Improved Precision of Delay Times Determined Through Cross Correlation pairs of differential delays τik and τkj (with k 6=i and k 6=j) and which can also be used to estimate τij , since they obey the rule: τkij = τ est ik + τ est kj (3) Their arithmetic mean τAij is another estimate for the differential delay: τAij = 1 N − 2 N−2∑ k=1 τkij (4) We term this new estimate an out-member average, for it uses time series outside a given pair to esti- mate the differential delay of that pair. Equations (3) and (4) define a linear relationship between τAij and (2N − 4) distinct τestij ’s. The usual rule of error prop- agation for linear systems (Figure 1) then gives: σ2A = (2N − 4) [ 1 + (N − 2)α ] N − 2)2 σ2 (5) In the N →∞ limit, (6) reduces to σ2A = 2ασ2 (Fig- ure 2). Thus, σ2A < σ 2 when α < 1/2. Note that computation of τAij does not depend on the value of the corresponding τestij ; the formula for the former (equation 4) is not a function of the latter. A comparison of the two estimates is useful because a significant mismatch can flag gross errors in the data processing, such as cycle-slips (two oscillatory wave- forms misaligned by exactly one cycle). Since τestij Figure 1. Analysis used to derive equation (5), based on examining the differential delay matrix τij for the case N = 6. We focus here on τ23 (circle). Any of N − 2 = 4 pairs of delays of the form τ2k, τk3 can be used to estimate τ23 (highlighted boxes connected in pairs). The mean delay τA23 is constructed by averaging these 2N − 4 = 8 highlighted delays, which are grouped together in the vector v. The covariance matrix Cv has diagonal elements σ2 and off-diagonal elements that are either ασ2 or zero. The non-zero elements of Cv correspond to pairs of vi’s corresponding to pairs of τij’s that share a common index. Every vk corresponds to a τij taken from either a row or column of τ , and so shares an index with the N − 3 = 3 elements in that row or column (triangles). Furthermore, it shares an index with the other member of its pair (rectangles). Thus, a row of Cv contains one instance of σ2 and N −2 = 4 instances of ασ2, the other elements being zero. Averaging is a linear operation of the form τA23 = Av with A = (N − 2)−1[1, 1, 1...1]. The usual rule of error propagation (e.g. Menke and Menke, 2012, their equation 3.36) gives the variance of τA23 as σA = ACvA T which when multiplied out yields equation (5). – Aðferð til að leiða út jöfnu (5) fyrir N tímaraðir skjálftamæligagna. Þær innihalda allar samskonar merki ásamt suði. Hliðrun er hinsvegar í merkinu milli hvers tímaraða-pars, og þarf að meta hana úr gögnunum. Aðferðin er hér sett upp í fylki fyrir tilfellið N = 6. Vinstra megin er athygli beint að mati á hliðruninni milli tímaraða 2 og 3 (hringur). Fervik dreifinga á því mati má minnka með því að nýta á tiltekinn hátt mæligögnin úr hinum tímaröðunum. JÖKULL No. 64, 2014 17

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