MODULE 1-8
TEMPORAL CHARACTERISTICS 
OF LASERS

(1) One of the more important characteristics of any laser is the temporal distribution of its output. Continuous­wave lasers produce a steady beam at an essentially constant power output. Pulsed lasers emit their energy in short bursts. Typical laser pulses may last several milliseconds or may be as short as a few femtoseconds, depending upon the methods used to shape the pulse and control its duration. 

(2) The coherence of a laser beam is related to its temporal characteristics. For example, the longitudinal coherence length is determined by the range of frequencies present in the beam. 

(3) This module discusses the temporal characteristics of lasers. In the laboratory, the student will measure the duration and power of laser pulses.

Upon completion of this module, the student should be able to:

 
1. Define the following terms:
 

Pulse duration. 
Pulse repetition rate. 
Pulse repetition time. 
Peak pulse power. 
Duty cycle.
Longitudinal coherence length.

2. Prepare graphs that describe the output of the following types of laser pulses as functions of time:
 

a. Normal pulse.
b. Q­switched pulse.
c. Modelocked pulse.

3. Draw graphs of amplifier gain, loop gain, and output power as functions of time in a Q­switched laser.
4. Explain briefly the term "modelocking."
5. Given any two of the following quantities, calculate the third: 
a. Pulse duration. 
b. Peak pulse power. 
c. Energy per pulse.
6. Given any two of the following quantities, calculate the third: 
a. Average power. 
b. Peak power. 
c. Duty cycle.
7. Given any two of the following quantities, calculate the third: 
a. Pulse repetition rate. 
b. Pulse duration. 
c. Duty cycle.
8. Given any two of the following quantities, calculate the third: 
a. Average power. 
b. Pulse repetition rate. 
c. Energy per pulse.
9. Given one of the following quantities, determine the other: 
a. Frequency bandwidth of laser output. 
b. Longitudinal coherence length.
10. Explain the practical significance of longitudinal coherence length.
11. Given the appropriate equipment, measure the temporal output characteristics of a repetitively pulsed laser.

PULSED LASERS

(5) Pulsed laser operation may be further subdivided according to pulse length and methods for producing such pulses. The following are the four basic operating modes for pulsed lasers:

• Normal pulsed mode.
• Q­switched mode.
• Mode­locked.
• Cavity-jumped mode

NORMAL PULSED LASERS

(6) Figure 1 shows graphically the output pulse of a solid­state laser operating in the normal pulsed mode. Such a pulse has a nominal duration of from a tenth of a millisecond to several milliseconds. The pulse is composed of many small pulses, each lasting about 50 ns. Module 1­6, "Lasing Action," discusses the variations in amplifier gain that lead to this spiking in the laser output. But there is another factor that must be considered to account for the large number of spikes present and their overlapping. Solid­state lasers typically have a laser linewidth of 30 GHz or greater and therefore, operate on a hundred or more longitudinal modes. [Recall Examples E and H in Module 1-7. There it was shown that a typical Md:YAG laser has a mode spacing of  of 258 MHz (Example E) and, if the fluorescent linewidth  of the Nd:YAG laser is 30GHz, then the number of longitudinal modes is calculated to  (Example H).]Each of these longitudinal modes exhibits a spiking behavior independent of the behavior of the other modes. The total output pulse is composed of thousands of these short pulses.

(7) The total energy of the pulse and the total pulse duration remain essentially the same from shot to shot for such a laser. But the maximum output power reached during one pulse may be very different from that of the next. For this reason, such lasers often are classified according to energy per pulse and pulse duration. A rough approximation of maximum pulse power may be calculated from these values.

Q­SWITCHED LASERS

(8) Figure 2 shows a schematic diagram for a Q­switched laser. Several types of Q­switches are in common use, each type being suited to a particular type of laser and pulse domain. The Q­switch acts as a shutter within the laser cavity. When this shutter is closed, light passing through the active medium is blocked from reaching the HR mirror, or is reflected out of the cavity. Consequently,  the high­reflectivity (HR) mirror provides no feedback. The Q­switch introduces sufficient loss in the laser cavity to prevent lasing, which, in turn, allows the amplifier gain of the laser to increase far above the normal lasing threshold. When the Q­switch is opened that is, when feedback between the mirrors is restored lasing is initiated, and the energy stored in the active medium is subsequently released in one intense pulse.

(9) Figure 3 compares the operation of a pulsed laser in the Q­switch mode to the operation of the same laser in the normal pulsed mode. Without the Q­switch, the amplifier gain reaches the lasing threshold at t₁, and lasing begins. The lasing process removes energy from the active medium in the form of the spiked output of a normal pulse. The amplifier gain and output power of the normal pulsed mode laser are indicated by dotted lines.

(10) The values for the Q­switched mode are indicated by solid lines. The Q­switch prevents internal feedback of the beam and maintains a loop gain value of zero until the energy stored in the active medium has reached a maximum value. At time t₂ in Figure 3, the amplifier gain is many times the maximum gain value in a normal pulsed laser, due of course, to the large population inversion created. When the Q­switch is opened, loop gain rises rapidly to a large value – in some cases, the value may be several hundred. This large increase in loop gain can produce intense standing waves in many cavity modes, and all the stored energy is released in the resulting pulse. Q­switched pulses range in duration from a few seconds to several hundred nanoseconds. And the peak power of a Q­switched pulse may be several thousand times greater than that of the same laser without a Q­switch. While Q­switching reduces the total energy of the pulse, the pulse width is shortened even more.

(11) The "Q" in Q­switching stands for "quality factor" and is a carryover from electronics. The quality of a cavity is defined as the ratio of the amount of energy stored in that cavity in the form of a standing wave to the amount of energy lost for all reasons during a round trip of the cavity. When the Q­switch of a laser is closed, there is no feedback and thus no standing wave. The loss is very high and thus the quality factor is zero. When the Q­switch is opened, a strong standing wave is formed, causing the loss to be reduced. The Q­switch receives its name from the fact that it allows the "Q" of the cavity to be "switched" from (feedback blocked) a low value to a high value. (feedback restored) However, actual calculations of the quality factor are seldom made for laser cavities.

(12) No mechanical shutter can open fast enough for effective Q­switching. The simplest mechanical method of achieving Q­switching at the necessary rate is the rotation of the HR mirror. The HR mirror is mounted on the shaft of a motor that has a rotational rate of 30,000 rpm or greater. Once during each revolution, the mirror is aligned for nanoseconds and the laser pulse is produced. As indicated in the caption of Figure 2, one can use acousto-optic, electro-optic and dye switches, in addition to mechanical switches, to effectively Q-switch the cavity.

MODELOCKED LASERS

(13) Figure 4 illustrates the output of a modelocked laser. This output consists of a train of laser pulses, each pulse having a duration of from picoseconds to a fraction of a nanosecond, depending upon the laser. The separation of the pulses is equal to the time required for light to make one round trip around the laser cavity, from mirror to mirror and back again. If the distance between mirrors is l, then the roundtrip time is  where c is the speed of light in the cavity.

(14) How is modelocking achieved? To understand the process, recall the work in Module 1-7, Optical Cavaities and Modes of Scillation, where we showed that many longitudinal modes (standing waves) exist in a cavity at the same time. In Figure 11 of Module 1-7 we showed how the number of modes found in the spectral distribution of the laser output depended on the width of the laser transition line, the cavity round trip gain, and the frequency spacing  equation between the longitudinal modes.

(14a) In the drawing below, Figure 5, we show at a certain instant of time only three of the many modes that are oscillating. There are of course, the waves that bounce continually back and forth between the mirrors, forming standing waves with modes at the mirrors, and each mode with a whole number of half-wavelengths filtering exactly between the mirrors as we showed in Figures 6 and 7 of Module 1-7. (They are separated vertically in the drawing below only for clarity.)

(14b) If all the longitudinal modes were shown, the resultant would be an intensity profile of nearly zero amplitude at most locations with one or more positions where the resultant amplitude would be a maximum, as sketched in Figure 6.
 
 

(14c) Now with an appropriate modelocker–acousto-optic, electro-optic or dye device–appropriately positioned in the cavity, the intensity profile shown in Figure 6 can be "locked in postion," maintaining the identical profile relative to the individual longitudinal modes from which it came. Just as the individual modes bounce back and forth between the two mirrors so does the resultant maximum pulse. But this first situtation happens only with a modelocker in place. Why? Because in a cavity without the modelocker–a so-called free running laser–the phases of the separate longitudinal modes (such as shown in Figure 5) would change relative to one another and the position of the maximum pulse would be constantly shifting, i.e., it would be "unlocked". If the modelocker is a dye switch for example, it would open (pause light) only when the high intensity of the pulse caused the dye to bleach and transmit the laser energy. Otherwise it would remain closed. In this way the modes remain locked in relative phase with one another, and the maximum pulse makes a cavity roundtrip in time equation, so that modelocked pulses appear in the ouput of the laser separately in time by an interval equation.

CAVITY-DUMPED MODE

A cavity-dumped laser is just a different type of Q-switch laser. In the normal Q-switched laser, as we have already discussed, the population inversion is built to very high lead, then released all at once, giving rise to a large pulse of energy. This is achieved

CHARACTERIZATION OF PULSED LASER OUTPUTS

SINGLE­PULSED LASERS

(17) Since "power" is defined as "energy divided by time," energy is the product of power and time. In Figure 7, the total energy of the pulse is represented by the area under the power curve. The actual area can be determined through the use of calculus; but in most cases, an approximation is used. A triangle is drawn—its sides starting at the maximum­power point (A) and extending through the edges of the pulse at the ha1f­power points (B and C) to the base line (D and E). The area of this triangle is not exactly the same as that of the actual pulse, although it is a close approximation.

(18) The area of triangle ADE in Figure 7 can be determined from Equation 1.

Equation 1

(19) The base of the triangle in Figure 7 is 2Dt_1/2; therefore one­half the base is the pulse duration, Dt_1/2. The height of the triangle is the maximum power of the pulse P_max. Substitution of these quantities into Equation 1 yields Equation 2.

Equation 2

(20) The energy content of a laser pulse is the product of the maximum power and the pulse duration.

(21) In most practical situations, measurements of pulse duration and energy can be made. Measurements of pulse power cannot be made; therefore, the most useful form of Equation 2 is that for maximum power given in Equation 3. 

Equation 3 

(22) Example A demonstrates the use of Equation 3 in the solution of a problem. 

EXAMPLE A: MAXIMUM POWER OF A LASER PULSE
Given:	The output pulse from a Q-switched ruby laser has a duration of 5 ns and an energy of 1 J.
Find:	Maximum power.
Solution:

REPETITIVELY PULSED LASERS

(25) The pulse repetition rate is the number of pulses per second and is related to pulse repetition time by Equation 4.

Equation 4

where: PRR = Pulse repetition rate.

(26) The shaded area in Figure 8 represents the product of the average power and the pulse repetition time. This area is the same as that of one of the laser pulses; therefore, Equation 5 can be used to determine the energy of a single pulse in a repetitively pulsed laser.

Equation 5

(27) The use of this equation is illustrated in Example B. 

EXAMPLE B: ENERGY PER PULSE
Given:	A Q-switched Nd:YAG laser produces 5000 pulses per second at an average power of 20 W.
Find:	Energy of a single pulse.
Solution:

Equation 6

where DC = Duty cycle.

From Equation 5—

From Equation 2—

(29) Substitution of these values into Equation 6 yields Equation 7.

Equation 7

(30) Example C illustrates the use of Equations 6 and 7 in the solution of a problem. 

EXAMPLE C: DUTY CYCLE AND MAXIMUM POWER OF A REPETITIVELY PULSED LASER
Given:	A repetitively pulsed CO2 laser has an average power of 100 W, a pulse duration of 0.5 ms, and a pulse repetition of 500/sec.
Find:	Duty cycle and maximum power.
Solution:

See Idea Bank

LONGITUDINAL COHERENCE LENGTH

(33) This optical system contains two optical paths­­(1) A to B to D and (2) A to C to D. The optical path difference is the difference in length between these two paths. If the optical path difference is less than the longitudinal coherence length of the light, interference fringes are formed on the screen. If the optical path difference is greater than the longitudinal coherence length of the light, no interference fringes are formed. In most applications that involve interferometry, the longitudinal coherence length of the laser light must be known; and in many cases steps must be taken to extend the coherence length.

(34) The longitudinal coherence length of light is given by Equation 8.

Equation 8

where:

c = Longitudinal coherence length. c = Speed of light. Dn = Total bandwidth of light.

(35) Example E illustrates the use of this equation. 

EXAMPLE E: COHERENCE LENGTH OF A HeNe LASER
Given:	The total bandwidth of a multimode HeNe laser is 1.5 GHz.
Find:	Coherence length.
Solution:

(37) The longitudinal coherence length of laser light is inversely proportional to the bandwidth of the output laser light; therefore, the coherence length can be extended by reduction of the bandwidth. In some lasers, this reduction is accomplished by allowing only one longitudinal mode to oscillate within the laser cavity. This process reduces the bandwidth of the output beam from the multimode bandwidth (which is essentially equal to the full linewidth of the laser fluorescent transition) to the single-mode bandwidth of a cavity mode. The effect on the coherence length is illustrated in Example F. 

1. Define the following terms:
 

a. Pulse repetition rate.
b. Pulse repetition time. 
c. Pulse duration. 
d. Peak pulse power. 
e. Longitudinal coherence length.

2. Draw and label graphs that relate output power as a function of time for the following types of lasers: 
a. Normal pulsed. 
b. Q­switched. 
c. Mode1ocked.
3. Draw graphs of amplifier gain, loop gain, and output power as a function of time for a Q­switched laser.
4. Explain how modelocking is achieved.
5. Explain the practical significance of the longitudinal coherence length.
6. A Q­switched ruby laser emits 4.5 J in a pulse duration time Dt_1/2 of 30 ns. What is the peak power?
7. A Q­switched Nd:YAG laser with a pulse duration of 20 as has a peak power of 10 MW. What is the energy of the pulse? 
8. A repetitively Q­switched Nd:YAG laser has an average power of 10 W and a peak power of 12.5 kW. What is the duty cycle?
9. The pulse duration of Dt_1/2 of the laser in Problem 8 is 800 ns. Determine the PRT and PRR.
10. A CO2 laser with an average power of 25 W has a pulse repetition rate of 250 per second. What is the energy per pulse?
11. A Q­switched Nd:YAG laser has an average power of 22 W, a pulse duration of 1.2 ms, and a pulse repetition time of 250 ms. Find the following values: 
a. PRR. 
b. Duty cycle. 
c. P_max
d. Energy per pulse.
12. A repetitively pulsed laser produces 47 mJ per pulse. The pulse repetition time is 2.5 ms and the duty cycle is 0.08. Find the following values:
 

a. Pulse duration.
b. P_max.
c. P_avg.

13. A ruby laser has a pulse repetition rate of 3 pulses per second. The pulse duration is 0.5 ms, and the maximum power is 40 kW. Find the following values: 
a. Duty cycle.
b. Average power.
c. Energy.
14. An Nd:YAG laser has a fluorescent linewidth of 30 GHz. What is the longitudinal coherence length if it lases over this entire frequency range?
15. A pulsed ruby laser used for holography has a coherence length of 9 m. What is the frequency bandwidth of the laser output?
16. An argon ion laser has a fluorescent linewidth of 9 GHz. The cavity length is 1.25 m. The transmission of the output coupler is 4%. Determine the coherence length with and without an etalon. (Hint: Refer to Module 1­7, "Optical Cavities and Modes of Oscillation," to calculate the bandwidth of a single mode.)

See Idea Bank

See Idea Bank

MEASUREMENT OF OUTPUT PARAMETERS OF PULSED LASERS

 
1. Set up the HeNe laser, light chopper, photodetector, and oscilloscope as in Figure 10.




Fig. 10 Experimental arrangement for pulsed laser measurement

2. Start rotation of the light chopper, making sure it is rotating at a uniform rate. Pulse width and pulse repetition time can be varied by changing the speed of rotation or by changing the size or number of slots in the chopper.
3. Plug the lead from the photodetector into the vertical input of the oscilloscope. Adjust the vertical gain and the horizontal time base to obtain a trace similar to that depicted in Figure 11.




Fig. 11 Oscilloscope trace for measuring PRT

4. Measure the distance in centimeters between two adjacent pulses, and multiply this distance by the time base of the oscilloscope in ms/cm to obtain the pulse repetition time. Record PRT in Data Table 1.
5. Adjust the time base of the oscilloscope to obtain a trace of one pulse as illustrated in Figure 12.




Fig. 12 Oscilloscope trace for measuring Dt_1/2

6. Measure the full width of the pulse at half the maximum height. Determine the pulse duration and record in Data Table 1. 
7. Replace the photodetector with the sensor of the optical power meter. Measure the average power and record in Data Table 1.
8. Calculate the pulse repetition rate from Equation 4.
9. Calculate the duty cycle from Equation 6.
10. Calculate the maximum power by use of Equation 7. 
11. Calculate the energy per pulse from Equations 3 and 5. Both equations should yield the same value.
12. Change the PRR by varying the speed of the light chopper or the number of slots. Repeat the procedure for two additional values of PRR. Record results.

Duley, W.W. CO₂ Lasers: Effects and Applications. From the Series Quantum Electronics—Principles and Applications, edited by Yoh­Han Pao. New York: Academic Press, 1976.

O'Shea, Donald; Callen, W. Russell; and Rhodes, William T. Introduction to Lasers and Their Applications. Reading, MA: Addison­Wesley Publishing Co., 1978.

Pressley, Robert J., ed. CRC Handbook of Lasers, with Selected Data on Optical Technology. Cleveland, OH: The Chemical Rubber Company, 1971.

Ready, John F. Industrial Applications of Lasers. New York: Academic Press, 1978.

Ready, John F. Lasers in Modern Industry. Dearborn, MI: Society of Manufacturing Engineers, 1979.

Siegman, A.E. An introduction to Lasers and Masers. New York: McGraw­Hill Book Company, 1971.

Silicon Photodetector Design Manual. Santa Monica, CA: United Detector Technology.

Yerdeyen, Joseph T. Laser Electronics. Englewood Cliffs, NJ: Prentice-Hall, Inc., 1981.

Wilson, Leroy E., et al, ads. Electronic Transition Lasers. Cambridge, MA: MIT Press, 1977.