The RSGPS program and OPUS - RS Getting There Faster –
OPUS-RS Uses RSGPS program instead of PAGES Uses P1 and P2, as well as L1 and L2, observations Resolves all ambiguities with LAMBDA
OPUS-RS search algorithm Sort stations in CORS network by distance from rover. Select up to nine CORS that are less than 250 km from rover and that have suitable data. No solution is attempted if fewer than three CORS selected. No solution attempted if distance from rover to polygon enclosing selected CORS is greater than 50 km. 250 km limit <50 km ROVER CORS
OPUS-RS uses RSGPS in two modes: Network and Rover In network mode, at least one hour of data from the selected CORS are used to solve for ambiguities, tropospheric refraction, and double difference ionospheric delays at these CORS. The positions of the CORS are held fixed. In rover mode, ionospheric delays and troposphere parameters are interpolated (or extrapolated) from the selected CORS to rover. Then the delays at the rover are constrained to solve for the position of the rover. Again, the positions of the CORS are held fixed..
OPUS-RS Produces solution with as little as 15 minutes of data (vs. 2 hours for current OPUS) To improve accuracy and reliability: - Collect observations for more than 15 minutes (OPUS-RS accepts up to 4 hours of data) - perform multiple observation sessions
OPUS-RS User interface is identical to regular OPUS, including Options page Output report is similar to regular OPUS, but with quality indicators based on the W-ratio from the LAMBDA validation tests The normalized RMS is a unitless measure of the scatter in the data misfits No peak-to-peak variations
NGS OPUS-RS SOLUTION REPORT ======================== USER: DATE: March 16, 2007 RINEX FILE: vari045a.07o TIME: 11:40:07 UTC SOFTWARE: rsgps 1.06 RS26.prl START: 2007/02/14 00:00:30 EPHEMERIS: igs14143.eph [precise] STOP: 2007/02/14 00:59:30 NAV FILE: brdc n OBS USED: 2784 / 2994 : 93% ANT NAME: TRM QUALITY IND / ARP HEIGHT: 2.0 NORMALIZED RMS: REF FRAME: NAD_83(CORS96)(EPOCH: ) ITRF00 (EPOCH: ) X: (m) see (m) see Y: (m) accuracy (m) accuracy Z: (m) note (m) note LAT: E LON: W LON: EL HGT: (m) (m) ORTHO HGT: (m) [Geoid03 NAVD88] UTM COORDINATES STATE PLANE COORDINATES UTM (Zone 18) SPC (4502 VA S) Northing (Y) [meters] Easting (X) [meters] Convergence [degrees] Point Scale Combined Factor OPUS-RS Datasheet
US NATIONAL GRID DESIGNATOR: 18STG (NAD 83) BASE STATIONS USED PID DESIGNATION LATITUDE LONGITUDE DISTANCE(m) AF9635 RIC1 RICHMOND 1 CORS ARP N W DI0878 DRV5 DRIVER 5 CORS ARP N W DH7133 NCJA JACKSON NC CORS ARP N W DG5940 VALY MASSIE CORS ARP N W AI3289 VIMS VIRGINIA INSTITUT CORS ARP N W DF8715 NCWI WILLIAMSTON CORS ARP N W NEAREST NGS PUBLISHED CONTROL POINT DH5858 ED SNIDER CORS ARP N W This position and the above vector components were computed without any knowledge by the National Geodetic Survey regarding the equipment or field operating procedures used.
OPUS results: independent of reference station geometry and distances Recall that the accuracies of the OPUS- derived positional coordinates do not depend on the geometry of the reference stations. Also, the accuracies of the OPUS-derived psitional coordinates depend only slightly on the distances from the rover to the reference stations (perhaps less than 0.01 ppm, that is, less than 1 mm per 100 km).
OPUS-RS results: Depend on both reference station geometry and distances In contrast, the accuracy of OPUS-RS- derived positional coordinates depend both on the geometry of the reference stations and the distances from the rover to the reference stations, because OPUS-RS interpolates (or extrapolates) the atmospheric conditions (tropo- and iono- delays) measured at the reference stations to predict the atmospheric conditions at the rover.
Interpolative Dilution of Precision (IDOP) Suppose z = f(x,y) can be adequately approximated by the equation, z = ax + by + c, and suppose there is a set of independent observations z i at the point (x i, y i ) for i = 1,2,3,…,n where n is the number of reference stations. If the standard error of each observation equals σ, then the predicted value of z at the point (x 0, y 0 ) has a standard error σ 0 given by the expression σ 0 = (R/Q) 0.5 σ where R = (∑dx i 2 )(∑dy i 2 ) – (∑dx i dy i ) 2 and Q = nR + 2(∑dx i )(∑dy i )(∑dx i dy i ) – (∑dx i ) 2 (∑dy i 2 ) – (∑dy i ) 2 (∑dx i 2 ) Here dx i = x i – x 0 and dy i = y i – y 0 for i = 1,2, 3,…,n. The term (R/Q) 0.5 is a unitless quantity called the “interpolative dilution of precision” or IDOP.
IDOP VALUES AS A FUNCTION OF LOCATION EXAMPLE FOR THE CASE OF 4 CORS BEST IDOP = 1/√ N THEREFORE, WITH 9 CORS, THE IDOP AT THE CENTROID WOULD BE.33, WITH 4 CORS IT WOULD BE.5 AT THE CENTROID
Accuracy depends on IDOP & RMSD RMSD = Root mean square distance RMSD = [ ( ∑ d i 2 ) / n ] 0.5 where d i is the distance between the rover and the i-th CORS, and n equals the number of CORS being used. Sigma = [ (a*IDOP) 2 + (b*RMSD) 2 ] 0.5 where a and b are constants.
Values for a and b East-west: a = 1.87 ± 0.26 cm b = ± ppm North-south: a = 1.77 ± 0.21 cm b = 0.05 ± ppm Up-down: a = 6.69 ± 0.71 cm b = ± ppm Note that the north-south values are statistically indistinguishable from the east-west values. Also note that the up-down values are about 3.7 times larger than either the north-south values or the east-west values.
Vertical standard error achievable when a user submits 15 minutes of GPS data to OPUS-RS
POB