Satellite navigation solution

(Redirected from GPS positioning)

Satellite navigation solution for the receiver's position (geopositioning) involves an algorithm. In essence, a GNSS receiver measures the transmitting time of GNSS signals emitted from four or more GNSS satellites (giving the pseudorange) and these measurements are used to obtain its position (i.e., spatial coordinates) and reception time.

The following are expressed in inertial-frame coordinates.

The solution illustrated

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Calculation steps

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  1. A global-navigation-satellite-system (GNSS) receiver measures the apparent transmitting time,  , or "phase", of GNSS signals emitted from four or more GNSS satellites (  ), simultaneously.[1]
  2. GNSS satellites broadcast the messages of satellites' ephemeris,  , and intrinsic clock bias (i.e., clock advance),  [clarification needed] as the functions of (atomic) standard time, e.g., GPST.[2]
  3. The transmitting time of GNSS satellite signals,  , is thus derived from the non-closed-form equations   and  , where   is the relativistic clock bias, periodically risen from the satellite's orbital eccentricity and Earth's gravity field.[2] The satellite's position and velocity are determined by   as follows:   and  .
  4. In the field of GNSS, "geometric range",  , is defined as straight range, or 3-dimensional distance,[3] from   to   in inertial frame (e.g., ECI one), not in rotating frame.[2]
  5. The receiver's position,  , and reception time,  , satisfy the light-cone equation of   in inertial frame, where   is the speed of light. The signal time of flight from satellite to receiver is  .
  6. The above is extended to the satellite-navigation positioning equation,  , where   is atmospheric delay (= ionospheric delay + tropospheric delay) along signal path and   is the measurement error.
  7. The Gauss–Newton method can be used to solve the nonlinear least-squares problem for the solution:  , where  . Note that   should be regarded as a function of   and  .
  8. The posterior distribution of   and   is proportional to  , whose mode is  . Their inference is formalized as maximum a posteriori estimation.
  9. The posterior distribution of   is proportional to  .

The GPS case

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in which   is the orbital eccentric anomaly of satellite  ,   is the mean anomaly,   is the eccentricity, and  .

  • The above can be solved by using the bivariate Newton–Raphson method on   and  . Two times of iteration will be necessary and sufficient in most cases. Its iterative update will be described by using the approximated inverse of Jacobian matrix as follows:

 

The GLONASS case

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  • The GLONASS ephemerides don't provide clock biases  , but  .

See also

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Notes

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  • In the field of GNSS,   is called pseudorange, where   is a provisional reception time of the receiver.   is called receiver's clock bias (i.e., clock advance).[1]
  • Standard GNSS receivers output   and   per an observation epoch.
  • The temporal variation in the relativistic clock bias of satellite is linear if its orbit is circular (and thus its velocity is uniform in inertial frame).
  • The signal time of flight from satellite to receiver is expressed as  , whose right side is round-off-error resistive during calculation.
  • The geometric range is calculated as  , where the Earth-centred, Earth-fixed (ECEF) rotating frame (e.g., WGS84 or ITRF) is used in the right side and   is the Earth rotating matrix with the argument of the signal transit time.[2] The matrix can be factorized as  .
  • The line-of-sight unit vector of satellite observed at   is described as:  .
  • The satellite-navigation positioning equation may be expressed by using the variables   and  .
  • The nonlinearity of the vertical dependency of tropospheric delay degrades the convergence efficiency in the Gauss–Newton iterations in step 7.
  • The above notation is different from that in the Wikipedia articles, 'Position calculation introduction' and 'Position calculation advanced', of Global Positioning System (GPS).

References

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  1. ^ a b Misra, P. and Enge, P., Global Positioning System: Signals, Measurements, and Performance, 2nd, Ganga-Jamuna Press, 2006.
  2. ^ a b c d e f The interface specification of NAVSTAR GLOBAL POSITIONING SYSTEM
  3. ^ 3-dimensional distance is given by   where   and   represented in inertial frame.
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  • PVT (Position, Velocity, Time): Calculation procedure in the open-source GNSS-SDR and the underlying RTKLIB