Position-domain integrity risk-based ambiguity validation for the integer bootstrap estimator

Integrity monitoring for ambiguity resolution is of significance for utilizing the high-precision carrier phase differential positioning for safety–critical navigational applications. The integer bootstrap estimator can provide an analytical probability density function, which enables the precise evaluation of the integrity risk for ambiguity validation. In order to monitor the effect of unknown ambiguity bias on the integer bootstrap estimator, the position-domain integrity risk of the integer bootstrapped baseline is evaluated under the complete failure modes by using the worst-case protection principle. Furthermore, a partial ambiguity resolution method is developed in order to satisfy the predefined integrity risk requirement. Static and kinematic experiments are carried out to test the proposed method by comparing with the traditional ratio test method and the protection level-based method. The static experimental result has shown that the proposed method can achieve a significant global availability improvement by 51% at most. The kinematic result reveals that the proposed method obtains the best balance between the positioning accuracy and the continuity performance.

[1]  Christian Tiberius,et al.  Integer Ambiguity Estimation with the Lambda Method , 1996 .

[2]  Lin Zhao,et al.  Integrity and continuity allocation for the RAIM with multiple constellations , 2017, GPS Solutions.

[3]  Stephen Ison,et al.  Multiple reference consistency check for LAAS: a novel position domain approach , 2011, GPS Solutions.

[4]  Peter Teunissen,et al.  Penalized GNSS Ambiguity Resolution , 2004 .

[5]  P. Teunissen Success probability of integer GPS ambiguity rounding and bootstrapping , 1998 .

[6]  Bofeng Li,et al.  GNSS ambiguity resolution with controllable failure rate for long baseline network RTK , 2014, Journal of Geodesy.

[7]  S. Langel,et al.  Bounding the integer bootstrapped GNSS baseline’s tail probability in the presence of stochastic uncertainty , 2016, Journal of Geodesy.

[8]  Dennis Odijk,et al.  ADOP in closed form for a hierarchy of multi-frequency single-baseline GNSS models , 2008 .

[9]  Sandra Verhagen,et al.  The GNSS ambiguity ratio-test revisited: a better way of using it , 2009 .

[10]  J Blanch,et al.  RAIM with Optimal Integrity and Continuity Allocations Under Multiple Failures , 2010, IEEE Transactions on Aerospace and Electronic Systems.

[11]  Lin Zhao,et al.  High-Accuracy Tightly Coupled Integrity Monitoring Algorithm for Map-Matching , 2012 .

[12]  LiLiang,et al.  Integrity monitoring-based ambiguity validation for triple-carrier ambiguity resolution , 2017 .

[13]  Massimo Crisci,et al.  The Galileo Integrity Concept , 2004 .

[14]  Boris Pervan,et al.  Detection and Mitigation of Reference Receiver Faults in Differential Carrier Phase Navigation Systems , 2011, IEEE Transactions on Aerospace and Electronic Systems.

[15]  Washington Y. Ochieng,et al.  GPS Integrity and Potential Impact on Aviation Safety , 2003, Journal of Navigation.

[16]  B. Pervan,et al.  New Approach for Calculating Position Domain Integrity Risk for Cycle Resolution in Carrier Phase Navigation Systems , 2010, IEEE Transactions on Aerospace and Electronic Systems.

[17]  Lin Zhao,et al.  Integrity monitoring-based ambiguity validation for triple-carrier ambiguity resolution , 2017, GPS Solutions.

[18]  Liang Wang,et al.  Integrity monitoring-based ratio test for GNSS integer ambiguity validation , 2016, GPS Solutions.

[19]  Lei Wang,et al.  A new ambiguity acceptance test threshold determination method with controllable failure rate , 2015, Journal of Geodesy.

[20]  P. Teunissen An optimality property of the integer least-squares estimator , 1999 .

[21]  P. D. Jonge,et al.  The LAMBDA method for integer ambiguity estimation: implementation aspects , 1996 .

[22]  Peter Teunissen,et al.  The probability distribution of the ambiguity bootstrapped GNSS baseline , 2001 .

[23]  C. Hide,et al.  Carrier phase-based integrity monitoring for high-accuracy positioning , 2009 .

[24]  Bradford W. Parkinson,et al.  Global positioning system : theory and applications , 1996 .

[25]  Jay A. Farrell,et al.  Real-time differential carrier phase GPS-aided INS , 2000, IEEE Trans. Control. Syst. Technol..

[26]  A. Leick GPS satellite surveying , 1990 .

[27]  Alex Parkins,et al.  Increasing GNSS RTK availability with a new single-epoch batch partial ambiguity resolution algorithm , 2011 .