Biserka Draščić Ban scite author profile

Global and regional positional accuracy assessment is of the highest importance for any satellite navigation system, including the Global Positioning System (GPS). Although positioning error can be expressed as a vector quantity with direction and magnitude, most of the research focuses on error magnitude only. The positional accuracy can be evaluated in terms of navigational quadrants as further refinement of error distribution, as it was shown here. This research was conducted in the wider area of the Northern Adriatic Region, employing the International Global Navigation Satellite Systems (GNSS) Service (IGS) data and products. Similarities of positional accuracy and deviations distributions for Single Point Positioning (SPP) were addressed in terms of magnitudes. Data were analyzed during the 11-day period. Linear and circular statistical methods were used to quantify regional positional accuracy and error behavior. This was conducted in terms of both scalar and vector values, with assessment of the underlying probability distributions. Navigational quadrantal positioning error subset analysis was carried out. Similarity in the positional accuracy and positioning deviations behavior, with uneven positional distribution between quadrants, indicated the directionality of the total positioning error. The underlying distributions for latitude and longitude deviations followed approximately normal distributions, while the radius was approximated by the Rayleigh distribution. The Weibull and gamma distributions were considered, as well. Possible causes of the analyzed positioning deviations were not investigated, but the ultimate positioning products were obtained as in standard, single-frequency positioning scenarios.

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Quotient mean series

Ban¹

2010

Banach J. Math. Anal.

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The well-known Mathieu seriescan be transformed into the formwhere G(n, r) and Q(n, r) denote the Geometric and Quadratic mean of n ∈ N and r > 0. This connection leads us to the idea to introduce and research the so-called Quotient mean series as a be a generalizations of Mathieu's and Mathieu-type series. We give an integral representation of such series and their alternating variant, together with associated inequalities. Also, special cases of quotient mean series, involving Bessel function of the first kind, have been studied in detail.

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On multiple Mathieu $(a, \lambda)$–series

Ban¹

2010

MMN

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In this paper we introduce the multiple Mathieu .a; /-series. We obtain two integral representations for multiple Mathieu .a; /-series applying Ivanov's and then Pogány's variant of multiple Euler-Maclaurin summation formula. Then, a bilateral bounding inequality is derived by virtue of the achieved integral expressions. Finally, the special case of multiple Mathieu .a; /-series, the multiple Mathieu a-series has been investigated.

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Generalization of the Quotient Mean Series

Ban

2019

Results Math

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