3.1. Gravity Anomaly Grid Map and Geomagnetic Anomaly Grid Map

Gravity and geomagnetic background databases are the most basic and fundamental elements of the GGCAN system. In this research, a gravity anomaly grid map and geomagnetic anomaly grid map are selected as the databases.

With the appearance and development of satellite altimetry, the resolution of the Gravity Anomaly Grid (GAG2) in ocean area from altimetry inversion has already reached 2′ × 2′. Therefore, a KMS2002 gravity anomaly grid map with 2′ × 2′ resolution is chosen for GGCAN in this paper (Andersen et al., Reference Andersen, Knudsen and Trimmer2005).

The Earth Magnetic Anomaly Grid (EMAG2) was released by National Geographic Data Center (NGDC) in March 2009; EMAG2 is compiled from satellite, continental, marine data and specified as a global 2′ × 2′ resolution grid of the anomaly of the total magnetic intensity (Maus et al., Reference Maus, Barckhausen, Berkenbosch, Bournas, Brozena, Childers, Dostaler, Fairhead, Finn, von Frese, Gaina, Golynsky, Kucks, Lühr, Milligan, Mogren, Müller, Olesen, Pilkington, Saltus, Schreckenberger, Thébault and Caratori Tontini2009). So the EMAG2 geomagnetic anomaly grid map with 2′ × 2′ resolution (EMAG2, 2011) was utilized for the GGCAN study.

3.2. GravAN and GeomAN Algorithm Based on MMAE

Kalman filters are widely used in integrated navigation systems. In this paper a Kalman filter and MMAE are utilized to construct GravAN and GeomAN algorithms. Firstly, a confidence area was formed and the size was determined by the INS position Circular Error Probability (CEP) and Rayleigh Distribution; it can be seen in Figure 2. Then, Kalman filters were constructed at every regularly arranged grid in the confidence area. The measurements for Kalman measurement equations are composed from the differences between the measured anomaly and the anomalies of the filters. The system model for the Kalman filter can be provided as follows:

(1)$$ X = \left( \matrix{X_{1,k} \hfill \cr X_{2,k} \hfill} \right){\rm =} \phi _{k,k - 1} \left( \matrix{X_{1,k - 1} \hfill \cr X_{2,k - 1} \hfill} \right) + G_{k - 1} \left( \matrix{W_{1,k - 1} \hfill \cr W_{2,k - 1} \hfill} \right)$$

(2)$$Z = \left( \matrix{Z_{1,k} \hfill \cr Z_{2,k} \hfill} \right) = H_k \left( \matrix{X_{1,k} \hfill \cr X_{2,k} \hfill} \right) + \left( \matrix{V_{1,k} \hfill \cr V_{2,k} \hfill} \right)$$

The subscripts 1 and 2 indicate GravAN and GeomAN respectively in the whole paper, where:

• X – Actual value of gravity/geomagnetic anomaly and it is treated as the state vector.

• Z – The gravity/geomagnetic measurement vector.

• W – System noise. W _1,k = N(0,q ₁) and W _2,k = (0,q ₂), Q=diag(q ₁,q ₂).

• V – Measurement noise. V _1,k = N(0,r ₁) and V _2,k = (0,r ₂), R=diag(r ₁,r ₂).

Figure 2. Sketch Map of Confidence Interval and Validate Location.

The noises are assumed to be uncorrelated with each other. Five Kalman filter equations are listed as follows:

(3)$$\left\{ \matrix{X_k^ - = \phi X_{k - 1} \hfill \cr P_k^ - = \phi P_{k - 1} \phi ^T + Q \hfill \cr K_k = P_k^ - H^T \hskip-2pt /(HP_k^ - H^T + R) \hfill \cr X_k = X_k^ - + K_k (Z_k - HX_k^ - ) \hfill \cr P_k = (I - K_k H)P_k^ - \hfill} \right.$$

Kalman filter computations are executed in every filter individually. Thereafter, the filtering residuals are defined as:

(4)$$\left( \matrix{\delta _{1,k + 1} \hfill \cr \delta _{2,k + 1} \hfill} \right) = \left( \matrix{Z_{1,k + 1} - X_{1,k + 1/k} \hfill \cr Z_{2,k + 1} - X_{2,k + 1/k} \hfill} \right)$$

where:

• δ _1,k + 1 = N(0,P _{1,k/k − 1}+r ₁) and δ _2,k + 1 = N(0,P _{2,k/k − 1}+r ₂) respectively.

• P _{1,k/k − 1} and P _{2,k/k − 1} are the predicted covariance of the states of gravity and geomagnetic respectively.

The weighted residual and its smoothness value are defined (Hollowell, Reference Hollowell1990) as:

(5)$$\left( \matrix{WRS_{1,k + 1} \hfill \cr WRS_{2,k + 1} \hfill} \right) = \left( \matrix{(\delta _{1,k + 1} )^2 /(P_{1,k + 1/k} + r_1 ) \hfill \cr (\delta _{2,k + 1} )^2 /(P_{2,k + 1/k} + r_2 ) \hfill} \right)$$

(6)$$\left( \matrix{SWRS_{1,k + 1} \hfill \cr SWRS_{2,k + 1} \hfill} \right) = \left( \matrix{\alpha \cdot WRS_{1,k + 1} + (1 - \alpha )SWRS_{1,k} \hfill \cr \alpha \cdot WRS_{2,k + 1} + (1 - \alpha )SWRS_{2,k} \hfill} \right)$$

where;

• SWRS _1,0=SWRS _2,0 = 1.0

• α is smooth factor.

• α = 1.938p when p indicates the draft of the INS.

If SWRS is smaller, better position results can be achieved. So the smallest values of SWRS are sought, and the corresponding positions are regarded as the estimated results of positions for GravAN and GeomAN.

As the positions have been estimated, the following criterion is adopted to judge the reliability of the results:

(7)$$H = \displaystyle{{SWRS_{\min} ^* - SWRS_{1/2}^{\min}} \over {SWRS_{1/2}^{\min}}} \gt H_t $$

where:

• H is the reliability.

• H _t is the threshold.

SWRS _½^min is the smallest SWRS value, and SWRS _min^* is the second smallest SWRS value in the region around the corresponding position of SWRS _½^min. For estimating the results of position for GravAN and GeomAN, the region is defined by nine grids, including the corresponding position of SWRS _½^min and eight surrounding grids, and is illustrated in Figure 3. From Equation (7) it can be seen that the reliability H would increase if the differences between SWRS _min^* and SWRS _½^min increased. When the reliability H is larger than threshold H _t, the position results would be considered as valid, otherwise they would be invalid.

Figure 3. Region around SWRS _½^min and OWAP for GGCAN.

As the position results of SWRS _½^min are confirmed as valid, more accurate estimation of positions can be calculated with weighted methods. Equations (8) and (9) are presented here for position and weighted calculation respectively:

(8)$$\left\{ \matrix{\lambda _1 = \sum\limits_{i = 1}^9 {(W_1^i} \cdot \lambda _1^i ) \hfill \cr \varphi _1 = \sum\limits_{i = 1}^9 {(W_1^i} \cdot \varphi _1^i ) \hfill} \right.,\left\{ \matrix{\lambda _2 = \sum\limits_{i = 1}^9 {(W_2^i} \cdot \lambda _2^i ) \hfill \cr \varphi _2 = \sum\limits_{i = 1}^9 {(W_2^i} \cdot \varphi _2^i ) \hfill} \right.$$

(9)$$\left\{ \matrix{W_1^i = \displaystyle{{{\rm exp}( - 0.5 \times N_1^i )} \over {\sum\limits_{i = 1}^9 {{\rm exp}( - 0.5 \times N_1^i )}}}, N_1^i = \displaystyle{{SWRS_1^i} \over {SWRS_1^{{\rm min}}}}, 1 \leqslant i \leqslant 9 \hfill \cr W_2^i = \displaystyle{{{\rm exp}( - 0.5 \times N_2^i )} \over {\sum\limits_{i = 1}^9 {{\rm exp}( - 0.5 \times N_2^i )}}}, N_2^i = \displaystyle{{SWRS_2^i} \over {SWRS_2^{{\rm min}}}}, 1 \leqslant i \leqslant 9 \hfill} \right.$$

Where (λ,φ) are the coordinates of the position, the weights are calculated with SWRS values at every grid. In Figure 3 point P ₁(λ ₁,φ ₁) and P ₂(λ ₂,φ ₂) are the more accurate estimation results.

4.1. OWAP Algorithms

As the position results of GravAN and GeomAN have been obtained, OWAP is adopted to combine the gravity and geomagnetism aided navigation.

It is shown in Figure 3 that the position results of GravAN and GeomAN are P ₁(λ ₁,φ ₁) and P ₂(λ ₂,φ ₂), respectively. They are affected by various errors including measurement error, database error and the algorithm error. All the noises and errors are assumed to obey the law of Gaussian distribution (Ling et al., Reference Ling, Li and Zhou1998):

(10)$$p(P_1 ) = N(\mu _1, \sigma _1^2 )$$

(11)$$p(P_2 ) = N(\mu _2, \sigma _2^2 )$$

After the following transformation, z ₁ and z ₂ obey the standard normal distribution:

(12)$$z_1 = \displaystyle{{P_1 - \mu _1} \over {\sigma _1}} $$

(13)$$z_2 = \displaystyle{{P_2 - \mu _2} \over {\sigma _2}} $$

The weighted average method of the gravity and geomagnetism combined aided navigation (GGCAN) is then constructed as:

(14)$$p = WP = [w_1, w_2 ][P_{1,} P_2 ]^T $$

where:

• W = [w ₁,w ₂] is the weight vector.

• w ₁ and w ₂ are the weights of GravAN and GeomAN respectively.

• P = [P ₁,P ₂]^T.

Multiple random vectors Z obey the standard normal distribution after the transformation below:

(15)$$Z = A(P - U)$$

where:

• Z = [z ₁,z ₂].

• $A = diag\left[ {\displaystyle{1 \over {\sigma _1}}, \displaystyle{1 \over {\sigma _2}}} \right]$.

• U = [μ ₁,μ ₂]^T.

From Equation (15) we obtain:

(16)$$P = A^{ - 1} Z + U$$

Substituting Equation (16) into Equation (14):

(17)$$p = WP = W(A^{ - 1} Z + U) = WU + WA^{ - 1} Z$$

According to the theory of n-dimensional multivariate statistics, the probability density function of p is:

(18)$$\eqalign{\,f\,(\,p) & = (2\pi )^{{\textstyle{n \over 2}}} \left| {WP^{ - 1} (P^{ - 1} )'W'} \right|{\rm exp}\left\{ {\displaystyle{1 \over 2}(\,p - WU)(WP^{ - 1} (P^{ - 1} )'W')(\,p - WU)'} \right\} \cr & = (2\pi )^{ - {\textstyle{n \over 2}}} \left| {\sum\limits_{i = 1}^n {w_i^2 \sigma _i^2}} \right|{\rm exp}\left\{ { - \displaystyle{1 \over 2}\sum\limits_{i = 1}^n {w_i^2 \sigma _i^2} \left( {y - \sum\limits_{i = 1}^n {w_i^2 \sigma _i^2}} \right)^2} \right\}} $$

This indicates that p obey normal distribution. In other words:

(19)$$p = N\left( {\sum\limits_{i = 1}^n {w_i \mu _i}, \sum\limits_{i = 1}^n {w_i^2 \sigma _i^2}} \right)$$

That is to say, the mathematical expectation of position result after fusing is the weighted expectation of GravAN and GeomAN. And the precision of GGCAN is:

(20)$$\sigma _p = \sqrt {\sum\limits_{i = 1}^n {w_i^2 \sigma _i^2}} $$

Apparently, if σ _i are given, σ _p is only influenced and determined by w _i. As the minimum of σ _p indicates the optimal accuracy of GGCAN. A mathematical model is constructed as follows:

(21)$$f\,(w_1, w_2 ) = \sum\limits_{i = 1}^2 {w_i^2 \sigma _i^2} $$

(22)$$\sum\limits_{i = 1}^2 {w_i} = 1(w_i \geqslant 0,i = 1,2),\sigma _i (i = 1,2)$$

So the optimal problem is transformed into finding the conditional extreme value of this function f(w ₁,w ₂) (Ling et al., Reference Ling, Li, Chen, Gu and Li2000). This problem can be solved by the Lagrange Multiplier method.

4.2. The Solution of OWAP

The Lagrange Multiplier conditional extreme value equation can be written as below:

(23)$$F = \sum\limits_{i = 1}^2 {w_i^2 \sigma _i^2} + \beta \left( {\sum\limits_{i = 1}^2 {w_i} - 1} \right)$$

where β is the Lagrange Multiplier.

The partial differential of the F with respect to w _i(i = 1,2) is assigned to 0, so a set of equations can be written as:

(24)$$\left\{ \matrix{\displaystyle{{\partial F} \over {\partial w_1}} = 2w_1 \sigma _1^2 + \beta = 0 \hfill \cr \displaystyle{{\partial F} \over {\partial w_2}} = 2w_2 \sigma _2^2 + \beta = 0 \hfill \cr w_1 + w_2 = 1 \hfill} \right.$$

Then the weight of GravAN and GeomAN could be obtained:

(25)$$w_i = \displaystyle{1 \over {\sigma _i^2 \sum\limits_{i = 1}^2 {\displaystyle{1 \over {\sigma _i^2}}}}} $$

Substituting Equation (25) into (20) the precision of GGCAN is:

(26)$$\sigma _p = \sqrt {\sum\limits_{i = 1}^2 {w_i^2 \sigma _i^2}} = \displaystyle{1 \over {\sqrt {\sum\limits_{i = 1}^2 {\displaystyle{1 \over {\sigma _i^2}}}}}} $$

4.3. Precision Analyses of OWAP

Let the precisions of GravAN and GeomAN be σ ₁ and σ ₂, respectively. Assuming that σ ₁≤σ ₂, the following inequality can be obtained:

(27)$$\sigma _p = \displaystyle{1 \over {\sqrt {\displaystyle{1 \over {\sigma _1^2}} + \displaystyle{1 \over {\sigma _2^2}}}}} \leqslant \displaystyle{1 \over {\sqrt {\displaystyle{1 \over {\sigma _1^2}}}}} \leqslant \displaystyle{1 \over {\sqrt {\displaystyle{1 \over {\sigma _2^2}}}}} $$

This inequality indicates that with OWAP the precision of GGCAN is improved with respect to either GravAN or GeomAN. This is the essential difference between OWAP and other fusion methods. So more precise position results can be gained with the combination of gravity and geomagnetism aided navigation after OWAP.