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PII: S0169-4332(98)00524-8
Copyright Š 1999 Published by Elsevier Science B.V. All rights reserved


    Surface roughness of thin layersŻŻa comparison of XRR and SFM
    measurements

O. Filiesa <#orfa>, O. Bölinga <#orfa>, K. Grewera <#orfa>, J. Lekkib
<#orfb>, * <#cor*>, M. Lekkab <#orfb>, Z. Stachurab <#orfb> and B.
Cleffa <#orfa>

a Institute of Nuclear Physics, University of Münster, Münster, Germany
b Institute of Nuclear Physics, Radzikowskiego 152, 31-342 Cracow, Poland

Received 29 May 1998; accepted 12 August 1998. Available online 10 March
1999.


    Abstract

X-ray reflectivity (XRR) studies of thin layers (3 to 120 nm thick) were
performed for the determination of layer thickness, density and
roughness. The simulations of X-ray reflectivity measurements were
performed using Parrat's recursive algorithm, while those of the
reflection of X-rays from interfaces were performed using Fresnel
formulae. Using this approach, the roughness of the interface was
described by intensity damping by gaussian type functions. This allowed
for the determination of layer thickness and density and average
interface roughness. As an extension of this simple model, an enhanced
theoretical description of rough interfaces proposed by Sinha was
applied, where the X-ray reflection from interfaces was separated into a
direct fraction and a diffuse scattered one with the use of the first
Born approximation. A simulation procedure, calculating both fractions
of the reflection was developed, that enabled the detailed
characterisation of layers and inner layers. The complementary
information required for proper adjusting of input simulation parameters
was obtained from SFM measurements of the investigated surfaces. Surface
roughness was described using fractal surface functions instead of
simple gaussian peaks. A comparison between this method and SFM
measurement shows a reasonable agreement, particularly in the estimation
of shapes of interface structures.

Author Keywords: X-ray reflectivity (XRR); SFM; Thin layers; Surface
roughness; Fractal surface scaling


    Article Outline

1. Theoretical background
2. Interface roughnessŻŻNévot's model
3. Fractal approachŻŻSinha's model
4. Experimental
5. Conclusion

References


Enlarge Image
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(4K)
Fig. 1. The idea of the recursive approach: X-rays coming from medium 0
(air or vacuum) are scattered and deflected at the first interface
(medium 1). The scattered fraction is again scattered and deflected at
the next interface. This mechanism is reproduced until the last
significant layer is reached. Every reflected fraction interferes with
fractions reflected at previous interfaces, producing finally a
measurable pattern.

Enlarge Image
</science?_ob=MiamiCaptionURL&_method=retrieve&_udi=B6THY-3W07WNW-P&_image=figFig.2&_ba=2&_user=875668&_coverDate=03%2F31%2F1999&_rdoc=19&_fmt=summary&_orig=browse&_srch=%23toc%235295%231999%23998589996%2375117!&_cdi=5295&_acct=C000046981&_version=1&_urlVersion=0&_userid=875668&md5=ae543539d8fef356c82fc9b0330cec82>
(5K)
Fig. 2. Interface roughness according to Névot. The distribution of
peaks and valleys on a mean interface level is described using the
gaussian function and its small sigma, Greek parameter.

Enlarge Image
</science?_ob=MiamiCaptionURL&_method=retrieve&_udi=B6THY-3W07WNW-P&_image=figFig.3&_ba=3&_user=875668&_coverDate=03%2F31%2F1999&_rdoc=19&_fmt=summary&_orig=browse&_srch=%23toc%235295%231999%23998589996%2375117!&_cdi=5295&_acct=C000046981&_version=1&_urlVersion=0&_userid=875668&md5=2880868785e4f45f2665447eb44cf3ce>
(12K)
Fig. 3. TOF-RBS spectra of Co/Ag thin layers deposited on a Si substrate
at 10°C (left) and 130°C (right). The measured mass density values are
shown in figure insets (numbers in parentheses represent values expected
from deposition conditions).

Enlarge Image
</science?_ob=MiamiCaptionURL&_method=retrieve&_udi=B6THY-3W07WNW-P&_image=figFig.4&_ba=4&_user=875668&_coverDate=03%2F31%2F1999&_rdoc=19&_fmt=summary&_orig=browse&_srch=%23toc%235295%231999%23998589996%2375117!&_cdi=5295&_acct=C000046981&_version=1&_urlVersion=0&_userid=875668&md5=3e1949fc9671fc01927d661ad6bfb9ee>
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Fig. 4. XRR spectra and simulations performed according to Névot's and
Sinha's algorithms for the following layers deposited on a Si substrate:
(a) 7.3 nm Co/4.4 nm Ag double layer (Table 1 <#tbl1>, sample 1), (b) 96
nm Al/16 nm Ti double layer (sample 9), (c) 19 nm single In layer
(sample 5), (d) 21 nm single Sn layer (sample 8). Layers' thickness were
obtained from simulation following either Névot's or Sinha's model.

Enlarge Image
</science?_ob=MiamiCaptionURL&_method=retrieve&_udi=B6THY-3W07WNW-P&_image=figFig.5&_ba=5&_user=875668&_coverDate=03%2F31%2F1999&_rdoc=19&_fmt=summary&_orig=browse&_srch=%23toc%235295%231999%23998589996%2375117!&_cdi=5295&_acct=C000046981&_version=1&_urlVersion=0&_userid=875668&md5=91412a328679e8b84a3ab837affb374f>
(26K)
Fig. 5. Topography of four samples presented in Fig. 4 <#figFig.4>
measured using SFM in air.

Enlarge Image
</science?_ob=MiamiCaptionURL&_method=retrieve&_udi=B6THY-3W07WNW-P&_image=figFig.6&_ba=6&_user=875668&_coverDate=03%2F31%2F1999&_rdoc=19&_fmt=summary&_orig=browse&_srch=%23toc%235295%231999%23998589996%2375117!&_cdi=5295&_acct=C000046981&_version=1&_urlVersion=0&_userid=875668&md5=3ad3f145d5ebd71bd676a17ada1748bd>
(26K)
Fig. 6. A comparison of surface fractal scaling properties of four
example surfaces (Fig. 4 <#figFig.4> and Fig. 5 <#figFig.5>) measured
using SFM (directly) and XRR (simulation according to Sinha's model).

Table 1. The comparison of roughness parameters obtained for several
selected samples from XRR and SFM measurements View Table
</science?_ob=MiamiCaptionURL&_method=retrieve&_udi=B6THY-3W07WNW-P&_image=tbl1&_ba=7&_user=875668&_coverDate=03%2F31%2F1999&_rdoc=19&_fmt=summary&_orig=browse&_srch=%23toc%235295%231999%23998589996%2375117!&_cdi=5295&_acct=C000046981&_version=1&_urlVersion=0&_userid=875668&md5=8a8d5b094b01dfb05d708644b22a67c8>
(<1K)


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* <#bcor*>Corresponding author. Tel.: +48-12-637-0222 ext. 271; Fax:
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