Avalanche transistor
An avalanche transistor is a bipolar junction transistor designed for operation in the region of its collector-current/collector-to-emitter voltage characteristics beyond the collector-to-emitter breakdown voltage, called avalanche breakdown region. This region is characterized by avalanche breakdown, which is a phenomenon similar to Townsend discharge for gases, and negative differential resistance. Operation in the avalanche breakdown region is called avalanche-mode operation: it gives avalanche transistors the ability to switch very high currents with less than a nanosecond rise and fall times. Transistors not specifically designed for the purpose can have reasonably consistent avalanche properties; for example 82% of samples of the 15V high-speed switch 2N2369, manufactured over a 12-year period, were capable of generating avalanche breakdown pulses with rise time of 350 ps or less, using a 90V power supply as Jim Williams writes.
History
The first paper dealing with avalanche transistors was. The paper describes how to use alloy-junction transistors in the avalanche breakdown region in order to overcome speed and breakdown voltage limitations which affected the first models of such kind of transistor when used in earlier computer digital circuits. Therefore, the very first applications of avalanche transistors were in switching circuits and multivibrators. The introduction of the avalanche transistor served also as an application of Miller's empirical formula for the avalanche multiplication coefficient, first introduced in the paper. The need for better understanding transistor behavior in the avalanche breakdown region,not only for use in avalanche mode, gave rise to an extensive research on impact ionization in semiconductors.
From the beginning of the 1960s to the first half of the 1970s, several avalanche-transistor circuits were proposed. The kind of bipolar junction transistor best suited for use in the avalanche breakdown region was studied. A complete reference, which includes also the contributions of scientists from ex-USSR and COMECON countries, is the book by.
The first application of the avalanche transistor as a linear amplifier, named Controlled Avalanche Transit Time Triode, was described in. A similar device, named IMPISTOR was described more or less in the same period in the paper of.
Linear applications of this class of devices started later since there are some requirements to fulfill, as described below. The use of avalanche transistors in those applications is not mainstream since the devices require high collector to emitter voltages in order to work properly.
Nowadays, there is still active research on avalanche devices made of compound semiconductors, capable of switching currents of several tens of amperes even faster than "traditional" avalanche transistors.
Basic theory
Static avalanche region characteristics
In this section, the static characteristic of an avalanche transistor is calculated. For the sake of simplicity, only an NPN device is considered: however, the same results are valid for PNP devices only changing signs to voltages and currents accordingly. The analysis closely follows that of William D. Roehr in.Since avalanche breakdown multiplication is present only across the collector-base junction, the first step of the calculation is to determine collector current as a sum of various component currents though the collector since only those fluxes of charge are subject to this phenomenon. Kirchhoff's current law applied to a bipolar junction transistor implies the following relation, always satisfied by the collector current
while for the same device working in the active region, basic transistor theory gives the following relation
where
- is the base current,
- is the collector-base reverse leakage current,
- is the emitter current,
- is the common emitter current gain of the transistor.
and since is the common base current gain of the transistor, then
When avalanche effects in a transistor collector are considered, the collector current is given by
where is Miller's avalanche multiplication coefficient. It is the most important parameter in avalanche mode operation: its expression is the following
where
- is the collector-base breakdown voltage,
- is a constant depending on the semiconductor used for the construction of the transistor and doping profile of the collector-base junction,
- is the collector-base voltage.
and remembering that and where is the base-emitter voltage
since : this is the expression of the parametric family of the collector characteristics with parameter. Note that increases without limit if
where is the collector-emitter breakdown voltage. Also, it is possible to express as a function of, and obtain an analytical formula for the collector-emitter differential resistance by straightforward differentiation: however, the details are not given here.
Differential dynamical model
The differential dynamical mode described here, also called the small signal model, is the only intrinsic small signal model of the avalanche transistor. Stray elements due to the package enclosing the transistor are deliberately neglected, since their analysis would not add anything useful from the point of view of the working principles of the avalanche transistor. However, when realizing an electronic circuit, those parameters are of great importance. Particularly, stray inductances in series with collector and emitter leads have to be minimized to preserve the high speed performance of avalanche transistor circuits. Also, this equivalent circuit is useful when describing the behavior of the avalanche transistor near its turn on time, where collector currents and voltages are still near their quiescent values: in the real circuit it permits the calculation of time constants and therefore rise and fall times of the waveform. However, since avalanche transistor switching circuits are intrinsically large signal circuits, the only way to predict with reasonable accuracy their real behaviour is to do numerical simulations. Again, the analysis closely follows that of William D. Roehr in.An avalanche transistor operated by a common bias network is shown in the adjacent picture: can be zero or positive value, while can be short circuited. In every avalanche transistor circuit, the output signal is taken from the collector or the emitter: therefore the small-signal differential model of an avalanche transistor working in the avalanche region is always seen from the collector-emitter output pins, and consist of a parallel circuit as shown in the adjacent picture, which includes only bias components.
The magnitude and sign of both those parameters are controlled by the base current : since both base-collector and base-emitter junctions are inversely biased in the quiescent state, the equivalent circuit of the base input is simply a current generator shunted by base-emitter and base-collector junction capacitances and is therefore not analyzed in what follows.
The intrinsic time constant of the basic equivalent small signal circuit has the following value
where
- is the collector-emitter avalanche differential resistance and, as stated above, can be obtained by differentiation of the collector-emitter voltage respect to the collector current, for a constant base current
- is the collector-emitter avalanche differential capacitance and has the following expression
Second breakdown avalanche mode
When the collector current rises above the data sheet limit a new breakdown mechanism become important: the second breakdown. This phenomenon is caused by excessive heating of some points in the base-emitter region of the bipolar junction transistor, which give rise to an exponentially increasing current through these points: this exponential rise of current in turn gives rise to even more overheating, originating a positive thermal feedback mechanism. While analyzing the static characteristic, the presence of this phenomenon is seen as a sharp collector voltage drop and a corresponding almost vertical rise of the collector current. At the present, it is not possible to produce a transistor without hot spots and thus without second breakdown, since their presence is related to the technology of refinement of silicon. During this process, very small but finite quantities of metals remain in localized portions of the wafer: these particles of metals became deep centers of recombination, i.e. centers where current exists in a preferred way. While this phenomenon is destructive for Bipolar junction transistors working in the usual way, it can be used to push-up further the current and voltage limits of a device working in avalanche mode by limiting its time duration: also, the switching speed of the device is not negatively affected. A clear description of avalanche transistor circuits working in second breakdown regime together with some examples can be found in the paper.Numerical simulations
Avalanche transistor circuits are intrinsically large signal circuits, so small signal models, when applied to such circuits, can only give a qualitative description. To obtain more accurate information about the behavior of time dependent voltages and currents in such circuits it is necessary to use numerical analysis. The "classical" approach, detailed in the paper which relies upon the book, consists in considering the circuits as a system of nonlinear ordinary differential equations and solve it by a numerical method implemented by a general purpose numerical simulation software: results obtained in this way are fairly accurate and simple to obtain. However, these methods rely on the use of analytical transistor models best suited for the analysis of the breakdown region: those models are not necessarily suited to describe the device working in all possible regions. A more modern approach is to use the common analog circuit simulator SPICE together with an advanced transistor model supporting avalanche breakdown simulations, which the basic SPICE transistor model does not. Examples of such models are described in the paper and in the paper : the latter is a description of the Mextram model, currently used by some semiconductor industries to characterize their bipolar junction transistors.A graphical method
A graphical method for studying the behavior of an avalanche transistor was proposed in references and : the method was first derived in order to plot the static behavior of the device and then was applied also to solve problems concerning the dynamic behavior. The method bears the spirit of the graphical methods used to design tube and transistor circuits directly from the characteristic diagrams given in data sheets by producers.Applications
Avalanche transistors are mainly used as fast pulse generators, having rise and fall times of less than a nanosecond and high output voltage and current. They are occasionally used as amplifiers in the microwave frequency range, even if this use is not mainstream: when used for this purpose, they are called "Controlled Avalanche Transit-time Triodes".Avalanche mode switching circuits
Avalanche mode switching relies on avalanche multiplication of current flowing through the collector-base junction as a result of impact ionization of the atoms in the semiconductor crystal lattice. Avalanche breakdown in semiconductors has found application in switching circuits for two basic reasons- it can provide very high switching speeds, since current builds-up in very small times, in the picosecond range, due to avalanche multiplication.
- It can provide very high output currents, since large currents can be controlled by very small ones, again due to avalanche multiplication.
Most circuits employing an avalanche transistor are activated by the following two different kinds of input:
operated by a commonly used bias network.
operated by a commonly used bias network.
- Collector triggering input circuit: the input trigger signal is fed to the collector via a fast switching diode, possibly after being shaped by a pulse shaping network. This way of driving an avalanche transistor was extensively employed in first generation circuits since the collector node has a high impedance and also collector capacitance behaves quite linearly under large signal regime. As a consequence of this, the delay time from input to output is very small and approximately independent of the value of control voltage. However, this trigger circuit requires a diode capable of resist to high reverse voltages and switch very fast, characteristics that are very difficult to realize in the same diode, therefore it is rarely seen in modern avalanche transistor circuits.
- Base triggering input circuit: the input trigger signal is fed directly to the base via a fast switching diode, possibly after being shaped by a pulse shaping network. This way of driving an avalanche transistor was relatively less employed in first generation circuits because the base node has a relatively low impedance and an input capacitance which is highly nonlinear under the large signal regime: this causes a fairly large, input voltage dependent, delay time, which was analyzed in detail in the paper. However, the required inverse voltage for the feed diode is far lower respect diodes to be used in collector trigger input circuits, and since ultra fast Schottky diodes are easily and cheaply found, this is the driver circuit employed in most modern avalanche transistor circuit. This is also the reason why the diode in the following applicative circuits is symbolized as a Schottky diode.
The two avalanche pulser described below are both base triggered and have two outputs. Since the device used is an NPN transistor, is a positive going output while is a negative going output: using a PNP transistor reverses the polarities of outputs. The description of their simplified versions, where resistor or is set to zero ohm in order to have a single output, can be found in reference. Resistor recharges the capacitor or the transmission line after commutation. It has usually a high resistance to limit the static collector current, so the recharging process is slow. Sometimes this resistor is replaced by an electronic circuit which is capable of charging faster the energy storage components. However this kind of circuit usually is patented so they are rarely found in mainstream application circuits.
- Capacitor discharge avalanche pulser: a trigger signal applied to the base lead of the avalanche transistor cause the avalanche breakdown between the collector and emitter lead. The capacitor starts to be discharged by a current flowing through the resistors and : the voltages across those resistors are the output voltages. The current waveform is not a simple RC discharge current but has a complex behavior which depends on the avalanche mechanism: however it has a very fast rise time, of the order of fractions of a nanosecond. Peak current depends on the size of the capacitor : when its value is raised over a few hundred picofarads, transistor goes into second breakdown avalanche mode, and peak currents reach values of several amperes.
- Transmission line avalanche pulser: a trigger signal applied to the base lead of the avalanche transistor cause the avalanche breakdown between the collector and emitter lead. The fast rise time of the collector current generates a current pulse of approximatively the same amplitude, which propagates along the transmission line. The pulse reaches the open circuited end of the line after the characteristic delay time of the line has elapsed, and then is reflected backward. If the characteristic impedance of the transmission line is equal to the resistances and, the backward reflected pulse reaches the beginning of the line and stops. As a consequence of this traveling wave behavior, the current flowing through the avalanche transistor has a rectangular shape of duration
It is possible to turn those circuits into astable multivibrators by removing their trigger input circuits and
- raising their power supply voltage until a relaxation oscillation begins, or
- connecting the base resistor to a positive base bias voltage and thus forcibly starting avalanche breakdown and associated relaxation oscillation.
A practical, easily realised, and inexpensive application is the generation of fast-rising pulses for checking equipment rise time.
The controlled avalanche transit-time triode (CATT)
Avalanche mode amplification relies on avalanche multiplication as avalanche mode switching. However, for this mode of operation, it is necessary that Miller's avalanche multiplication coefficient be kept almost constant for large output voltage swings: if this condition is not fulfilled, significant amplitude distortion arises on the output signal. Consequently,- avalanche transistors used for application in switching circuits cannot be used since Miller's coefficient varies widely with the collector to emitter voltage
- the operating point of the device cannot be in the negative resistance of the avalanche breakdown region for the same reason
- Miller's avalanche multiplication coefficient M is limited to about 10.
- The transit-time effect keeps this coefficient almost constant and independent of the collector-to-emitter voltage.
amplifier.
Theory
- . A paper proposing and describing the IMPISTOR, a semiconductor device similar to the CATT.
- . A paper analyzing the volt-amperometric characteristic of diodes and transistors using the computer algebra program Mathematica.
- . A paper about the design of an avalanche transistor relaxation oscillator using the computer algebra program Mathematica
- . A brief description of the basic physical principles of avalanche transistor circuits: instructive and interesting but "restricted access".
- . A theoretical study of the stability of a transistor biased in the avalanche region.
- available from . A report describing a transistor model capable of including avalanche effects in SPICE simulations.
- . A paper describing the Mextram SPICE model from the point of view of avalanche behavior simulation. For a free copy found in the of see .
- . A paper describing a transistor model for bipolar circuit simulation including avalanche effects.
- Jochen Riks "". A brief description of the working principles of the avalanche transistor, part of the course "", June 1996, Fachschaft Physik Uni Düsseldorf.
- . A paper proposing a graphical method to plot the static characteristic of an avalanche transistor.
- . A paper pushing further the study of avalanche transistor by a graphical method proposed in the preceding work.
- . A paper analyzing the trigger delay time of avalanche transistors by means of numerical analysis.
- . A paper where an analytical model of the behavior of an avalanche transistor is derived after suitable approximations.
Applications
- . A paper describing a fast sweep generator for a streak camera constructed using series connected avalanche transistor circuits.
- . A paper describing an application of avalanche transistors to the design of a sampling oscilloscope: available abstract, full paper is "restricted access".
- . Available from . A report describing the design of a driver for Pockels cells Q-switches.
- . A project, inspired to Jim Williams' Linear Technology application notes AN72 and AN94, of an avalanche transistor astable multivibrator with schematics, waveforms and photos of the layout.
- . Academic Dissertation presented with the assent of the Faculty of Technology. A doctoral dissertation describing a Laser TOF Radar and its construction using an avalanche transistor pulser.
- . A paper describing an avalanche transistor pulser and its use as Laser driver in a laser radar.
- A very rich repository of documents about the Mextram bipolar junction transistor SPICE model, capable of avalanche breakdown behavior simulation.
- "", "" OSRAM Opto Semiconductors GmbH Application Notes, 2004-09-10. Two application notes from Osram Opto Semiconductors describing pulsed operation of a Laser diode, using avalanche transistors and other kind of drivers.
- . A paper describing a method to enhance performances of banks of series-connected avalanche transistor circuits.
- . A detailed paper describing the construction and performance of an avalanche transistor pre-trigger pulse generator to test the slew-rate of very fast operational amplifiers. Also appeared under the title "", application note AN94, Linear Technology, May 2003. See also, from the same author, Linear Technology application note AN47, ", August 1991, where an astable circuit similar to that described by Holme is detailed in appendix D, pages 93–95.
Varia
- R. Jacob Baker at University of Nevada, Las Vegas. A contributor to the theory and applications of avalanche transistors.
- . Some biographical notes about one of the leading contributors to the theory and application of avalanche transistors.
- Ari Kilpelä at the University of Oulu. A researcher working on theory and applications of avalanche transistor circuits.