Introduction
There have been many attempts to improve the resolution of electron microscopes. Transmission electron microscopes are normally limited in resolution by a balance between the diffraction limit (which could be overcome by the use of a large objective aperture) and the spherical aberration of the lenses used (which could be overcome by the use of a small objective aperture). In recent years successful attempts have been made to achieve resolutions beyond this limit by holography [Reference Gabor1, Reference Volkl, Allard and Joy2] and also by the development of aberration correctors [3].
In this paper we bring together two concepts (each of them well-known) to propose a new method of achieving image resolution in scanning transmission electron microscopy (STEM) that goes beyond the resolution of these existing methods. The two elements that combine to make the new technique possible are the appearance of singularities in the caustics, which are formed in waves that are subject to random phase shifts, and the imaging of detail well below the size of the image-forming probe when the probe contains fine-scale structure.
Resolution in a Scanned Image
It is well known that in a scanned image, the resolution in the image can be much better than the overall size of the probe. In a scanning electron microscope (SEM), for example, the signal leaves the sample from an area corresponding to the interaction volume, but the detail seen in the image can be orders of magnitude smaller than the interaction volume [Reference Goldstein, Newbury, Echlin, Joy, Lyman, Lifshin, Sawyer and Michael4]. In more general terms, information may be seen in an image on a scale that is related to the maximum slope of the spatial variation of the intensity of the probe, not the overall size of the probe [Reference Batson, Johnson and Spence5]. Therefore to achieve high-resolution images, we do not need a probe with a size equal to the resolution sought. We need only a probe that contains a strong local intensity fluctuation on the scale of the resolution.
Caustics in Randomly Scattered Waves
When waves are focused to form a small probe, they are subject to fields that are deliberately made very symmetrical. However, if waves are scattered by a more random scattering potential, the result is the production of caustic surfaces [Reference Berry and Nye6]. These caustic surfaces are described by catastrophe theory [Reference Berry and Upstill7]. The conclusion of studies in this field is that in the fairly-near field of the waves scattered from a random potential, there will be caustic maxima (see figure 1). These maxima have a sharpness that would be infinite in geometric optics but in a wave theory approach can be shown to be broadened by the wavelength [Reference Berry and Upstill7].
The Principle of the Technique
The principle of the proposed technique is that a coherent electron beam illuminates a very thin amorphous film of a light element. This acts as a scattering potential to produce a randomly phase shifted wave. The exit wave from this phase-shifting film is a wavefront with random variations in phase on the scale of atomic diameters and below.
As this wavefront propagates, caustics will form, including places where a caustic peak is locally much smaller than the atomic size, limited only by the wavelength of the electrons. This caustic peak will be surrounded by a much larger area of electron wave but with essentially no significant structure. We imagine that the beam falling on the amorphous phase-shifting film is limited in diameter so that the likelihood of more than one caustic in a given plane is negligible. In this plane below the phase-shifting film, the sample to be studied is placed and scanned under the probe by a piezoelectric drive similar to those used for atomic force microscopes. The image of the sample under investigation is thus as sharp as the caustic peak in the probe but with an added diffuse background formed by the skirt surrounding the caustic peak. We coin the term Wavelength High-Energy Electron Localization for this new technique.
Figure 2 shows a schematic diagram of the apparatus. A thin amorphous film (A) imposes random phase shifts, as a function of lateral position, on the incident electron wave. The wave field below A contains caustics produced by these phase shifts. Thus the electron wave field that is incident on the sample (B) is a large diffuse patch crossed by bright caustics. The transmitted beam then contains information on the sample, B, down to a resolution corresponding to the size of the caustic in the illumination.
At any height of the sample, the electron wave field will contain caustics that are basically lines similar to those in Figure 1. However in certain planes below A, the wave field will contain singularities [Reference Berry and Upstill7]. In such planes the intensity will be extremely bright in a local region, rather than moderately bright along a line. If the sample, B, is located in such a plane, the image will resolve detail down to the size of the singularity.
There is no way (that we are aware of) that would allow us to examine the wave field formed by the phase-shifting sample to see directly the caustics formed. We anticipate that the sample to be studied would be moved along the beam direction, looking to see fine detail in the images produced until a caustic singularity is found through observation of fine detail in the image.
There are two apparent difficulties. On the one hand the imaging probe will have the complex shape of a caustic singularity, rather than the Gaussian shape of an “ideal” probe. On the other hand there will be no way to check that there is just one singularity. Both of these problems have straightforward solutions, but, for reasons of space, it is not appropriate to give them here.
Comparison with an Earlier Method
When a lens is used to focus a beam, the process may be thought of as producing a caustic, but one in which, because of the symmetries so painstakingly imposed on the fields, the caustic is highly degenerate, rather than one of the structurally stable singularities that result from unsymmetric scattering. Thus, when Cowley and others suggested that resolution could be enhanced by putting an atom (one atom) into the electron beam, they were proposing one special case of the present method, albeit one that seems impossible to realize [Reference Cowley, Spence and Smirnov8].
Conclusion
We propose a new method for obtaining much higher resolutions than can be obtained with current instrumentation. It seems plausible that, if the requisite stabilities can be achieved, direct imaging should be readily obtained that is an order of magnitude better than present results.
See page 68 for a note added in proof.