3.1.

Kirk Method

The Kirk method, which is also called the disappearing pad test, was first proposed by Kirk.¹¹ It is the most widely used flare test method now due to its simplicity. Island features (pads) are used in this method, as shown in Fig. 2(a). One isolated absorber pad is placed in a large bright field, which in the case of EUVL is an area of multilayer (ML) reflection. The area covered by the absorber is a dark area and all other areas are bright. Figure 2(b) shows a large bright field surrounded by a dark field. $I_D$ and $I_B$ are the normalized light intensity in centers of dark and bright fields, respectively. $r_D$ and $r_B$ are the coordinates in the dark and bright fields, respectively. In an ideal case, $I_D=0$ and $I_B=1$ if we neglect diffraction. In the flare case, some light is scattered from the bright area to the dark area, resulting in $I_D>0$ and $I_B<1$. The increase in $I_D$ is due to flare, and the decrease in $I_B$ is due to the energy loss from scattering. The only way for the light to reach the center absorber pad area in Fig. 2(a) is via flare. Thus, flare information can be extracted from the knowledge of $I_D$ and $I_B$.

Fig. 2

Plots of (a) a dark field surrounded by bright field and (b) a bright field surrounded by a dark field, respectively, on the mask and the corresponding aerial image light intensities with and without flare.

Suppose $E_{\text{resist}}$ is the dose received by the resist that can clear the resist completely. $E_B$ and $E_D$ are the doses incident on the whole reticle which can clear the resist in the bright and dark fields, respectively. The parameters $t_B$ and $t_D$ are the exposure times to clear the resist in the bright and dark fields, respectively. $I_{\text{reticle}}$ is the light intensity incident on the whole reticle and is a constant. $E_{\text{resist}}$ in the bright and dark fields satisfies the relations: $E_{\mathrm{resist}}=E_B(E_{\mathrm{resist}}/E_B)=E_B[(E_{\mathrm{resist}}/t_B)/(E_B/t_B)]=E_B(I_B/I_{\mathrm{reticle}})$ and $E_{\mathrm{resist}}=E_D(E_{\mathrm{resist}}/E_D)=E_D[(E_{\mathrm{resist}}/t_D)/(E_D/t_D)]=E_D(I_D/I_{\mathrm{reticle}})$. From these relations, we have $I_D/I_B=E_B/E_D$, which is the definition of the Kirk flare (KF), the dose need to clear the resist in a large bright area divided by the dose need to clear the resist under an absorber pad. Combining Eqs. (1), (2), and the definition of KF, KF can be written as

A thin EUV mask absorber film is commonly used in order to minimize the HVPD. The residual EUV reflection from the absorber can be as much as 1% to 2% of the total EUV reflection light.²⁴ The EUV light source generally contains not only EUV, but also DUV light. Even with the insertion of spectral purity filters, a few percent of DUV light still remains. It can be reflected by the EUV mask and interacts with the resist. This problem is called Out-of-Band (OoB) radiation.²⁵ Since absorber EUV and OoB direct reflections are of the same magnitude as flare, they will be considered in the derivation. But the scattering of these two terms will be neglected, because they are too small to be compared with flare. Define $I_0(r_D=0)=I_{\mathrm{abs}}+I_{\mathrm{OoB}}$, where $I_{\text{abs}}$ and $I_{\text{OoB}}$ are the light intensity from absorber EUV and OoB reflections, respectively. $I_{\text{abs}}$ and $I_{\text{OoB}}$ are neglected in $I_B$, because they are only a few percent of $I_B$.

The island features used for the Kirk method include squares, bars, and circular pads. The circular pad is most popular because of the rotational symmetry of the PSF and because of the calculational simplicity. The circular absorber pad is usually placed in a circular bright field which consists of a donut pattern. Figure 3 shows the donut pattern and the large bright field surrounded by a dark field used in the Kirk method, where $r_0$ and $r_1$ are the inner and outer radii of the donut, respectively. $r_2$ is the radius of the large bright field.

Fig. 3

(a) Donut pattern and (b) large bright field used in Kirk method.

Linear $I_0$ terms appear in both the nominator and denominator in Eq. (4); thus normalized $I_0$ can be used in this case. For simplicity, we assume $I_0=1$ in a bright field and $I_0=0$ in a dark field in the ideal case, since scattering of absorber EUV and OoB reflections have been neglected. Flare-induced image blur intensity in the nominator of Eq. (4) can be written as

If $r_2$ is sufficiently large ($r_2\to \infty$), the convolution and the TIS in the denominator of Eq. (4) will cancel. In practice, the selection of $r_2$ is also dependent on the PSF. Usually it needs to be larger than several millimeters to satisfy this approximation. With the $r_2\to \infty$ approximation, KF can be written as

If the flare level is very small, for example, when the flare level is around 2% to 3% as is the case in DUVL, TIS can be regarded as much smaller than 1 and the ($1-\mathrm{TIS}$) term can neglected in Eq. (8). The approximated KF is shown in Eq. (9).

Since the fractal model is the most popular PSF model, a double-fractal PSF model is used in the rest of derivation, as shown in Eq. (10). It can be simplified into a single-fractal model by making $K_2=0$.

Combining Eqs. (8) and (10), KF can be written as

Equations (11) and (12) are used to calculate PSF from KF. If a thick mask absorber is used, the absorber reflection term, $R_{\mathrm{abs}}/R_{\mathrm{ML}}$, can be neglected in Eq. (11). It can also be estimated from simulation or measured directly when a thin absorber is used. When KF is measured on a large dark field, which is the case with no flare ($K_1=K_2=0$), the first term in Eq. (11) can be measured directly. After considering the absorber reflection term, the OoB term, $I_{\mathrm{OoB}}/I_{\mathrm{ML}}$, can be estimated. After the first term in Eq. (11) is determined, PSF and TIS can also be calculated.

The OoB is usually measured with metal blades²⁶ or with a metal-coated mask.²⁷ From Table 1 in Ref. 27, 96% of the OoB is reflected from aluminum while almost no EUV light is reflected. At the same time, 60% and 39% of OoB can be reflected from the ML and the absorber, respectively. Although an aluminum-coated mask is a good option to measure OoB, a normal EUV mask with a large absorber area can also be used to estimate OoB taking into account the ratio result from Lorusso et al.²⁷ The OoB measured from aluminum indicates the total OoB in the EUVL system, while the OoB reflected from absorber and ML are closer to the real case, since the EUV mask absorption of OoB is included. The OoB from the absorber and the ML provides the lower and upper limits in cases where bright and dark fields are co-located on the mask.

One of the advantages of the Kirk method is its insensitivity to the type of resist used, because only the dose ratio is measured. Other advantages include simple pattern design and simple experimental technique. These advantages make the Kirk method the most popular flare measurement technique. There are two disadvantages of the Kirk method. One is that a large energy dose is required to measure a small KF. For example, if the $E_B$ is $10\mathrm{mJ}/{\mathrm{cm}}^2$, $E_D$ will be $1000\mathrm{mJ}/{\mathrm{cm}}^2$ for 1% KF, which places a heavy burden on an EUV exposure tool. The solution to this problem is to use a fast resist. A fast resist is usually too sensitive to print normal features, but it can be used with the Kirk method. The reported smallest $E_B$ is around $2\mathrm{mJ}/{\mathrm{cm}}^2$ (Ref. 26). If KF is about 1%, $E_D$ is only $200\mathrm{mJ}/{\mathrm{cm}}^2$, which is acceptable.

Resist metrology is also a problem for the Kirk method. The value for the dose-to-clear in a photoresist is traditionally determined by visually inspecting a series of CD SEM resist images exposed at different doses. Unfortunately, the value for the dose-to-clear determined by the visual inspection method is inevitably affected by person-to-person differences and a new method, independent of operator influence, is needed. Lorusso et al.²⁶ in 2009 proposed an automated algorithm to calculate $E_B$ and $E_D$. The contrast of the pad images was plotted as a function of dose. The dose-to-clear was defined as the dose when $\text{contrast}=0$ for the second time, as shown in Fig. 2 in Ref. 26. The contrast method was one of the nonvisual inspection methods for determining dose-to-clear and has been shown to work well in some cases.²⁶ However, because image contrast is affected by differences in the photoresist, under-layer coating material, postexposure baking conditions, and SEM settings, other experimental conditions may not yield the same results. LaFontaine et al. determined the dose-to-clear by the appearance of peaks of grating structures with scatterometry. However, this method can only be used with grating structures.¹⁷

In 2013, Sun et al. proposed a Fourier spectrum method to determine the dose-to-clear in a photoresist.²⁸ During dissolution, the exposed resist will reshape randomly or fragment into many small random shapes. The spatial frequency spectra of these random shapes are much different from those of the background noise images, which are SEM images of the resist when the resist has been completely dissolved. Since the Fourier spectrum method focuses on these random shapes instead of image contrast, it is not affected by the differences of resist, under-layer coating material, postexposure baking condition, and SEM settings, and results in a more general measurement method.

Discrete dose step will also induce metrology error. Suppose $E_j$ is used in an energy meander exposure, where $j=1$ to $n$, and $E_n$ is the final dose in the energy meander. The dose-to-clear lies between $E_j$ and $E_{j+1}$. Then, $E_{\text{dose-to-clear}}=(E_{j+1}+E_j)/2$, and the uncertainty is $\pm E_{\text{error}}$, where $E_{\text{error}}=(E_{j+1}-E_j)/2$. The relative error of the dose-to-clear is $[E_{\text{error}}/(E_{\text{dose-to-}\text{clear}})]=(E_{j+1}-E_j)/(E_{j+1}+E_j)$. The smaller the energy meander step, the smaller the error.

3.2.

MTF Method

Modulation transfer function (MTF) or contrast transfer function (CTF) methods were used to evaluate the performance of the projection optics in DUVL.¹⁴ In 2002, LaFontaine and other researchers measured flare with this method.^15,16,29 The MTF is measured directly at various spatial frequencies instead of the PSF measured in other methods. Since MTF and PSF create a Fourier pair, one can be converted into the other by a Fourier transform.

The modulation or contrast of an image is defined by

As discussed in Sec. 3.1, the light intensity ratio is equal to a dose ratio, $I_{\min }/I_{\max }=E_B/E_D$, where $E_B$ and $E_D$ mean the smallest dose-to-clear a bright field resist and the dose-to-clear a dark field resist, respectively. Combining Eq. (13) and this relation, the MTF is written as

Fig. 4

Optical micrograph of a 10-μm pitch grating used to measure modulation transfer function (MTF) in Ref. 15.

The MTF method was successfully used to measure flare in DUVL.¹⁵ However, it may not be suitable for EUVL for three reasons. The first reason is cross-linking, which is a problem caused by one polymer chain linking to another with bonds in photoresist. It can arise in bright fields at large doses and should be avoided in measurement. Since the bright and dark fields are alternatively placed in a grating, the cross-linking can affect measurement results at large doses. The second reason is that a large dose is required for low-frequency gratings. One line in a grating can be regarded as the absorber pad or bar in the Kirk method. This line is placed in a bright field which is filled with 50% dark field, assuming a 1:1 grating. Therefore, the dose needed to clear this line, which is also the dose-to-clear the grating, is doubled in the MTF method compared with the dose in the Kirk method. The optical source power is not a problem in DUVL; however, it remains a bottleneck in EUVL at the present time. The third reason is that absorber EUV and OoB reflections are not considered in the MTF method. Flare result will not be accurate if these two factors are comparable to flare.

Three gratings with different frequencies were exposed in the EUV Alpha Demo Tool (ADT) in Albany, New York, to test the validity of the MTF method. A fast resist, Rohm and Haas XP4502J, was coated at 150-nm thickness on the wafer. All the gratings had 1:1 duty cycle, which means that the trench CD is equal to the line CD. Grating pitches were 80 nm, 600 nm, and 35 μm, respectively, which correspond to high, middle, and low frequencies, respectively. Grating areas were $50\times 50{\mu \text{m}}^2$ for 80 and 600-nm pitch gratings, respectively, and $700\times 700{\mu \text{m}}^2$ for the 35-μm pitch grating. The dose was increased from 5 to $164\mathrm{mJ}/{\mathrm{cm}}^2$ in the experiment.

Figure 5 shows the CD SEM images of these gratings at various doses. The 80-nm pitch grating is shown in Fig. 5(a). It is clear that the grating image is removed completely at $8\mathrm{mJ}/{\mathrm{cm}}^2$ dose. Resist cross-linking occurs above $36\mathrm{mJ}/{\mathrm{cm}}^2$, but it does not affect the measurement result for this high-frequency grating. Figure 5(b) shows the CD SEM images of the 600-nm pitch grating. It looks as if the grating has been removed above $43\mathrm{mJ}/{\mathrm{cm}}^2$. However, it is not easy to tell exactly when the grating is completed removed, because cross-linking is present at this dose level. Figure 5(c) shows the CD SEM images of the low-frequency grating. The grating does not change too much even with doses as high as $164\mathrm{mJ}/{\mathrm{cm}}^2$. Cross-linking is not visible due to the low magnitude, although it is even worse at higher doses. A higher dose was not tested due to ADT productivity limits.

Fig. 5

Critical dimension scanning electron microscope (CD SEM) images of different frequency gratings at various doses. (a) High frequency grating, (b) middle frequency grating, and (c) low frequency grating.

The above test shows that it is easy to measure MTF at high frequency but not at middle and low frequencies in EUVL. Since low-frequency term determines the limits of the PSF curve in the spatial domain, it is easy to have orders of magnitude error with wrong low-frequency measurement results. For example, PSF converted from MTF was one order of magnitude smaller than that measured from mirror roughness in Ref. 29.

The MTF method is very similar to the Kirk method. It is also resist independent and relies on visual inspection to determine the dose. The difference is that the Kirk method is measured in the spatial domain, whereas the MTF method is measured in the frequency domain. One advantage of the MTF method is that it is not measured with an empirical PSF model but directly converted from the MTF data.

3.3.

Double-Exposure Method

The double-exposure method was proposed in 2001.^18,19 A reticle which contains a long thin line, e.g., 160-nm width, was initially exposed at a nominal dose. The line with 160-nm width should be imaged on the wafer after the first exposure, which is also called the imaging exposure. Then, another reticle is used for the second exposure on the same wafer, as shown in Fig. 6. This step is called the flare exposure. The only difference between the two reticles is that a thick line is used instead of the thin line at the same location. The width of the thick line is 1 to 16 times that of the thin line. The exposed thin line on the wafer should be covered by the thick line on the second reticle. If there is no flare, no light will be illuminated on the thin line on the wafer because of the thick line’s shadow on the second reticle. Then, the thin line width should not change. If there is flare, flare-induced light will illuminate the thin line on the wafer and induce a line width change from which the flare can be calculated.

Fig. 6

Two reticles used for double-exposure method.¹⁹

Thin-line CD change is measured as a function of dose in the flare exposure. Then, several local flare levels are input into lithography simulation software, e.g., PROLITH, and the thin-line CD change is simulated as a function of the flare exposure dose. The local flare level at which the experimental data and the simulation curve fit best can be determined as the final flare result. Figure 7 shows the experimental and curve fitting of the thin-line CD as a function of dose for a preproduction 193-nm scanner.¹⁹ A 6% local flare value was determined for that scanner.

Fig. 7

The experimental and curve fitting of the thin-line CD plotted as a function of dose in flare exposure for a preproduction 193-nm scanner.¹⁹

One of the advantages of the double-exposure method is that CD is directly measured instead of estimating via visual inspection of dose-to-clear as in the Kirk and MTF methods. Another advantage is that a small dose is used instead of a large dose, which is important when attempting to measure flare in a low-power EUV system. However, several reticles are used in the original design, which can increase the cost of the measurement. As an improved design, all the patterns can be on a single reticle. The reticle is shifted during the second exposure instead of employing a second reticle. Overlay, CD uniformity (CDU), and line edge roughness (LER) can affect the measurement result. This method is heavily dependent on the accuracy of the optical and resist models used in the simulation software. Only local flare level was measured using an old version of PROLITH in 2002, and the PSF may be simulated using more recent versions of the simulation software.

3.4.

ZRAM Method

The ZRAM was proposed in 2008.²⁰ Its principle is similar to that of the double-exposure method. Figure 8 shows ZRAM design.²⁰ It consists of a series of zonal rings and flare-sensing features in the center of the rings. Line and space patterns were used as the sensing features (gauging pattern) in Ref. 20. The circular area surrounding the gauging pattern is a bright field. The area outside the circular area is a dark field. The flare induced inside the circular area changes the line-width CD of the gauging pattern. Different circular radii correspond to different flare levels and different gauging pattern line widths.

Fig. 8

The zonal ring approximation method (ZRAM) design.²⁰

The reference gauging pattern is a gauging pattern placed in a dark field, and the other gauging patterns are in the zonal rings. A line/space grating is used as the gauging pattern in Ref. 20. The first experimental step is to expose the reference gauging pattern at various doses. Measurement of gauging pattern CD versus dose is used to create a look-up table. The second step is to expose all the zonal ring gauging patterns at a normal dose. The gauging pattern CD difference between reference gauging pattern and zonal ring gauging pattern is induced by the flare generated inside the zonal ring. The third is to convert the CD difference to dose using the Look-Up Table. The final step is to calculate the flare PSF based on the dose difference.

Assume $I_{\text{reticle}}$ is the light intensity incident on the reticle. $E_{\text{norm}}$ and $\mathrm{\Delta }E$ are the doses incident on the reticle at $t_{\text{norm}}$ and $\mathrm{\Delta }t$ time, respectively. They have the relations

If the CD on the reference gauging pattern and the zonal ring gauging pattern is the same, then the same amount of dose, $E^{\prime }$, is incident on the resist on these two patterns. Suppose the zonal ring gauging pattern is exposed with $t_{\text{norm}}$ time, the reference gauging pattern needs to be exposed with extra time $t_{\text{norm}}+\mathrm{\Delta }t$ to have the same pattern CD. Assume $I_2$ and $I_{\text{flare}}$ are the light intensity arriving at the wafer in the reference gauging pattern and the flare intensity from zonal ring, respectively. They have relationships

Combining Eqs. (2) and (15)–(18)

The ZRAM has the same advantages as the double-exposure method, e.g., CD measurement instead of visual inspection and use of a small dose instead of a large dose. The resist dependence is removed from ZRAM method, which is an improvement over the double-exposure method. The dose corresponding to the line-width CD difference is extracted using an experimental method, not calculated from a resist model. Of course, the double-exposure method can also remove the resist dependence using the reference CD-to-dose idea. CDU and LER can affect the measurement result. The short-range flare measurement may also be problematic. Since the gauging pattern is at the center of the zonal ring, addressing and auto-focusing patterns need to be located in the center of the zonal ring, too, as a requirement of the metrology. Thus, the center area inside the inner radius of the zonal ring should not be too small. More work needs to done on the metrology plan and the $I_2$ definition issue, as mentioned in the above paragraph, before an accurate PSF measurement can be made using the ZRAM technique.