Patent Grant
7155237
The present invention relates to a method of determining the position of a mobile radio terminal arranged to communicate with a plurality of base stations and including the steps of employing a Time Of Arrival (TOA) calculation in combination with a Time Difference Of Arrival (TDOA) calculation.
A similar combination of different techniques (such as TOA and TDOA) for position location purposes is employed in the international patent application WO-A-99/37109 in the uplink communication channel, i.e. when signals are transmitted from the mobile terminal to the different base stations which are employed with multiple detection calculations performed on the signals received at the base stations. It should be appreciated that employing such combined techniques has the advantage that the number of separate base station measurements required to obtain an accurate determination of the mobile terminals position is reduced. Previously, communication with three base stations was required. However, the combination Of Time of Arrival and Time Difference Of Arrival calculations has reduced the number of required base stations to two in order to obtain a two-dimensional position fix. This can prove advantageous in many mobile communication systems where communication with three base stations can in no way be guaranteed. For example, it has been determined that even for cellular telephones operating in an urban environment, an average 12% of the mobile telephones will not have access to more than two base stations.
The combination of Time Of Arrival and Time Difference Of Arrival calculations improve the accuracy and success rate of position determination for a mobile handset, such a capability is becoming an increasingly important aspect of mobile communication scenarios, particularly those involving the emergency services.
However, systems such as that known from WO-A-99/37109 nevertheless suffer disadvantages. For example, the availability of the improved position determination process is dependent upon network service providers implementing the appropriate functionality at their base stations. Also, if the result of the position determination process is required at the mobile terminal, this is not inherent in the known systems and so the mobile terminal use becomes reliant upon the external network infrastructure, and also increased communication between the base station and the mobile terminal to provide the user with the position information.
Since the potentially problematic communication between base stations and the mobile terminal is at the very heart of the problem addressed in WO-A-99/37109, any scenario requiring additional communication between the base stations and the mobile terminal will serve to limit the effectiveness of such prior art proposals.
Again, the requirement for such additional level of communication emphasizes the dependence of the mobile terminal user on the service providers supporting such a level of base station-terminal communication.
The present invention therefore seeks to provide for a method of determining the position of a mobile terminal, and related apparatus, which exhibits advantages over known such methods.
According to one aspect of the present invention, there is provided a method of determining the position of a mobile radio terminal as defined above and characterised by performing the combined Time Of Arrival and Time Difference Of Arrival calculations on signals transmitted in a downlink communication channel from the base stations to the terminal.
Such method is particularly suitable for compliance with the emerging 3rd generation standard defined within the 3GPP working groups.
The method of the present invention is advantageous in that the position determination calculation is performed in the mobile terminal itself and so is readily available to the terminal user and without the user being dependent upon network characteristics defined by the service provider. Also, there is no need for a separate level of communication once the position determination has been performed in order to deliver the position determination result to the mobile terminal user.
The feature of claim 2 has the advantage that an accurate Time Of Arrival can be readily achieved and so enhancing the combined calculation performed, for example on signals from only two base stations.
The invention also provides for a mobile radio system comprising a plurality of base stations and a mobile radio terminal arranged for communication therewith, characterised in that the mobile radio terminal includes means for performing combined Time Of Arrival and Time Difference Of Arrival calculations on signal transmitted in the downlink channel from the base stations so that the result of the position determination calculation is available directly at the mobile radio terminal.
Further, the invention can provide for a mobile radio terminal characterised by means for performing combined Time Of Arrival and Time Difference Of Arrival calculation on signal transmitted from a plurality of base stations.
The invention is described further hereinafter, by the way of example only, with reference to the accompanying drawings in which:
The general principle behind a mobile terminal positioning system according to the invention is to correlate one of the signals transmitted by the network operator with a local replica of the same signal generated inside the mobile terminal. In accordance with the standard techniques, the peak of correlation that is possible to obtain is positioned at an instant in time that is, directly proportional to the distance travelled by the signal ray. From the basis that the signals travel at the speed of light, it is relatively easy to derive a Time Of Arrival (TOA) delay estimate and from three separate estimates to calculate the position of the mobile via triangulation or hyperbolic simultaneous equations.
The propagation delay of a signal can be determined using the correlation properties of particular sequences (PN sequences) travelling between the transmitter (the operator) and the receiver (the mobile terminal). Correlating two replica of the same PN sequence serves to produce a strong peak in the correlation function when the two are synchronised. Even in the presence of strong distortion caused for example by multipath and noise effects, the peak is still clearly visible for employment in the position fix process. Such known TOA positioning systems can calculate the unique two-dimensional location of the mobile terminal based on the known absolute position of at least three base stations provided by the network. The actual distance from these three base stations can be determined.
For TOA systems, each base station broadcasts particular messages during its normal operation. If the mobile is within the range of the base station transmission, it will receive the transmission and correlate it with a local replica of the same signal. The radio-waves transmitted from the base station or from the mobile, are assumed to propagate at the speed of light c, and the distance travelled can be therefore calculated simply multiplying c by the propagation time measured. Repeating the same calculation for 3 base stations, the mobile would have an estimate of its distance from them and can then use triangulation for finding its position given the knowledge of the three distances and the three BS co-ordinates.
In this ideal scenario, and as illustrated in
In mathematical terms, this can be represented by the following three equations whose solution will provide the mobile with its position:
where x,y,z are the unknown co-ordinates of the mobile, (x_BS1, y_BS1), (x_BS2,y_BS2), (x_BS3,y_BS3) are the co-ordinates of the basestations and R1, R2, R3 are the distances calculated from the propagation time measured.
A solution of this system is possible both in a closed form and with an iterative method and algorithms for performing these calculations have been implemented and tested with Matlab.
The closed form implementing is derived from an efficient algorithm by Manolakis (IEEE Transactions on Aerospace and Electronic Systems, Vol. 32, No. 4, 1996 pp 1239–1248) based on the linearisation of the equation by operating on differences of distances rather than single distances. This provides the solution in one step. Alternatively the iterative method (Newton) starts from a guess introduced by the user (for example the position of the home basestation), and will converge to the solution of the system in a certain number of steps. This requires more computational effort because of the least square minimisation required at each step of the process. The results produced by both methods are very similar and consistent with the expectations.
The above however is an ideal scenario and, in reality during the transmission, there is a path loss in addition to multipath distortion, and therefore the signal arriving to the receiver will not be perfect. However, the signal can still contain enough information to allow the detection of a peak whose position will vary proportionally to the time delay of propagation. The illustration of
The limitation of the TOA method is associated with the assumptions needed to render it practicable. The mobile will have to reach accurate synchronisation with each of the base stations or have to know the exact delay in the transmission of the synch codes between its home basestation and the others. This is necessary in order to calculate the propagation delay of the synchronisation signal from each of the base stations. If the mobile couldn't obtain such information, it could not determine when to start the correlation mechanism or how to distinguish between synchronisation and propagation-delay time. The accuracy of the synchronisation will affect the accuracy of the location estimate. For example, a 1 us inaccuracy in the synchronisation will result in 300 m error in the position. In order to introduce an additional error—for example—less than 50 meters, the inaccuracy of the synchronisation with other base stations should not be greater than 166 ns.
The implementation of a TOA system would therefore be made very expensive by these synchronisation requirements necessary between the mobile and each of the transmitters in order to obtain a correct absolute time.
A slightly modified version of the positioning algorithm is known and referred to as the Time Difference Of Arrival (TDOA). Rather than employing absolute distances, three pseudodistances, calculated as the curves at constant difference between two particular base stations and the mobile are calculated. This would allow the position determination to be the independent from the absolute timing in the mobile, because each of the timing errors will cancel out.
The basic principle is the same as in the TOA system, with the base station broadcasting messages that the mobile would seek to decode. As before, the mobile will calculate the estimates of the propagation delays from each of the three base station, but this time, the calculations would be based on the lines at constant distance between two given independent basestations. This is illustrated in
The three measurement required are the distances, or their estimates i.e. the pseudo-distances of the mobile from each of the base station. Two such measurements will help define a hyperbola between the two base stations. For example, the pseudo-ranges between the mobile M and the basestations BS1 and BS3 respectively will provide the parameters for defining the hyperbola R3–R1 in
This situation can be described in simple mathematical terms in the following equations.
R1=√{square root over ((x−x—BS1)2+(y−y—BS1)2)}{square root over ((x−x—BS1)2+(y−y—BS1)2)}
R2=√{square root over ((x−x—BS2)2+(y−y—BS2)2)}{square root over ((x−x—BS2)2+(y−y—BS2)2)}
R3=√{square root over ((x−x—BS3)2+(y−y—BS3)2)}{square root over ((x−x—BS3)2+(y−y—BS3)2)} (1)
The hyperbola at constant distance between BS1 and BS2 will be:
Squaring each item, we will get:
R2=R12+R22−2·R1·R2 (3)
which can be re-written and squared again to eliminate the terms under square root:
(R2−R12−R22)2=4R12·R22 (4)
Simplifying this equation will become:
R14+R24−2·R2·R12−2·R2·R22+R4−2R12·R12 (5)
Putting back equation (1) in equation (5) and simplifying, the hyperbola equation in the simpler can be expressed in the following form:
F(x,y)=C11·x2+C81·x·y+C91·x+C31 ·y2+C41·y+C51=0 (6)
where (x,y) are the unknown co-ordinates of the mobile; C11, C81, C91, C31, C41, C51 are function of the basestations (known) co-ordinates; and (x13 BS1, y_BS1), (x_BS2, y_BS2), (x_BS3, y_BS3) and R (measured difference of distances), and can therefore be considered constants with respect to x and y.
Using also the second hyperbolic equation, a system of simultaneous equations can be provided that can be solved deriving the position of the mobile:
where Cij are constant with respect to the unknown (x,y).
According to the definitions given above, it is possible to arrive at the following:
The system of simultaneous equations (7) can be solved with an iterative method based on Taylor series and Newton iterations, or a close form solution as for example the one proposed by Chan (IEEE transactions on signal processing, Vol. 42, No. 8, August 1994). Both methods can be extended to include measures from more than 3 base stations or weight them, but the Chan method has the intrinsic advantage of being a one-step solution.
The manner of solving these equations is standard and do not discussed here in any greater detail save that in the TDOA system, (n+1) measurements to calculate are required to calculate the n-dimensional position of the mobile. Thus for obtaining a two-dimensional position fix, it will be necessary for the mobile to access at least three base stations.
The method embodying the present invention advantageously employs a mixed TOA and TDOA system. While the mobile has difficulty in synchronising with the adjacent base-stations, but it can synchronise and calculate correctly the absolute time of arrival with its own, i.e. “home”-base-station. Therefore it is possible to use one TOA equation and couple it into a system with the hyperbola at constant distance between the home base-station and a neighboring base station. In this case, the mobile will require access to only two base-stations to be able to calculate a position fix.
Such a system is illustrated with reference to
Even if this additional information is not available to the mobile, the method can still be used for tracking the position of the mobile instead then calculating it in a ‘cold’ situation (when no information is available at all). In fact assuming the mobile has already a correct, or near correct, estimation of its position, it will be generally simple to determine which of the two solutions represents the position and continue tracking its movements. This estimate will be a good guess for the TDOA-Taylor method, and the method will converge to the right solution.
This second scenario can also prove very useful in many cases where other methods fail. For example, it may prove possible to calculate the two-dimensional position of a mobile with measurements coming from three base stations in a simple TDOA system. However, should the user enter into an area with a sudden signal fade, for example an ‘urban canyon’, where maybe only two basestations remain visible, the TDOA method on its own would not provide any useful information and the user could not get any position reply. The position service will fail completely within these areas with the “standard” method. This failure could prove most problematic if the user needs urgent contact with, for example, the emergency services. In those same cases, and employing the concept of the present application, the user will be able to have the mobile's position calculated by this mixed algorithm.
Turning to the mathematical details of the algorithm itself: keeping the same notation as in (7) above we can write the new system for this combined TOA and TDOA case as:
where the terms Cij are constant respect to the unknown (x,y) and their expression is the same as defined above; R1 is the (accurate pseudorange calculated between the home base-station and the mobile; and xBS1, yBS1 are the known co-ordinates of the home basestation. This system can be solved in a similar manner to equation (7).
Thus in accordance with the present invention, there is provided a mobile radio terminal and related method of determining the position thereof, in which the position determination calculation is conducted on the downlink channel so as to be calculated directly at the mobile terminal. The positional information is therefore available at the mobile terminal without requiring any additional data transmission steps from the base stations.
| Number | Date | Country | Kind |
|---|---|---|---|
| 0023366.8 | Sep 2000 | GB | national |
| Number | Name | Date | Kind |
|---|---|---|---|
| 5758288 | Dunn et al. | May 1998 | A |
| 5987329 | Yost et al. | Nov 1999 | A |
| 6009091 | Stewart et al. | Dec 1999 | A |
| 6040800 | Raith et al. | Mar 2000 | A |
| 6070083 | Watters et al. | May 2000 | A |
| 6154657 | Grubeck et al. | Nov 2000 | A |
| 6160511 | Pfeil et al. | Dec 2000 | A |
| 6201973 | Kowaguchi | Mar 2001 | B1 |
| 6233459 | Sullivan et al. | May 2001 | B1 |
| 6252543 | Camp | Jun 2001 | B1 |
| 6275186 | Kong | Aug 2001 | B1 |
| 6327474 | Ruutu et al. | Dec 2001 | B1 |
| 6477379 | Kingdon | Nov 2002 | B1 |
| 6490454 | Kangas et al. | Dec 2002 | B1 |
| 6522296 | Holt | Feb 2003 | B1 |
| 6526283 | Jang | Feb 2003 | B1 |
| 6529165 | Duffett-Smith et al. | Mar 2003 | B1 |
| 6539229 | Ali | Mar 2003 | B1 |
| 6560462 | Ravi et al. | May 2003 | B1 |
| 6671514 | Cedervall et al. | Dec 2003 | B1 |
| 6674860 | Pirila | Jan 2004 | B1 |
| 6707422 | Sheynblat et al. | Mar 2004 | B1 |
| 20010004601 | Drane et al. | Jun 2001 | A1 |
| 20020086682 | Naghian | Jul 2002 | A1 |
| 20020132623 | Kingdon | Sep 2002 | A1 |
| Number | Date | Country |
|---|---|---|
| WO9937109 | Jul 1999 | WO |
| Number | Date | Country | |
|---|---|---|---|
| 20020052208 A1 | May 2002 | US |
