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The '''Wide Area RTK''' concept was introduced in the late 1990s to address RTK deficiencies by the [http://www.gage.es/ Research Group of Astronomy and Geomatics (gAGE)] from the Technical University of Catalonia (UPC). The WARTK method increases the RTK/NRTK service area, with permanent reference stations separated by up to 500–900 kilometers, this implies requiring 100 to 1,000 times fewer baselines than RTK technique to cover a given region.<ref>[http://insidegnss.com/wide-area-rtk/ Hernández-Pajares, et al, ''Wide-Area RTK: High Precision Positioning on a Continental Scale'', Inside GNSS, March/April 2010.]</ref>
==WARTK Technique==
In [[RTK Fundamentals|RTK technique]] the differential ionospheric refraction on the signals typically limits the real-time ambiguity resolution (and the corresponding navigation with sub-decimeter errors) to baselines of few tens of km from the nearest reference site. The main techniques supporting this new approach, '''WARTK''', are related to an accurate real-time computation of ionospheric corrections, combined with an optimal processing of GNSS observables (carrier phases in particular) in both 2 and 3-frequency GNSS systems<ref>[http://www.gsa.europa.eu/wartk-based-egnos-and-galileo-technical-feasibility-study WARTK-EGAL Project]</ref>. The navigation can be performed with few centimeters of error at distances of hundreds of kilometers from the nearest reference station.
[[File:Wartk gAGEUPC.jpg|thumb|left|300px|'''Figure 1:''' WARTK Technique (image cortesy of gAGE/UPC)]]
Indeed, the Ionosphere produces ambiguity estimation biases and correlations whose mitigation is the main problem of several techniques such as [[RTK Fundamentals|LAMBDA method]]<ref name="Lambda">[http://espace.library.curtin.edu.au/cgi-bin/espace.pdf?file=/2012/05/29/file_1/185929 ''The least-squares ambiguity decorrelation adjustment: a method for fast GPS integer ambiguity estimation''] by P. Teunissen, 1995.</ref>, which takes into account these correlations in order to get reliable ambiguities for short baselines. With this RTK technique several thousands of reference receivers would be needed to provide service to Europe. To solve this limitation, WARTK provides to the users with a very accurate ionospheric refraction estimate to be removed from the user navigation filter equations. This was fulfilled by developing a very precise technique to compute ionospheric corrections in real-time using a 3-D voxel model of the ionosphere, estimated by means of a Kalman filter, and using exclusively GNSS data gathered from fixed receivers separated several hundreds of kilometers. In this way, just few dozens of fixed reference GNSS receivers are enough to ensure a sub-decimeter positioning service at continental scale, over Europe for example.<ref name="galgpsWARTK">M. Hernandez-Pajares, et al. ''Wide Area Real Time Kinematics with Galileo and GPS Signals'', Proceedings of the Institute of Navigation, Long Beach, California, 2004.</ref>
The WARTK central processing facility (CPF) (see Figure 1) uses, in a first step, a tomographic model of the ionosphere, that maps the ionosphere  at large scale in real-time with data measured by a network of permanent GNSS receivers. The second step of the technique is to characterize the ''medium scale traveling ionospheric disturbances'' (MSTID) that affect the users, specially at mid-latitude<ref>O. Colombo,et al, ''Ionospheric tomography helps resolve GPS ambiguities On The Fly at distances of hundreds of kilometers during increased geomagnetic activity'', IEEE Book, 2000, ISBN: 0-7803-4330-1.</ref>. The whole model is integrated in the positioning filter of the CPF, ensuring a reliable ambiguity fixing among the rover and the nearest permanent station.


In [[Real Time Kinematics (RTK)]], the assumption that the differential ionospheric delay between a GNSS transmitter and each of the roving or reference receivers is negligible works well for baselines up to 10-20 kilometers. A refinement of this assumption comes with the network RTK (NRTK) using a set of permanent receivers to mitigate atmospheric dependent effects over distance, increasing the allowed distance between baselines and rovers up to 50-70 kms. The '''Wide Area RTK''' concept was introduced in thelate 1990s to address these deficiencies by the [http://www.gage.es/ Research Group of Astronomy and Geomatics (gAGE)] from the Technical University of Catalonia (UPC).
[[File:WARTK_reciever.PNG|thumb|250px|'''Figure 2:''' WARTK algorithm layout for the user receiver (image courtesy of gAGE/UPC)]]


==Wide-Area Real-Time Kinematics (WARTK)==
Then, the WARTK user navigation uses multi-frequency carrier phase data, combined with the corrections provided by the CPF, most importantly, the ionospheric delay correction. Once the ionospheric corrections are applied by the user, cycle ambiguities can be fixed either by using a three-carrier ambiguity resolution (TCAR) approach<ref>Forsell, B., M. Martín-Neira, R.A.Harris (1997), ''Carrier phase ambiguity resolution in GNSS-2 '', proceedings of ION GPS-97.</ref> or the well-know LAMBDA method<ref name="Lambda"/>. A layout of this approach for a WARTK user receiver is shown in Figure 2.<ref name="galgpsWARTK"/>


During the last few years, the group gAGE/UPC has developed the so-called Wide-Area Real-Time Kinematics (WARTK) technique, which allows the extension of local services based on the real-time carrier phase ambiguity resolution to wide-area scale (i.e. baselines between the rover and reference stations greater than 100 km), for both dual-frequency (GPS) and 3-frequency systems (Galileo and modernised GPS). The Wide-Area Real-Time Kinematics (WARTK) technique for dual and 3-frequency systems are based on an optimal combination of accurate ionospheric and geodetic models in a permanent reference stations network. The main factor limiting the range extension of the RTK technique beyond a few tens of kilometres is the differential ionospheric correction between the roving and the nearest reference GNSS station. Such ionospheric correction impedes the real-time ambiguity fixing, and therefore the corresponding accurate navigation at sub-decimetre level. The ionosphere produces ambiguity biases and correlations whose mitigation becomes the main problem to sort out. Even with the aid of multi-reference-station techniques, due to the baseline limitation (<20 km), several thousands would be required to cover such a service to the whole European region, obviously unaffordable from a logistic and economic point of view.
==WARTK Models and Algorithms==


The main techniques supporting WARTK are related to an accurate real-time computation of ionospheric corrections, combined with an optimal processing of GNSS observables (carrier phases in particular) in both 2 and 3-frequency systems. The method dramatically increases the RTK/NRTK service area, with permanent stations separated by up to 500–900 kilometers — all while requiring 100 to 1,000 times fewer receivers covering a given region.
* The Real-time tomographic model.


The target market should be a market line where the enhancement provided by the WARTK technique is needed, such as sub-decimetre accuracy, orientation and wide-area service coverage. It would be mandatory to have institutional support due to the extended permanent receiver network involved to perform such techniques. The EGNOS RIMS network would be a feasible possibility and it would diminish the initial investment for the prototype. The time-to-market should be reduced to the minimum since the current GNSS systems, already on the market, could evolve in the direction of WARTK (e.g., cheaper dual-frequency receivers). The following markets have been identified as the most suitable for the different applications that WARTK is able to provide at this stage of development: accurate navigation in deep seas, tsunami detection, instant meteorology, civil construction, precision farming, orientation, cadastral coverage, real-time wide-area mapping and auto-piloting.<ref>[http://www.gsa.europa.eu/index.cfm?objectid=42B6F1B2-A906-2D88-C40D0B75612EDD2D WARTK-EGAL ESA Project WebPage]</ref>
The free electron density can be described as a random walk process in time that can best be estimated in a Sun-fixed reference frame where it is relatively stationary (variation of 10% during one day in mean latitudes and Solar Maximum conditions). The tomographic model adopted is spatially formed by a set of cells or volume elements (voxels), especially suitable to detect local features, that cover all the ionosphere sampled by the GPS satellite/receiver rays. These voxels, which electron density is considered uniform at any given time, can be taken with the same size for describing a region sampled from an approximately homogeneously distributed network of reference stations. A voxel size of 3x5 degrees in latitude and solar longitude, and two layers with boundaries at 60-740-1420 km have been adopted. This is adequate to get precise ionospheric determinations from ground GPS data.<ref>Hernández-Pajares, et al, ''New approaches in global ionospheric determination using ground GPS data'', Journal of Atmospheric and Solar-Terrestrial Physics 61, 1237-1247, 1999.</ref><ref name=400kmWARTK>Hernández-Pajares, et al, ''Application of ionospheric tomography to real-time GPS carrier-phase ambiguities resolution, at scales of 400-1000 km and with high geomagnetic activity'', Geophysical Research Letters Vol. 27(13), pp. 2009-2012, 2000.</ref>


==WARTK Related Articles==
The resolution of the model  initialized with data from the previous day, is performed using the geometry-free combination of phases, <math>L_1</math> and <math>L_2</math>, of the transmitter T measured from the receiver R. The estimation of this ionospheric model is done by means of a Kalman filter with 10 minutes of updating time (similar performance with 2 minutes), in such a way that the results of the last batch are used to estimate the ionospheric delays up to the next updating time. Then, all ionospheric delays are estimated only from the previous data, as must be done in real-time.<ref name=400kmWARTK/>


The following articles include further information about different important topics related to a WARTK:
* WARTK algorithm user.
There are two different techniques at user level to solve the ambiguity,  differentiating between dual-frequency data or 3-frequency data.<ref name=subdmWARTK>Hernández-Pajares,et al, ''Feasibility of Wide-Area Subdecimeter Navigation With GALILEO and Modernized GPS'', IEEE Transactions on Geoscience and Remote Sensing, Vol.41(9), pp.2128-2131, 2003.</ref>
#WARTK-2 algorithm: In the case of dual-frequency user, the ambiguity resolution can be obtained with the well-known LAMBDA method, explained in article [[RTK Fundamentals|RTK Fundamentals]]. The main difference with classical RTK is that the ionospheric delay is much more precise, the one received from the WARTK CPF.
#WARTK-3 algorithm: For the three frequency case, the ambiguity fixing is done with three-carrier ambiguity resolution (TCAR) approach<ref>R. A. Harris, ''Direct resolution of carrier-phase ambiguity by bridging the wavelength gap'', ESA Publ. TST/60 107/RAH/Word, 1997.</ref>. Using phases and pseudorange observables in the form of double differences. The ''extra-widelane'' and ''widelane'' phase combinations are <math>s_{ew}=s_1 - s_2</math> and <math>s_w=s_1 - s_3</math>, being 1, 2 y 3 each frequency. The TCAR method consists of three basic steps:<ref name=subdmWARTK/>
:  


* [[Work in Progress:WARTK Fundamentals|WARTK Fundamentals]] introduces the recently-developed WARTK technique.
:'''Step 1)''' Solve the ''extra-widelane'' ambiguity,<math>N_{ew}</math>, with a synthetic wavelength of 7.45 m by subtracting the pseudorange narrowlane and then rounding off the difference to the nearest whole number of wavelengths
:      <math>\quad N_{ew}=Nint [ \lambda_{ew} (s_1 - s_3) -\rho_{narr} ] </math>
:where <math>Nint</math> means “rounded off to the nearest integer” and <math> \rho_{narr}  =c/(f_1+f_3) [(f_1/c)\rho_1 +(f_3/c)\rho_3]</math> is the pseudorange narrolane combination that has the same ionospheric delay as the ''extra-widelane''  phase. Subtracting <math>N_{ew}</math> from <math>s_{ew}</math> gives the unambiguous value of the phase wide lane. Although in some cases excessive pseudorange multipath can diminish the chances for success, this error is typically small compared with the long wavelength of the ''extra-wide lane''.
:
:'''Step 2)''' The wide lane combination ambiguity, <math>N_{w}</math>, is estimated by subtracting from the ambiguous wide lane the unambiguous extra-wide lane obtained in step 1, and rounding off the result to the nearest number of whole cycles of the widelane. The difference between them consists mostly of the wide lane ambiguity, and the differential ionospheric refraction (about 0.06 cycles/TECU for a typical set of GNSS frequencies). The nondispersive terms cancel out. The main problems here are the measurement error and multipath in the carrier-phase signals. Since they are much smaller than the widelane wavelength (0.86 m), they are not likely to be an issue.
:


* The [[Work in Progress:WARTK Standards|WARTK Standards]] article summarizes some conventions, models and formats commonly used by WARTK.  
:'''Step 3)''' The <math>L_1</math> phase ambiguity is derived from the difference between <math>s_1</math> and the unambiguous wide lane obtained previously. As before, this difference is rounded off to the nearest integer number of cycles (in this case of <math>s_1</math>). Once the two widelanes and L ambiguities have been resolved, the resolution of those for <math>L_2</math> and <math>L_3</math> is immediate. Typically, the combination of carrier-phase measurement error and multipath is less than 0.2 cycles and can be ignored. The same cannot be said here of the effect of the ionosphere.  


* [[Work in Progress:WARTK Systems|WARTK Systems]] sections provides an overview of the potential WARTK systems and applications.
It is in step 3 where the WARTK ionospheric correction is introduced: the estimated value of differential iono delay between the rover and the fixed network station is used as the ionospheric correction in step 3.


==Notes==
==Notes==

Latest revision as of 12:19, 27 July 2018


FundamentalsFundamentals
Title WARTK Fundamentals
Edited by GMV
Level Basic
Year of Publication 2011
Logo GMV.png

The Wide Area RTK concept was introduced in the late 1990s to address RTK deficiencies by the Research Group of Astronomy and Geomatics (gAGE) from the Technical University of Catalonia (UPC). The WARTK method increases the RTK/NRTK service area, with permanent reference stations separated by up to 500–900 kilometers, this implies requiring 100 to 1,000 times fewer baselines than RTK technique to cover a given region.[1]

WARTK Technique

In RTK technique the differential ionospheric refraction on the signals typically limits the real-time ambiguity resolution (and the corresponding navigation with sub-decimeter errors) to baselines of few tens of km from the nearest reference site. The main techniques supporting this new approach, WARTK, are related to an accurate real-time computation of ionospheric corrections, combined with an optimal processing of GNSS observables (carrier phases in particular) in both 2 and 3-frequency GNSS systems[2]. The navigation can be performed with few centimeters of error at distances of hundreds of kilometers from the nearest reference station.

Figure 1: WARTK Technique (image cortesy of gAGE/UPC)

Indeed, the Ionosphere produces ambiguity estimation biases and correlations whose mitigation is the main problem of several techniques such as LAMBDA method[3], which takes into account these correlations in order to get reliable ambiguities for short baselines. With this RTK technique several thousands of reference receivers would be needed to provide service to Europe. To solve this limitation, WARTK provides to the users with a very accurate ionospheric refraction estimate to be removed from the user navigation filter equations. This was fulfilled by developing a very precise technique to compute ionospheric corrections in real-time using a 3-D voxel model of the ionosphere, estimated by means of a Kalman filter, and using exclusively GNSS data gathered from fixed receivers separated several hundreds of kilometers. In this way, just few dozens of fixed reference GNSS receivers are enough to ensure a sub-decimeter positioning service at continental scale, over Europe for example.[4]

The WARTK central processing facility (CPF) (see Figure 1) uses, in a first step, a tomographic model of the ionosphere, that maps the ionosphere at large scale in real-time with data measured by a network of permanent GNSS receivers. The second step of the technique is to characterize the medium scale traveling ionospheric disturbances (MSTID) that affect the users, specially at mid-latitude[5]. The whole model is integrated in the positioning filter of the CPF, ensuring a reliable ambiguity fixing among the rover and the nearest permanent station.

Figure 2: WARTK algorithm layout for the user receiver (image courtesy of gAGE/UPC)

Then, the WARTK user navigation uses multi-frequency carrier phase data, combined with the corrections provided by the CPF, most importantly, the ionospheric delay correction. Once the ionospheric corrections are applied by the user, cycle ambiguities can be fixed either by using a three-carrier ambiguity resolution (TCAR) approach[6] or the well-know LAMBDA method[3]. A layout of this approach for a WARTK user receiver is shown in Figure 2.[4]

WARTK Models and Algorithms

  • The Real-time tomographic model.

The free electron density can be described as a random walk process in time that can best be estimated in a Sun-fixed reference frame where it is relatively stationary (variation of 10% during one day in mean latitudes and Solar Maximum conditions). The tomographic model adopted is spatially formed by a set of cells or volume elements (voxels), especially suitable to detect local features, that cover all the ionosphere sampled by the GPS satellite/receiver rays. These voxels, which electron density is considered uniform at any given time, can be taken with the same size for describing a region sampled from an approximately homogeneously distributed network of reference stations. A voxel size of 3x5 degrees in latitude and solar longitude, and two layers with boundaries at 60-740-1420 km have been adopted. This is adequate to get precise ionospheric determinations from ground GPS data.[7][8]

The resolution of the model initialized with data from the previous day, is performed using the geometry-free combination of phases, [math]\displaystyle{ L_1 }[/math] and [math]\displaystyle{ L_2 }[/math], of the transmitter T measured from the receiver R. The estimation of this ionospheric model is done by means of a Kalman filter with 10 minutes of updating time (similar performance with 2 minutes), in such a way that the results of the last batch are used to estimate the ionospheric delays up to the next updating time. Then, all ionospheric delays are estimated only from the previous data, as must be done in real-time.[8]

  • WARTK algorithm user.

There are two different techniques at user level to solve the ambiguity, differentiating between dual-frequency data or 3-frequency data.[9]

  1. WARTK-2 algorithm: In the case of dual-frequency user, the ambiguity resolution can be obtained with the well-known LAMBDA method, explained in article RTK Fundamentals. The main difference with classical RTK is that the ionospheric delay is much more precise, the one received from the WARTK CPF.
  2. WARTK-3 algorithm: For the three frequency case, the ambiguity fixing is done with three-carrier ambiguity resolution (TCAR) approach[10]. Using phases and pseudorange observables in the form of double differences. The extra-widelane and widelane phase combinations are [math]\displaystyle{ s_{ew}=s_1 - s_2 }[/math] and [math]\displaystyle{ s_w=s_1 - s_3 }[/math], being 1, 2 y 3 each frequency. The TCAR method consists of three basic steps:[9]
Step 1) Solve the extra-widelane ambiguity,[math]\displaystyle{ N_{ew} }[/math], with a synthetic wavelength of 7.45 m by subtracting the pseudorange narrowlane and then rounding off the difference to the nearest whole number of wavelengths
[math]\displaystyle{ \quad N_{ew}=Nint [ \lambda_{ew} (s_1 - s_3) -\rho_{narr} ] }[/math]
where [math]\displaystyle{ Nint }[/math] means “rounded off to the nearest integer” and [math]\displaystyle{ \rho_{narr} =c/(f_1+f_3) [(f_1/c)\rho_1 +(f_3/c)\rho_3] }[/math] is the pseudorange narrolane combination that has the same ionospheric delay as the extra-widelane phase. Subtracting [math]\displaystyle{ N_{ew} }[/math] from [math]\displaystyle{ s_{ew} }[/math] gives the unambiguous value of the phase wide lane. Although in some cases excessive pseudorange multipath can diminish the chances for success, this error is typically small compared with the long wavelength of the extra-wide lane.
Step 2) The wide lane combination ambiguity, [math]\displaystyle{ N_{w} }[/math], is estimated by subtracting from the ambiguous wide lane the unambiguous extra-wide lane obtained in step 1, and rounding off the result to the nearest number of whole cycles of the widelane. The difference between them consists mostly of the wide lane ambiguity, and the differential ionospheric refraction (about 0.06 cycles/TECU for a typical set of GNSS frequencies). The nondispersive terms cancel out. The main problems here are the measurement error and multipath in the carrier-phase signals. Since they are much smaller than the widelane wavelength (0.86 m), they are not likely to be an issue.
Step 3) The [math]\displaystyle{ L_1 }[/math] phase ambiguity is derived from the difference between [math]\displaystyle{ s_1 }[/math] and the unambiguous wide lane obtained previously. As before, this difference is rounded off to the nearest integer number of cycles (in this case of [math]\displaystyle{ s_1 }[/math]). Once the two widelanes and L ambiguities have been resolved, the resolution of those for [math]\displaystyle{ L_2 }[/math] and [math]\displaystyle{ L_3 }[/math] is immediate. Typically, the combination of carrier-phase measurement error and multipath is less than 0.2 cycles and can be ignored. The same cannot be said here of the effect of the ionosphere.

It is in step 3 where the WARTK ionospheric correction is introduced: the estimated value of differential iono delay between the rover and the fixed network station is used as the ionospheric correction in step 3.

Notes


References

  1. ^ Hernández-Pajares, et al, Wide-Area RTK: High Precision Positioning on a Continental Scale, Inside GNSS, March/April 2010.
  2. ^ WARTK-EGAL Project
  3. ^ a b The least-squares ambiguity decorrelation adjustment: a method for fast GPS integer ambiguity estimation by P. Teunissen, 1995.
  4. ^ a b M. Hernandez-Pajares, et al. Wide Area Real Time Kinematics with Galileo and GPS Signals, Proceedings of the Institute of Navigation, Long Beach, California, 2004.
  5. ^ O. Colombo,et al, Ionospheric tomography helps resolve GPS ambiguities On The Fly at distances of hundreds of kilometers during increased geomagnetic activity, IEEE Book, 2000, ISBN: 0-7803-4330-1.
  6. ^ Forsell, B., M. Martín-Neira, R.A.Harris (1997), Carrier phase ambiguity resolution in GNSS-2 , proceedings of ION GPS-97.
  7. ^ Hernández-Pajares, et al, New approaches in global ionospheric determination using ground GPS data, Journal of Atmospheric and Solar-Terrestrial Physics 61, 1237-1247, 1999.
  8. ^ a b Hernández-Pajares, et al, Application of ionospheric tomography to real-time GPS carrier-phase ambiguities resolution, at scales of 400-1000 km and with high geomagnetic activity, Geophysical Research Letters Vol. 27(13), pp. 2009-2012, 2000.
  9. ^ a b Hernández-Pajares,et al, Feasibility of Wide-Area Subdecimeter Navigation With GALILEO and Modernized GPS, IEEE Transactions on Geoscience and Remote Sensing, Vol.41(9), pp.2128-2131, 2003.
  10. ^ R. A. Harris, Direct resolution of carrier-phase ambiguity by bridging the wavelength gap, ESA Publ. TST/60 107/RAH/Word, 1997.