The Role of the Fill Factor

Putting material in the path of the beam is inevitable for these phase plates since it is the only way to break the symmetry constraints imposed by the Maxwell equations on fields in free space. Adding material to create the structure of the plate segments leads to the concept of the fill factor ($\zeta$), the amount of optically transparent versus nontransparent parts in the phase plate. This modulation of the local amplitude of the electron beam will inevitably lead to a broadening of the probe as high spatial frequency tails are introduced.

If we try to estimate this effect, we can begin with a wave function on the probe forming aperture with a constant amplitude:

(4)$$\psi_{{\rm in}}( \vec{k}) = {1\over \sqrt{A}} a( \vec{k}) \, {\rm e}^{{\rm i} \phi( \vec{k}) }.$$

With $a( \vec {k})$ a function defining the aperture's shape being either 1 ($\vec {k}< \alpha$) or 0 ($\vec {k}> \alpha$), $A = \int a( \vec {k}) d^2\vec {k}$ is the total area of the aperture, $\phi$ is the local phase, and $\vec {k}$ is a vector in the aperture plane. The wave function in real space then becomes:

(5)$$\Psi\left(\vec{r}\right) = \int \psi_{{\rm in}}( \vec{k}) \, {\rm e}^{{\rm i} \vec{k}\cdot \vec{r}} d^2 \vec{k}.$$

We consider as the ideal case a circular aperture and a flat phase (i.e., the diffraction limit). In this case, the probe will be the sharpest and the wave will have a value at the central point:

(6)$$\Psi_{{\rm ideal}}\left(0\right) = {1\over \sqrt{A}}\int a( \vec{k}) d^2 \vec{k} = \sqrt{A}.$$

Now, if we want to describe the situation of a pixelated phase plate with the same outer dimensions, we can put a mask $M$ over the ideal aperture, which is either 1 (electron transparent) or 0 (not electron transparent). If we assume the ideal case where the pixelated phase plate can still provide a flat phase in those areas where the plate is electron transparent, we get:

(7)$$\psi_{{\rm pp}}( \vec{k}) = \psi_{{\rm in}}( \vec{k}) M( \vec{k}). $$

This mask changes the maximum of the real space wave function to:

(8)$$\Psi_{{\rm pp}}( 0) = \sqrt{A} \zeta.$$

With $\zeta = \int ( {M( \vec {k}) }/{a( \vec {k}) }) d^2\vec {k}$ the fill factor of the phase plate.

Now, let us consider the resulting probe which consists of the sum of the ideal corrected wave and an unwanted tail part:

(9)$$\Psi_{{\rm pp}}( \vec{r}) = \zeta \Psi_{{\rm ideal}}( \vec{r}) + \Psi_{{\rm tails}}( \vec{r}). $$

Where the scale factor $\zeta$ describes the scaling of the central maxima with respect to the ideal corrected case. We can now write the intensity of the probe as:

(10)$$I_{{\rm pp}}( \vec{r}) \approx \zeta^{2} I_{{\rm ideal}}( \vec{r}) + I_{{\rm tails}}( \vec{r}). $$

We assume that the current of the tails does not overlap with the central spot. This assumption is reasonable given that the ideal probe is a maximally compact function near the center, and the tails come from the high spatial frequencies of the mask, which are much smaller than the total aperture radius.

If we normalize the total current illuminating the round aperture $I_{{\rm ideal}, {\rm total}} = I_0 = 1$ for simplicity, the total intensity in the probe then becomes:

(11)$$\matrix{I_{\rm tot, pp} & \approx \zeta^2 + I_{{\rm tot}, {\rm tails}},\cr \zeta & \approx \zeta^2 + I_{{\rm tot}, {\rm tails}},\cr I_{{\rm tot}, {\rm tails}} & \approx \zeta( 1-\zeta). }$$

If we normalize the tails relative to the total intensity in the probe, we get:

(12)$$I_{{\rm tot}, {\rm tails}, {\rm rel}} \approx 1-\zeta.$$

In other words, the unwanted tail part of the probe formed by a pixelated phase plate scales approximately as $1-\zeta$. These tails will form a low-resolution background signal to any scanned probe setup. This background is highly unwanted as it will increase the counting noise, which is especially bad for spectroscopic methods since it will bring signal from areas away from the probe center. To prevent these tails, we want to create a mask having the highest possible fill factor. For the same reason, to optimize the value of $d_{50}$, we need a $\zeta > 0.5$, and the ideal case would be to bring this value as close to 1 as possible. Cutting off the tails with an aperture placed lower in the TEM column seems another option, but this would require cutting apertures with an equivalent real space diameter only a few orders larger than the probe size, which seems extremely difficult to obtain if we aim for Å probes, especially when considering that working in another (magnified) plane than the sample plane will introduce inevitable lens aberrations.

Zeroth-Order Phase Correction

Suppose we use a zeroth-order phase plate which produces a constant phase shift that is programmable per segment. If we allow for a maximum phase error $\epsilon$ within each segment, we get for the maximum angle up to which we can correct:

(15)$$\chi\vert _{\theta_i}( \Delta \theta) < \epsilon,$$

(16)$$\eqalign{& {\pi\over \lambda}\left[\left(-2\Delta f\theta_i + 2C_s\theta_i^3\right)\Delta\theta \right.\cr & \quad \left. + \left(-\Delta f + 3C_s\theta_i^2\right){\Delta\theta}^2\right]< \epsilon.}$$

This puts an upper limit on the maximum angle that can be corrected depending on how small we can make $\Delta \theta$. If we assume only $C_s$ needs correction, we can always choose $\Delta f = 0$, and we also take the first-order Taylor expansion as sufficient we get:

(17)$$\Delta\theta < {\epsilon \lambda\over \pi 2C_s \theta_i^3 }.$$

For a typical $C_s = 1\, {\rm mm}$, $\theta _i = 15\, {\rm mrad}$, and $\epsilon = {2\pi }/{10}$, we obtain a $\Delta \theta < 58\, \mu {\rm rad}$. This would require feature sizes of the segments of only 0.3% of the total aperture diameter and could become rather difficult to manufacture. Alternatively, we can express the maximum angle for a given minimum size of $\Delta \theta$:

(18)$$\theta_{\max}< \left({\epsilon \lambda\over 2 \pi C_s \Delta\theta }\right)^{1/3}.$$

This leads to 5.8 mrad for $\Delta \theta = 1$ mrad, giving us the maximum aperture angle we can correct with a flat phase within the given error $\epsilon$.

First-Order Phase Correction

If, on the other hand, we allow for first-order correction in each phase segment, meaning a linear projected potential ramp in the radial direction and thus requiring at least two independent potential electrodes per segment, the situation changes. In this case, the phase could be corrected up to first order and we get as phase error:

(19)$$\chi\vert _{\theta_i}( \Delta \theta) < \epsilon,$$

(20)$${\pi\over \lambda}\vert \left(-\Delta f + 3 C_s \theta_i^2 \right)\vert {\Delta\theta}^2 < \epsilon,$$

(21)$$\Delta\theta < \sqrt{{\epsilon \lambda\over \pi\left(\Delta f + C_s 3\theta_i^2\right)}}.$$

We choose $\Delta f = 0$ , which yields:

(22)$$\Delta\theta < \sqrt{{\epsilon \lambda\over 3 \pi C_s \theta_i^2}}.$$

For a typical $C_s = 1\, {\rm mm}$, $\theta _i = 15\, {\rm mrad}$, and $\epsilon = {2\pi }/{10}$, we get $\Delta \theta < 0.76\, {\rm mrad}$ which is ${\approx }13$ times larger as compared with zeroth-order correction. Following the steps of the previous section, we can express the maximum angle for a given minimum size of $\Delta \theta$:

(23)$$\theta_{\max}< \sqrt{{\epsilon \lambda\over 3 \pi C_s \Delta\theta ^2}}.$$

This leads to 11.46 mrad for $\Delta \theta = 1\, {\rm mrad}$, nearly double its zeroth-order counterpart.

We give a simplified sketch of the main building blocks needed to make up for both a zeroth- and first-order phase-shifting elements in Figure 2. Furthermore, we show a plot of equations (17) and (22) in Figure 3 for two different phase errors $\epsilon$. To put this into perspective, we give the resolution ranges for some manufacturing techniques (shaded regions).

Fig. 2. Sketch of zeroth- and first-order phase element as the main building blocks of an array of programmable phase-shifting segments.

Fig. 3. Minimum $\Delta \theta$ needed to correct for $C_{s}$ as a percentage of the total aperture for different phase errors $\epsilon$ (left axis, log scale). These can be translated to minimum segment feature sizes when assuming a total aperture diameter of $70\, \mu {\rm m}$ (right axis). The shaded regions (green, violet, red) show approximated region where photolithography, extreme ultra violet (EUV) lithography, and electron beam lithography (EBL) would be required to make such features (Engstrom et al., Reference Engstrom, Porter, Pacios and Bhaskaran2014).

In order to translate the previous results to meters, we can take a scaling factor to relate angle (mrad) and physical distance (meters), assuming that the widest area we can coherently illuminate is in the order of $100\, \mu {\rm m}$ (so, despite the maximum aperture angle $\theta$, we still illuminate the same area in meters). With this in mind, and looking at the right axis scale on Figure 3, we can get a value for the physical dimension corresponding to the minimum $\Delta \theta$ needed to keep the phase error under a specific error ($\epsilon$).