des dis = 10%, where Av=0.9684 and BW =260M Hz. However, an acceptable result is given when des dis = 20% (Av=0.9192, BW =363.1M Hz). Finally, a good result is obtained for VF of Fig. 1(d) when des dis is not used, since the gain is good enough, Av=0.9831, and BW =393.6M Hz is largest of all experiment results.

VF of des dis L I1,2 Fig. 1(a) without 0.4 100 5% 1 100 10% 0.7 100 20% 0.7 100 des dis L

I1,2 Fig. 1(b) without 0.4 100 5% 1 100 10% 1 100 20% 0.7 100 des dis L

I1,2,3,4 Fig. 1(c) without 0.4 100 5% 0.7 100 10% 0.7 100 20% 0.4 100 des dis L I1,2,3,4 Fig. 1(d) withou 0.4 100 5% 1 100 10% 1 100 20% 0.7 100 An automatic method based on intersection of fuzzy sets has been introduced to solve the open problem of sizing Voltage Followers (VFs), unity–gain cells that are used to design active elements used in several analog signal processing applications. The proposed method formalize the representation of the behavior of VFs under several values of its parameters (width and length of the MOSFET, and current bias) using two fuzzy sets: a fuzzy set to represent the large bandwidths and a fuzzy set to represent the gains close to unity of a VF. The bandwidths and the gains are obtanied of Monte Carlo simulations using several combinations and varying the curren biases, the widths and the length of the MOSFETs, that are parameters defined by the circuit design expert. Through the fuzzy sets intersection the optimum zised of a given VF is computed, since the intersection is a natural manner to represent the VF configurations where the gain is close to unity and the bandwidth is large at the same time. The successful of the results obtained with the intersection, as has been seen in previous section, lies in the definition of the fuzzy sets and their appropriate membership functions, that are the key of the proposed method. The expert can select a desired distance from the maximum gain obtained from SPICE simulations to compute the optimum VF behavior. Also, in order to eliminate non–significant results obtained from Monte Carlo simulations, the proposed method allows to expert to define a lower bound to gain. These additional restrictions help to compute several optimums that can be conveniently selected by the expert. Acknowledgments. This work is partially supported by CONACyT under the project number 48396–Y and DGEST under the project number PUE–MI–2008– 206.