Abstract

Experimental investigation of a compact 40-kV diode-type photoelectric DC gun driven by 100 fs laser pulses revealed that the space-charge-limited current density could exceed 30 kA/cm2 and that the density increased linearly with the accelerating voltage. We explained these important properties by the balance between the cathode surface field and the field produced by sheet-like electron bunches near the cathode surface. Our simple physical model agreed well with the experimental results.

1. Introduction

Electron guns are basic tools for commercial engineering and state-of-the-art science. Many types of guns have been developed and are still being investigated for wide-ranging application fields, such as electron beam welding, lithography, and X-ray generation. Among them, electron guns using a photocathode (called photoinjectors) are excellent candidates for generating high-brightness electron bunches [1]. Photoinjectors are classified into two types according to the method used for generation of the acceleration field: RF photoinjectors [2, 3] and DC photoinjectors [4, 5]. Both types are primarily being developed for the next generation of accelerators for use in free-electron lasers and high-energy physics because they can produce high-charge (~1 nC) electron bunches with perfectly controlled timing. By virtue of its structural simplicity, the DC photoinjector is being investigated as a compact electron bunch source in other research fields such as ultrafast electron microscopy [6]. In our research, a 40-kV DC photoinjector is being developed as a compact electron gun to produce ultrashort, high-charge electron bunches. The bunches will be used to generate intense coherent terahertz light waves using the coherent radiation effect of bunches whose length is shorter than the radiation wavelength [7, 8]. To date, most research on DC photoinjectors was performed using nanosecond lasers [9] and picosecond lasers [6, 10, 11]. In these studies, the space-charge limitation followed the Child-Langmuir law; the maximum current density was proportional to and was limited to the order of 10 A/cm2. The space-charge limitation of such DC photoinjectors was the same as that of conventional electron guns using thermionic cathode. This is because the electron bunch length along the propagating direction was greater than or comparable to the gap distance between the cathode electrode and the anode electrode: the A-K gap was plugged with electrons, similar to that in the thermionic electron gun. With femtosecond lasers, however, the situation changes. The length of the electron bunch is less than 100 μm because of the short duration of photoemission; thus, electrons occupy only a small part of the A-K gap. This type of gun can produce much denser electron bunches beyond the limitation of the Child-Langmuir law. We obtained a 744 pC bunch from our compact 40-kV DC photoinjector driven by a 100 fs laser. This charge is comparable to that obtained from more energetic RF/DC photoinjectors for high-energy physics; amazingly, the corresponding current density exceeds 30 kA/cm2, which is 4000 times greater than the Child-Langmuir limit. In this paper, we describe our experimental results and a physical model that explains the space-charge limitation for such short-pulse photoinjectors.

2. Experimental Apparatus

Figure 1 shows a schematic view of the compact 40-kV DC photoinjector. The exterior of the injector was 35 cm in length and 11 cm in diameter, which is very compact compared to DC photoinjectors developed for next-generation accelerators. A frequency-tripled Ti:sapphire laser beam () irradiated a magnesium photocathode (work function = 3.64 eV) installed in the diode-type DC gun to produce photoelectrons. The repetition rate of the laser was 1 kHz, and its pulse width fluctuated slightly in 95–105 fs range. The laser beam was focused by a lens placed outside the vacuum vessel and irradiated the cathode, which was 20 mm in diameter, at an incident angle of 60°. The area of the elliptical laser spot was . The cathode was connected to a high-voltage DC power supply with a maximum voltage of −40 kV. The DC electric field accelerated the photoelectrons toward the anode electrode and a dumper electrode placed immediately behind the anode electrode, at which a device for generating coherent radiation, such as a metallic grating or dielectric slabs, will be installed. A phosphor plate 17 mm in diameter was installed in the dumper electrode to observe the charge density profile. The anode-cathode gap was 15 mm. The anode electrode was a thin-wall cylinder 5 cm in length with an inner diameter of 20 mm and an outer diameter of 24 mm. Thus, some of the accelerated electrons hit the anode electrode, and residual electrons hit the dumper electrode. The electrodes were connected to the ground through 50 Ω shunt resistors; the charges flowing through the resistors were monitored by a 10 Gsamples/s oscilloscope.

Figure 2(a) shows a typical time trace of the anode shunt resistor signal. A sharp negative spike at 90 ns on the abscissa indicates the current flowing in the anode resistor. Because of impedance mismatch, the spike is followed by a ringing signal, which vanishes with time integration. The time constants of the anode and dumper charge monitors were approximately 5 ns and were determined primarily by the stray capacitance between the electrodes and the vacuum vessel. The bunch charges were evaluated by integrating the resistor current. The laser energy was varied from 8 to 230 μJ/pulse by changing the incident angle of the laser beam with a multilayered beam splitter. A laser spot size of 24 mm2 was carefully chosen to avoid laser ablation of the cathode for all experimental conditions. Figure 2(b) shows the anode shunt resistor signal when the laser irradiance was extremely intense. The accelerating voltage was reduced to 3 kV in this case. A slowly varying negative signal 40 ns in duration appeared between 95 and 135 ns on the abscissa, following the electron bunch spike. This undesirable current may come from plasma excited at the cathode surface. With a higher accelerating voltage, this plasma current increased significantly, eventually short-circuiting the electron gun. All experiments were performed under a pressure of  Pa, and the stability of the bunch charge was within 4% for each incident laser pulse energy.

3. Experimental Results

With an accelerating voltage of 40 kV and a laser irradiance of 205 μJ, maximum bunch charge of 744 pC was observed without significant plasma production. The corresponding current density exceeded 30 kA/cm2. This result is the most attractive aspect of the femtosecond photoinjector compared to injectors driven by a longer laser pulse. This current density is several thousand times the saturation density evaluated by the Child-Langmuir law.

Figure 3 shows the bunch charge as a function of the laser energy with different accelerating voltages. When the accelerating voltage was 10 kV, the bunch charge increased from 0 to 120 pC as the laser energy increased from 0 to 50 μJ. At 95 μJ, the bunch charge leveled off, and then the charge remained almost constant at approximately 150 pC for a laser irradiance up to 210 μJ. That is, the photoinjector was saturated at an irradiance greater than 95 μJ. The same tendency appeared with an accelerating voltage of 30 kV: the bunch charge increased from 0 to 280 pC as the laser energy increased from 0 to 100 μJ, whereas for higher laser irradiance, the charge remained almost constant, and the saturation charge increased to 300 pC. Increase in the laser energy indicates increase in the number of photons causing photoemission, which leads to the increase in the number of photoelectrons produced at the cathode surface. Therefore, the observed saturation behavior indicates that the number of electrons to be accelerated is limited by the accelerating voltage. This type of saturation phenomenon is understood as the so-called space-charge-limited. Closely observing the saturation regime, we find that the bunch charge increases very slightly with the laser energy. This behavior may originate in the nonuniform flux distribution of the incident laser: because of the Gaussian spatial profile of the laser intensity, the central part of the electron bunch reached saturation first, and then the increase in the laser energy broadened the saturated region toward the bunch's periphery.

According to the discussion of the space-charge-limited above, the saturation effect might be observed more clearly at a lower accelerating voltage. Therefore, we investigated in detail the space-charge limitation charge at an accelerating voltage ranging from 0 to 16 kV. Figure 4 shows the bunch charge as a function of the accelerating voltage with laser irradiances of 69 and 130 μJ. The dotted lines denote the predictions of the physical models described in the next section. At a laser energy of 130 μJ, the bunch charge increased linearly from 0 to 85 pC as the accelerating voltage increased from 0 to 5 kV. This dependency violates the Child-Langmuir law. At a higher laser irradiance, the rate of increase of the bunch charge gradually declined as the accelerating voltage increased. At a laser energy of 69 μJ, the same tendency appeared: the bunch charge increased linearly from 0 pC to 60 pC as the accelerating voltage increased from 0 to 4 kV. From these results, we conclude that the space-charge limitation charge of the short-pulse DC photoinjector depends linearly on the accelerating voltage. Decrease in the rate of increase of the bunch charge observed at an accelerating voltage greater than 5 kV is also explained by the Gaussian spatial profile of the incident laser, as follows. Increase in the accelerating voltage reduces the saturated emission region of the bunch inward from its periphery, where the number of photoelectrons is much smaller than that in the central region. Although the number of electrons emitted in the central saturated region increased linearly with the accelerating voltage, the number of electrons from the periphery remained constant because this region is in the so-called emission limit condition. Thus, the rate of increase of the total charge declined.

4. Modeling the Space-Charge Limitation

Next, we build a physical model to describe the space-charge limitation of the femtosecond photoinjector. The model should explain the extremely high saturation density and the linear dependence of the bunch charge on the accelerating voltage.

First, application of the accelerating voltage induces the surface charge density on the cathode. This charge increases with the electric field at the cathode surface given by . The relationship between the charge density and the electric field is given as , where is the gap between the anode and cathode electrodes. Irradiation of laser photons onto the cathode causes photoemission. Owing to the short period of photoemission, the emitted electrons form a sheet-like bunch with the surface density . Here we consider the charge density of the cathode surface immediately after photoemission. We have two cases.

(1) Surface Density Remains Constant at
Figure 5 shows relationship between the electric field produced by an electron bunch and the field at the cathode surface . When increases to , that is, , the accelerating field on the cathode surface vanishes. Analogous to the saturation under the Child-Langmuir law, the charge density under this condition is the saturation charge density because no more photoelectrons on the cathode surface are accelerated toward the anode electrode. Rewriting this condition, we have where the right-hand side of the equation is the apparent form of the field produced by the sheet-like bunch. The space-charge-limited bunch density, therefore, is Multiplying the photoemission area by this density yields the saturation charge. This criterion is shown in Figure 4 as the upper dotted line.

(2) Surface Density Decreases to
Considering the velocity of electrons in metals is in the order of ~cm/s, no electrons may diffuse into the photoemission area during the very short (100 fs) photoemission process. Thus, the cathode surface charge density drops. Under this condition, we have Then, the space-charge limitation density is This criterion is also shown in Figure 4 as the lower dotted line.

The experimental results clearly lie between these criteria. This suggests that the cathode surface charge is partially compensated during the 100 fs long photoemission process. In addition to our approximate model, the criterion described in [6], which is based on the virtual cathode formation, also fits well with our experimental results. This criterion is shown in Figure 4 as the dash-dotted line lying between our criteria. Our study supports this earlier research in which the injector could not be operated in the saturation regime. For a more precise comparison, the photoemission area and the charge density profile of the bunch should be measured accurately.

5. Conclusion

We investigated the performance of a compact 40-kV DC photoinjector driven by ultrashort laser pulses in the saturation regime. The photoinjector could produce intense electron bunches with a current density greater than 30 kA/cm2. This property was explained well by the balance between the field of the cathode surface charge and that of the sheet-like electron bunch. However, it is readily expected that such intense bunches suffer a strong self-field, which increases their length along the propagation direction and enlarges their radial size. In fact, we observed a large radial divergence of bunches when the injector was operated in the saturation regime: the phosphor plate fluoresced uniformly over its entire area. This defect is the main reason that researchers avoid driving DC photoinjectors by ultrashort laser pulses, even though this is the most direct method to produce intense short electron bunches.

We are investigating the space-charge effect on the bunch volume to clarify whether the ultrashort-pulse DC photoinjector is valuable as an advanced compact electron bunch source for coherent radiation generation. The most interesting and critical issue is the increasing effect of the space charge on the bunch length. A time-domain spectroscopy system for measuring the waveform of the radiation emitted from the electron bunches is now under development using the photocathode driving laser. We hope that this development will clarify the relationship between bunch charge and bunch length.

Acknowledgment

This research was partially supported by the Ministry of Education, Science, Sports and Culture, Grant-in-Aid for Scientific Research, no. 21540514, 2011.