International Archives of the Photogrammetry, Remote Sensing and Spatial Information Sciences, Volume XXXIX-B7, 2012
XXII ISPRS Congress, 25 August — 01 September 2012, Melbourne, Australia
deformation velocities between two neighbouring persistent
A(x, ,x,,t,)=k, -VAq(x,,x,)- B, mk, - Av(x, ,x, )- t, * Lr)
t,) is the NDP of neighboring
sat
Where, Ad(x, +X
persistent scatters X, and X,. f;, is time baseline of
: Ax ;
interferogram Z , i-1,2,...... ,N. k, sr, is
AR sin c
wave length, A is slant range from SAR to target, @ is
incidence angle. VAq(x,,x,) is the difference of terrain
errors between two neighboring PSs. B. is the normal
UE
A
Av(x 2s ) is the difference of linear deformation velocities
baseline of interferometric image 7
k,
between neighboring PSs. $, es (x p», ) is phase residues.
st;
It's the contribution of residual atmospheric delays, no-linear
deformations and decorrelations.
For N time serial NDPs of every pair of persistent scatters, the
sets of N equations such as (1) are generated. Because residual
phase $, " (x, Xf ») changes with time, the equation sets
are a nonlinear system, i.e., rank deficiency. Under the
condition of Du (x rad d A < 77 , the equation sets can be
resolved. The VAdq(x, , x 3 and As +) can be
estimated with bi-dimensional periodogram (Ferretti et al.
2000a, Colesanti et al. 2003) or solution-space search method
(Luo et al. 2011c). Then the deformation velocities of all
persistent scatters can be deduced with the network adjustment
(Liu et al. 2008) or by integrating along the arc of network
(Ferretti et al. 2000a, Colesanti et al. 2003). Furthermore, the
nonlinear deformations of persistent scatters and atmospheric
phase screen (APS) with respect to singular SAR image or
interferogram are filtered out from the NDPs. Finally, the time
serial deformations of all persistent scatters and regional
deformation field can be deduced.
The accuracy of deformations estimated from NDPs depends
on the degree that atmospheric delays and decorrelations are
removed from NDPs. As long as two neighbouring persistent
scatters defined by network are adjacent to the greatest extent
in the geography space, most of atmospheric delays and
decorrelation errors will be eliminated from the two
neighbouring persistent scatters. So an appropriate network and
Inet
Range
(a) (b)
Figure 1. The PS neighborhood variation from
geography space to image space
58
scatters. This function can be expressed as following equation,
(I)
optimal neighbourhood are crucial to persistent scatter InSAR.
In order to achieve this goal, the three-dimensional persistent
scatter Delaunay network is presented.
3. THREE-DIMENSIONAL PERSISTENT SCATTER
DELAUNAY NETWORK
3.1 The problem of persistent scatter planar network
Persistent scatter planar network is a two-dimensional network
constructed based on image planar coordinates. The structure of
planar network is seriously affected by SAR projection and
image resolution. On the one hand, the azimuth resolution of
SAR images is usually higher than slant range resolution. That
means the real geography landscape will be stretched in radar
flight direction, i.e., azimuth direction while landscape is
imaged by SAR. By contrast, the target space relationship
defined by the network established in geography space will be
different from that derived from image space because the sites
and space relationship of targets vary with the scene conversion
from geography space to image space. Figure 1 indicates the
variation of target relationship from geography space to image
space. Figure (a) is the Delaunay network of four persistent
scatter targets in geography space and figure (b) shows the
Delaunay network in image space. The persistent scatter B and
D are connected in geographic Delaunay network but the link is
cut in image space. On the other hand, the SAR image
distortions such as foreshortening produced by radar slant
range projection may result in the false selection of
neighbouring persistent scatters. As figure 2 illustrates, because
of SAR image foreshortening, the ground distance D between
PS, and PS, is much longer than the range d computed with
image resolution. The foreshortening ratio ((D-d)/D) increases
with the decrease of local incidence angle. When the local
incidence angle is zero, foreshortening ratio gets to its extreme,
i.e., the whole slope is imaged as a point. The foreshortening
causes that the real geography distance of two neighbouring
persistent scatters selected according to 1km interval is usually
much longer than 1km. So some persistent scatter pairs with
longer than 1km in geographic space, called false persistent
scatter pairs exist in persistent scatter planar network
constructed based on image coordinate system. The NDPs of
false persistent scatter pairs remain atmosphere residues that
will correspondingly mitigate the accuracy of persistent scatter
InSAR.
Figure 2. The slant range projection
illustration of SAR
