This application is based upon and claims the benefit of priority from the prior Japanese Patent Application No. 2002-253647, filed on Aug. 30, 2002; the entire contents of which are incorporated herein by reference.
1. Field of the Invention
The present invention relates to a method in which a material is irradiated with an electron beam to produce a higher order Laue zone line of a pattern unique to the material and in which a lattice constant is determined from this higher order Laue zone line, a method of evaluating strain and stress by the use of the method, and an electron microscope suitably used for the method.
2. Description of the Related Art
In general, among main methods of evaluating the state of strain and stress in a material are a strain gauge method, an X-ray diffraction method, a Raman spectroscopy, an FTM method (T. Ide et al., Jpn. J. Appl. Phys. Vol. 37(1998), L1546), and a convergent beam electron diffraction (CBED) method (M. Tanaka and M. Terauchi, Convergent Beam Electron Diffraction, JEOL, Tokyo, 1985). Of these analytical methods, only the CBED method can detect a change in a lattice constant not larger than 10−3 nm in an extremely microscopic region not larger than 10 nm. In particular, the state of stress and strain in an extremely microscopic region of about from 1 to 2 nm can be evaluated by the use of a field emission transmission electron microscope (FE-TEM).
In the development of a semiconductor device and the like, prime importance is placed on the evaluation of stress and strain by the CBED method because of an excellent spatial resolving power. In the CBED method, positions where a plurality of higher order Laue zone lines (HOLZ line) develop are correctly read and the lattice constant of a crystal is calculated from a positional relationship between the HOLZ lines thereby to valuate the stress and strain.
Then, an electron beam is easily entered into a single crystal such as a Si wafer from a specific crystal orientation and the lattice constant can comparatively easily calculated from the positional relationship between the HOLZ lines (for example, Stuer et al., J. Electrochem. Soc. Vol. 148 (2001), G597). However, in a case of evaluation of a polycrystal, the crystal orientations of respective crystal grains are not aligned in one direction, so that it is impossible even to align the incident directions of the electron beam. Against such a background, the evaluation of the polycrystal becomes such a work requiring an enormous amount of time and manpower that records the patterns of HOLZ lines unique to respective crystal grains and uniquely analyzes the patterns one by one to calculate lattice constants thereby to evaluate the stress and strain of each crystal grain.
Thus, in a case where the CBED method is applied to an actual polycrystalline material, a crystal grain having a specific crystal orientation is selected and only the selected crystal grain is evaluated (see Japanese Patent Application Laid-Open No. 7-286915 and the like). At present is required a method of analyzing a HOLZ line of an arbitrary crystal grain of various kinds of crystalline materials with an excellent spatial resolving power of about from 1 to 2 nm and speedily calculating its lattice constant.
That is, there has been conventionally presented a problem of speedily evaluating stress and strain existing in an arbitrary crystal grain existing in an arbitrary polycrystalline material with an excellent spatial resolving power of about from 1 to 2 nm.
The invention provides an electron microscope that irradiates a material with an electron beam to obtain a pattern of a higher order Laue zone line unique to the material and identifies a lattice constant from this higher order Laue zone line, a method of detecting a change in a lattice constant not larger than 10−3 nm by the use of the electron microscope and keeping a spatial resolving power of from 1 to 2 nm and evaluating stress and strain in an arbitrary crystal grain in an arbitrary polycrystalline material, and a method of mapping evaluation results on a two-dimensional monitor.
The above-mentioned invention has been completed on the basis of the following findings.
That is, in a case where it is assumed that a lattice constant at a room temperature (25° C.) of an arbitrary material is a0, usually, a higher order Laue zone line (hereinafter referred to as “HOLZ line”) pattern under an effective acceleration voltage can be fundamentally calculated by a kinetic diffraction theory (Tomokiyo et al.: Electron Microscopy, Vol. 24 (1989), 90).
First, a HOLZ line pattern for a lattice constant of a0+Δa in a crystal orientation of [H1K1L1] (hereinafter referred to as “pattern (+)) is calculated under a condition of an effective acceleration voltage. Next, a HOLZ line pattern for a lattice constant of a0−Δa in the same crystal orientation of [H1K1L1] (hereinafter referred to as “pattern (−)) is calculated. Δa0 is an arbitrary microscopic change and is desirably set at one point in a range of 0.01 nm≦Δa≦0.05 nm, for example. A HOLZ line of an index hkl existing in the pattern (+) and the pattern (−) can be linearly approximated and expressed by the following equations (4) and (5) on an x-y plane.
y=fhkl(x, a0+Δa)=α(+)hkl·x+β(+)hkl (4)
y=fhkl(x, a0−Δa)=α(−)hkl·x+β(−)hkl (5)
Here, in a case where α(+)hkl>α(−)hkl and β(+)hkl>β(−)hkl, assume that parameters S (equation (6)) and T (equation (7)) are expressed by the equations.
Shkl(1)=(α(+)hkl−α(−)hkl)/2Δa (6)
Thkl(1)=(β(+)hkl−β(−)hkl)/2Δa (7)
At that time, αhkl(1)(a) and βhkl(1)(a) are set for an arbitrary lattice constant of “a” in the following equations (equation (8) and equation (9)).
αhkl(1)(a)=Shkl(1)·a+(α(+)hkl+α(−)hkl−2Shkl(1)·a0)/2 (8)
βhkl(1)(a)=Thkl(1)·a+(β(+)hkl+β(−)hkl−2Thkl(1)·a0)/2 (9)
An arbitrary HOLZ line of an index hkl for the orientation of [H1K1L1] is expressed by the equation (10).
y=fhkl(1)(x,a)=αhkl(1)(a)·x+βhkl(1)(a) (10)
Similarly, in a case where a convergent electron beam is entered in an arbitrary orientation of [HnKnLn], an arbitrary HOLZ line of an index hkl for the arbitrary orientation of [HnKnLn] is expressed by the equation (11).
y=fhkl(n)(x,a)=αhkl(n)(a)·x+βhkl(n)(a) (11)
A lot of information of developing positions of the HOLZ lines expressed by these equations is stored as a set of data (data library) in a storage device. The storage device and the data library are connected to a scanning transmission electron microscope which is a convergent electron irradiation apparatus to make it possible to refer to the accumulated data. In this manner, the lattice constant of a material to be measured can be speedily determined.
An example of an electron microscope which is a lattice constant determining apparatus for use in the invention will be described with reference to FIG. 1.
In
The above-mentioned image forming unit 15 is used for forming an image of the electron beam diffracted by the test sample. In the image forming unit 15, an electron beam is applied to a photosensitive material such as a scintillator and an optical image emitted from the scintillator can be converted into data which can be processed as image information by the use of a photosensitive device such as a CCD by the processing unit 16.
The above-mentioned electron microscope will be described in more detail by the use of
In
Next, a method of determining the lattice constant of the test sample by the use of such a processing apparatus will be described with reference to
First, a standard sample 32 whose lattice constant is found is prepared and irradiated with a convergent electron beam 31 by the use of the apparatus shown in
Next, as shown in
Next, the library 37 is searched for a HOLZ line pattern most similar to each image of individual HOLZ line patterns corresponding to a plurality of sample positions recorded in this manner and the lattice constant of the test sample to be measured is determined from the lattice constant stored in the library 37 in correspondence with the most similar HOLZ line pattern.
The same processing is performed in this manner to each of the HOLZ line patterns obtained and continuously recorded in correspondence with the surface positions of the test sample by scanning the surface positions of the test sample thereby to determine the lattice constants for all the patterns and the results are two-dimensionally displayed (mapped) on a display or the like. This maps a relationship of size between the lattice constants and is equivalent to a two-dimensional display of a strain distribution in the polycrystalline material. When this is converted into stress and again two-dimensionally displayed, a stress mapping in the polycrystalline material is obtained. As for a method of converting the strain into the stress, an elastic dynamics shown in “Introduction to Solid State Physics” authored by C. Kittlel (John Wiley & Sons, Inc., New York, 3rd edition, Chapter 4) can be used as a standard technology.
Next, one example of applying a material evaluation method of the invention to the evaluation of the stress and strain of the polycrsytal Si will hereinafter be described in detail.
First, it is assumed that the incident orientation [H1K1L1] of the convergent electron beam is [100]. HOLZ line patterns calculated for Δa=0.04 nm according to the kinetic diffraction theory are shown in
Next, in a case where [H2K2L2]=[110], similarly, HOLZ line patterns for a lattice constant of a0+Δa and a lattice constant of a0−Δa are determined by calculation and a HOLZ line pattern for an arbitrary lattice constant of “a” can be calculated.
In this manner, the HOLZ line pattern for an arbitrary incident orientation of [HnKnLn] is stored as a library. On the other hand, one HOLZ line pattern is shown in
Here, in the invention, in the HOLZ line pattern obtained by irradiating the test sample with the convergent electron beam, the number of observed HOLZ lines is different, depending on the amount of energy of the convergent electron beam to be applied. Thus, it is necessary to make the amount of energy of the convergent electron beam applied to the standard sample for making a data library equal to the amount of energy of the convergent electron beam applied to the test sample to be measured.
Further, a well-known method such as pattern recognition can be used for comparing the HOLZ line pattern of the standard sample which is the data library with the HOLZ line pattern of the test sample to be measured.
As shown above, according to the invention, it is possible to evaluate a stress and strain distribution in an arbitrary polycrystal material with a spatial resolving power of from 1 to 2 nm. A method of evaluating stress and strain of a polycrystal with a high accuracy and with a high spatial resolving power in accordance with the invention can be applied to the development of a semiconductor device and various kinds of materials.
Number | Date | Country | Kind |
---|---|---|---|
2002-253647 | Aug 2002 | JP | national |
Number | Name | Date | Kind |
---|---|---|---|
6447960 | Yamashita et al. | Sep 2002 | B2 |
6593153 | Matsuda et al. | Jul 2003 | B2 |
6750451 | Koguchi et al. | Jun 2004 | B2 |
20040075055 | Soeda | Apr 2004 | A1 |
Number | Date | Country |
---|---|---|
7-167719 | Jul 1995 | JP |
10-162768 | Jun 1998 | JP |
Number | Date | Country | |
---|---|---|---|
20040094714 A1 | May 2004 | US |