一种用于GPS整周模糊度OTF求解的整数白化滤波改进算法

提出一种用于整周模糊度OTF求解的整数白化滤波改进算法。该算法首先对整周模糊度的协方差矩阵进行整数白化滤波处理 ,以降低整周模糊度间的相关性 ,然后构造搜索空间来判定是否需要进行搜索。如果需要 ,则通过搜索来确定变换后的整周模糊度 ;如果不需要 ,则通过直接取整来确定整周模糊度 ,进而得到原始的整周模糊度和基线分量的固定解。初步试验结果显示 ,采用改进方法解算整周模糊度可以提高成功率和解算效率     

一种单频单历元GPS整周模糊度的解算方法

考虑到遗传算法的全局最优搜索特性，将遗传算法与模糊度函数法相结合，用一个历元的C／A码观测值与单频单历元的L1载波观测值作为基本观测量来确定GPS相位整周模糊度值，从而形成了基于遗传算法的AFM整周模糊度搜索策略。新算法能够快速、稳健地搜索到正确整周模糊度组合。     

顾及基线先验信息的GPS模糊度快速解算

采用GPS相位观测值进行快速定位时,其解算模型严重病态,最小二乘解得的浮点模糊度精度差且相关性大,导致整周模糊度搜索空间过大,难以正确固定。本文提出一种顾及基线先验信息和模糊度线性约束的整数条件的GPS模糊度快速解算方法,先用顾及基线先验信息的正则化算法解得精度较高且相关性较小的浮点模糊度,以减小整周模糊度的搜索空间;再综合利用整周模糊度间的线性约束的整数条件和基线先验信息,进一步有效地减小模糊度搜索空间,提高搜索效率。算例表明:顾及基线先验信息的正则化算法有效地改善了模糊度浮点解,模糊度线性约束的整数条件有效地提高搜索效率和成功率。     

利用改进遗传算法求解整周模糊度

本文首先通过整数高斯变换,降低了各整周模糊度分量之间的相关性,并在此基础上提出了均匀设计与遗传算法相结合的方法进行整周模糊度搜索,最后进行了基线解算实验。解算结果表明,该算法用于模糊度求解极大提高了搜索效率。     

进化策略搜索单频GPS整周模糊度研究

本文提出利用进化策略算法搜索单频GPS整周模糊度,即先利用序贯最小二乘估计降低法矩阵维度,利用正则化算法得到比较接近模糊度真值的浮点解,以此为初值确定搜索范围,并利用进化策略算法搜索模糊度固定解。算例结果表明,该方法能在1min内固定整周模糊度,动态定位结果与GrafNav解算结果误差在2.5cm之内。     

基于ICSO的DGPS整周模糊度的求解方法

针对差分全球定位系统(DGPS)模糊度解算过程中效率低,搜索慢的问题,对鸡群优化算法(CSO)进行适应性改进,并将改进后的鸡群优化算法(ICSO)应用到整周模糊度的快速解算中,利用卡尔曼滤波求出双差模糊度的浮点解和协方差矩阵,采用Lenstra-Lenstra-Lovasz (LLL)降相关算法对模糊度的浮点解和方差协方差矩阵进行降相关处理,以降低模糊度各分量之间的相关性,在基线长度固定的情况下,利用ICSO搜索整周模糊度的最优解. 采用经典算例进行仿真,仿真结果表明,与已有文献相比在整周模糊度的解算过程中改进的鸡群优化算法能有效提高搜索速度和求解成功率.      

基于LAMBDA和DC算法的GPS单历元整周模糊度的快速确定

仅利用LAMBDA方法求解GPS单历元整周模糊度成功率不高,并且当接收卫星数较多时搜索空间较大。为此,采用TIKHONOV正则化方法削弱单历元模型法方程的病态性,并且基于协方差矩阵选择部分宽巷模糊度,先采用LAMBDA方法进行搜索,再利用高解算效率的DC算法解算剩余宽巷模糊度,最后通过两组不同线性组合的逆变换直接求取原始观测值L1和L2的整周模糊度。实验和计算表明,方法显著提高整周模糊度的搜索效率,并且提高模糊度搜索成功率。     

基于LAMBDA整周模糊度解算方法中的整数Z变换算法

LAMBDA算法是目前公认求解整周模糊度效果最好的方法,该算法主要包括模糊度去相关处理(Z变换)和整周模糊度搜索,其中Z变换对高度相关的整周模糊度进行降相关处理是LAMBDA算法的核心内容。本文分析了Z变换中迭代法和联合去相关法两种算法的基本原理,并通过实例对两种算法进行了性能评价,实验分析表明两种算法去相关水平相当,迭代次数无明显差异,但矩阵维数越大,去相关效果越有所下降。总体而言,联合去相关效果略高于迭代法。     

不依赖假设检验的整周模糊度确认

扼要分析了现行整周模糊度确认方法 ,进而提出并证明了一条缩小整周模糊度搜索空间的定理。根据此定理 ,提出了一种不依赖假设检验的整周模糊度确认方法。该方法不仅可以加快整周模糊度的搜索速度 ,而且在次小残差二次型和最小残差二次型之比较小的情况下也能固定整周模糊度 ,并给出一个固定正确性的数字指标     

BDS网络RTK参考站三频整周模糊度解算方法

北斗卫星导航系统是目前唯一一个全星座提供三频观测数据的卫星导航定位系统,三频观测值有助于载波相位整周模糊度的快速、准确固定。本文提出了一种BDS网络RTK参考站三频整周模糊度解算方法。首先利用B2、B3频率的观测值及严格的模糊度固定标准确定超宽巷整周模糊度,将固定的超宽巷整周模糊度与其他宽巷整周模糊度的线性关系作为约束条件,然后估计宽巷整周模糊度、相对天顶对流层延迟误差和电离层延迟误差,并搜索确定宽巷整周模糊度。利用固定的宽巷整周模糊度与三频载波相位整周模糊度的整数线性关系,将线性关系加入载波相位整周模糊度参数估计观测模型中,然后确定载波相位整周模糊度。使用实测的CORS网BDS三频观测数据进行算法验证,结果表明,该方法可正确有效地实现参考站间三频载波相位整周模糊度的快速解算。     

整周模糊度解正确性的评价方法

首先指出了基于传统的假设检验理论的三步法在评价模糊度整数解正确性时存在的理论缺陷，然后介绍了模糊度归整域的概念和可容许整数估计的定义，并在可容许整数估计原定义的基础上给出了更为严密的新定义。最后，基于这个可容许整数估计的新定义，讨论了模糊度成功率的概念及其计算公式。从理论上讲，只有模糊度的成功率才是评价模糊度整数解正确性的严密尺度。     

Integer estimation in the presence of biases

 Carrier phase ambiguity resolution is the key to fast and high-precision GNSS (Global Navigation Satellite System) kinematic positioning. Critical in the application of ambiguity resolution is the quality of the computed integer ambiguities. Unsuccessful ambiguity resolution, when passed unnoticed, will too often lead to unacceptable errors in the positioning results. Very high success rates are therefore required for ambiguity resolution to be reliable. Biases which are unaccounted for will lower the success rate and thus increase the chance of unsuccessful ambiguity resolution. The performance of integer ambiguity estimation in the presence of such biases is studied. Particular attention is given to integer rounding, integer bootstrapping and integer least squares. Lower and upper bounds, as well as an exact and easy-to-compute formula for the bias-affected success rate, are presented. These results will enable the evaluation of the bias robustness of ambiguity resolution. Received: 28 September 2000 / Accepted: 29 March 2001     

基于整数可逆模糊度变换和概率计算的GPS动态数据处理快速算法

在讨论整数可逆模糊度变换对模糊度搜索空间影响及直接取整法成功概率的基础上，结合Kalman滤波技术，提出一种新的GPS动态数据处理快速算法－－基于概率计算的模糊度快速分解技术（Probability Based Fast Ambiguity-resolution Technique,简称PBFAT法）。该算法在取整成功概率大于给定限值时，直接对浮点模糊度取整；若取整概率小于给定的值则进行一定范围的模糊度搜索。试验表明该方法的计算速度高于传统方法，所求的模糊度有一个明确的置信水平。     

评价GPS相位模糊度整数解正确性的严密方法

针对如何评价模糊度整数解的正确性，指出了基于传统的假设检验理论的三步法存在的理论缺陷，介绍了模糊度归整域的概念和可容许整数估计的定义，并在Teunissen关于可容许整数估计原定义的基础上给出了更为严密的新定义。基于这个新定义，讨论了模糊度成功率的概念及其计算公式。     

Penalized GNSS Ambiguity Resolution

Global Navigation Satellite System (GNSS) carrier phase ambiguity resolution is the process of resolving the carrier phase ambiguities as integers. It is the key to fast and high precision GNSS positioning and it applies to a great variety of GNSS models which are currently in use in navigation, surveying, geodesy and geophysics. A new principle of carrier phase ambiguity resolution is introduced. The idea is to give the user the possibility to assign penalties to the possible outcomes of the ambiguity resolution process: a high penalty for an incorrect integer outcome, a low penalty for a correct integer outcome and a medium penalty for the real valued float solution. As a result of the penalty assignment, each ambiguity resolution process has its own overall penalty. Using this penalty as the objective function which needs to be minimized, it is shown which ambiguity mapping has the smallest possible penalty. The theory presented is formulated using the class of integer aperture estimators as a framework. This class of estimators was introduced elsewhere as a larger class than the class of integer estimators. Integer aperture estimators, being of a hybrid nature, can have integer outcomes as well as non-integer outcomes. The minimal penalty ambiguity estimator is an example of an integer aperture estimator. The computational steps involved for determining the outcome of the minimal penalty estimator are given. The additional complexity in comparison with current practice is minor, since the optimal integer estimator still plays a major role in the solution of the minimal penalty ambiguity estimator.     

一种整周模糊度快速求解的改进LAMBDA方法

本文提出了一种改进LAMBDA方法:在确定Z变换后的模糊度时,改变以往对所有历元的模糊度全部进行搜索的做法,而是通过设置合理的条件,将搜索与直接归整有效地结合起来,从而减少了模糊度的解算时间,提高了解的效率。文章最后利用实测GPS数据验证了改进效果。     

Integer aperture bootstrapping: a new GNSS ambiguity estimator with controllable fail-rate

In this contribution, we introduce a new bootstrap-based method for Global Navigation Satellite System (GNSS) carrier-phase ambiguity resolution. Integer bootstrapping is known to be one of the simplest methods for integer ambiguity estimation with close-to-optimal performance. Its outcome is easy to compute due to the absence of an integer search, and its performance is close to optimal if the decorrelating Z-transformation of the LAMBDA method is used. Moreover, the bootstrapped estimator is presently the only integer estimator for which an exact and easy-to-compute expression of its fail-rate can be given. A possible disadvantage is, however, that the user has only a limited control over the fail-rate. Once the underlying mathematical model is given, the user has no freedom left in changing the value of the fail-rate. Here, we present an ambiguity estimator for which the user is given additional freedom. For this purpose, use is made of the class of integer aperture estimators as introduced in Teunissen (2003). This class is larger than the class of integer estimators. Integer aperture estimators are of a hybrid nature and can have integer outcomes as well as non-integer outcomes. The new estimator is referred to as integer aperture bootstrapping. This new estimator has all the advantages known from integer bootstrapping with the additional advantage that its fail-rate can be controlled by the user. This is made possible by giving the user the freedom over the aperture of the pull-in region. We also give an exact and easy-to-compute expression for its controllable fail-rate.     

基于整周模糊度概率特性的有效性检验

准确确定载波相位整周模糊度是快速高精度GPS定位的关键,已有的检验GPS整周模糊度有效性的方法几乎均是基于其为非随机常量建立的,因而都存在一定的缺陷。本文在研究整周模糊度概率特性的基础上,提出一种基于LABMBAD算法的整周模糊度概率分布函数的检验方法。实际演算表明该方法简单有效,统计概念明确。     

An optimality property of the integer least-squares estimator

A probabilistic justification is given for using the integer least-squares (LS) estimator. The class of admissible integer estimators is introduced and classical adjustment theory is extended by proving that the integer LS estimator is best in the sense of maximizing the probability of correct integer estimation. For global positioning system ambiguity resolution, this implies that the success rate of any other integer estimator of the carrier phase ambiguities will be smaller than or at the most equal to the ambiguity success rate of the integer LS estimator. The success rates of any one of these estimators may therefore be used to provide lower bounds for the LS success rate. This is particularly useful in case of the bootstrapped estimator. Received: 11 January 1999 / Accepted: 9 July 1999