Study Area and Data

Figure A1

Figure A1. Time series of normalized weekly average daily malaria cases for 10 districts. Years are according to the Ethiopian calendar, in which year y begins on September 11 of year y+7 in...

We collected datasets consisting of weekly parasitologically confirmed malaria cases over an average of 10 years from health facilities in 10 districts of Ethiopia (Figure A1). The data arise from passive surveillance systems in selected districts for the years 1990–2000. Original data collected on the basis of Ethiopian weeks (which range from 5 to 9 days) were normalized to obtain mean daily cases for each Ethiopian week, and normalized data were used for all analysis. Data are summarized in Table 1.

Epidemic Detection Algorithms To Be Tested

We investigated four classes of algorithms for triggering alert thresholds. In each case, an alert was triggered if the defined threshold was exceeded for 2 consecutive weeks. (This choice is intended to improve the specificity of the alert system for any given threshold.) If another alert was triggered within 6 months, it was ignored, on the assumption that intervening after the first alert would prevent another epidemic within the next 6 months. For the purposes of historically based thresholds (1 and 2 below), the thresholds for each year were calculated on the basis of all other years in the dataset for a given health facility, excluding the year under consideration.

Weekly Percentile

The threshold was defined as a given percentile of the case numbers obtained in the same week of all years other than the one under consideration. The use of percentile as alert threshold is straightforward, and the method is relatively insensitive to extreme observations.

Weekly Mean with Standard Deviation (SD)

We defined the threshold as the weekly mean plus a defined number of SDs. Mean and SD were calculated from case counts, smoothed case counts, or log-transformed case counts.

Slide Positivity Percentage

Some studies have indicated that the proportions of positive slides were significantly higher than the usual rate during epidemics (16,17), but whether the rise in proportion of positive slides occurs early enough to serve as a useful early detection system is not known. Slide positivity proportion was calculated from the number of blood slides tested and positive slides for malaria parasites.

Slope of Weekly Cases on Log Scale

We hypothesized that rapid multiplication of the number of normalized cases from week to week might signal onset of an epidemic. To test this hypothesis and the usefulness of detecting such changes as a predictor of epidemics, we defined a set of alert thresholds on the basis of the slope of the natural logarithm of the number of normalized cases. An advantage of the slide positivity and log slope methods over the others is that they can, in principle, be used to construct alert thresholds in the absence of retrospective data.

Comparison of Alert Thresholds

Figure 1

Figure 1. Method for calculating potentially preventable cases (PPC) by using weekly mean. PPC is obtained from cases in excess of the weekly mean with an 8-week window.

To circumvent the difficulties inherent in defining a "true" epidemic and to compare the properties of these thresholds on a scale that reflects the potential, operational uses of alert thresholds, we evaluated each alert threshold algorithm for the number of alerts triggered and the number of cases that could be anticipated and prevented ("potentially prevented cases") if that alert threshold were in place. Potentially prevented cases (PPC) for each alert were defined as a function of the number of cases in a defined window starting 2 weeks after each alert (to allow for time to implement control measures). The window of effectiveness was assumed to last either 8 or 24 weeks (to account for control measures whose effects are of different durations). Since no control measure would be expected to abrogate malaria cases completely, we considered two possibilities for the number of cases in each week of the window that could be prevented: 1) cases in excess of the seasonal mean and 2) cases in excess of the seasonal mean minus 1 SD. When the observed number of cases in a week is less than the seasonal mean or the seasonal mean minus the SD, PPC is set to a minimum value of zero for that week. Figure 1 depicts graphically how the PPC was calculated. For each value of each type of threshold at each health facility, the number of PPC was transformed into a proportion (percentage), by adding the number of PPC for the alerts obtained and dividing this sum by the sum of the number of potentially prevented cases, over all weeks in the dataset.

To compare the performance of dissimilar alert types on a single scale, a curve was plotted for each type of algorithm that showed mean percent of PPC (%PPC) over all districts versus average number of alerts triggered per year, with each point representing a particular threshold value. "Better" threshold types and values are those that potentially prevent higher numbers of malaria cases with smaller numbers of alerts.

Random, Annual, and Optimally Timed Alerts

To evaluate the improvement in timing of alerts provided by each of these algorithms, we calculated PPC for alerts chosen on random weeks during the sampling period. We also made comparisons to two alert-generating policies that could not have been implemented but are in some sense optimal in hindsight. First, we evaluated a policy of triggering one alert each year on the "optimal" week, i.e., the week with the maximum value of PPC. The value of PPC corresponding to the optimal week simulated an "optimally timed" policy of annual interventions; thus, it represents one alert every year. Second, we retrospectively went through data for each site to identify the optimal timing of alerts if one had perfect predictive ability; namely, we compared PPC for a single alert generated on every week of the dataset and chose the optimal week for one alert; then we went through the remaining weeks and chose the optimal week for a second alert, and so on. This system allowed us to plot an upper bound curve for the best choice of alert times, given a defined alert frequency.

Data

A team from the Ethiopian National Malaria Control Program visited different health facilities to look for complete epidemiologic data with consistent malaria case definitions. After the field trip, health facilities with relatively high-quality recording and information systems were chosen. Health personnel from each facility selected for the study and staff from the National Malaria Control Program were given training on compiling data on illness and death from the existing patient logs.

Raw data for each week (j) of each year (i) from each health facility (h) consist of the number of slides examined during that week (E_hij) and the number of those slides that were positive for Plasmodium falciparum (C_hij). The original data were collected weekly on the basis of the Ethiopian calendar, which consists of 12 months, each with three 7-day weeks and one 9-day week (48 weeks), and a 49th week of 5 days. Weekly numbers of cases were normalized to a daily average by dividing raw case numbers by the number of days in the week.

Notation

Each point in the dataset refers to some measure of malaria prevalence in a given health facility (h) during a given week. Data from a given health facility during a given week may be indexed by an absolute time (t), or by a year (i) and a week of the year (j=1…49), to facilitate comparisons of the same week across years.

Subscripts

h – health facilityt – time in weeksi – yearj – week of the year, using the Ethiopian calendarf_t = number of days in week t

Weekly Data and Their Transformations

E_ht – number of slides examined at health facility h in week tC_ht – number of positive slides ("cases") at health facility h in week tX_ht = E_ht / f_t – normalized daily average total slides examined for week t at health facility hY_ht = C_ht / f_t – normalized daily average positive slides for week t at health facility hL_ht = ln(Y_ht) – log-transformed cases for week t at health facility hS_ht =

Threshold Definitions

T_hijs – threshold value in health facility h during week j of year i, using sensitivity sΦ_hTs – number of alerts generated in health facility h by threshold type T with sensitivity sQ_phij – the pth percentile of Y_h.j excluding year is – sensitivity of a threshold: number of standard deviations (SD), percentile cutoff, threshold for slide positivity, or log slopeμ_hij =[]∕ [ Z_hj – 1], weekly mean of normalized cases for week j, from all years except iσ_Yhij =√ {[

(Y_hij – μ_hij)^₂]∕[ Z_hj – 2]}, weekly SD of normalized cases for week j, from all years except i

Weekly Percentile

Threshold is exceeded when Y_hij > T_hij , where T_hij =Q_phij, where Q_phij represents the pth percentile (p = 70, 75, 80, 85, 90, or 95) percentile of observations from week j at facility h in years other than i.

Weekly Mean with SD

Threshold is exceeded when Y_hij > T_hij, where T_hji = µ_hij + βs_Yhij, where β = 0.5, 1.0, 1.5, 2.0, 2.5, or 3. A parallel definition is used for log-transformed (L_hij) and smoothed (S_hij) data, by using corresponding means and SD.

Normalized counts: the number of normalized weekly cases was used to derive the weekly mean and SD.

Smoothed normalized counts: To improve data smoothness, moving averages S_hij were obtained (see Notation above) from normalized counts and used both to calculate mean and SD for the thresholds, and to compare against the thresholds. Weekly means and SD were calculated from the {S_hij}.

Log-transformed series: To obtain data with reduced right skew, logged weekly counts L_hij were obtained (see Notation above) from normalized counts and used both to calculate mean and SD for thresholds and to compare against the thresholds. Weekly means and SD were calculated from the {L_hij}.

Slide Positivity Percentage

Slide positivity proportion (P_ht) was calculated for each week:P_ht = 100% * Y_ht∕X_htThreshold is exceeded when P_ht > z, where z = 30%, 35%, 40% …80%.

Slope of Weekly Cases on Log Scale

We defined a set of alert thresholds based on the slope (M_ht) of the natural logarithm of the number of normalized cases: M_ht = L_ht – L_ht-1

The threshold is exceeded when M_ht >m, where m = 0.2, 0.3, 0.4, or 0.7, which approximately corresponds to 25%, 35%, 50% or 100% increase relative to previous week’s number of cases.

Generating Potentially Prevented Cases

Potentially prevented cases (PPC) for each alert were defined as a function (q) of the number of cases in a defined window starting 2 weeks () after the alert (to allow for time to implement control measures). The window of effectiveness (∞) was assumed to last either 8 or 24 weeks (to account for control measures whose effects are of different durations). Since no control measure would be expected to abrogate malaria cases completely, we considered two possibilities for the number of cases in each week of the window that could be prevented: 1) cases in excess of the weekly mean: q_1ij = max(0,Y_ij - µ_ij), and 2) cases in excess of the weekly mean minus l SD: q_2ij = max(0,Y_ij – [µ_ij - σ_Yij]), where Y_ij is the observed number of cases, and µ_ij and σ_Yij are mean and SD for week j excluding year i. When the observed number of cases in a week is less than the weekly mean (in calculating q₁) or the weekly mean minus the SD (in calculating q₂), q is set to a minimum value of zero for that week. The PPC using a threshold type T with sensitivity s in dataset from health facility h, using function q_k is written as:

1) PPC¹_hTs =max (0, Y_hji - m_hji)

2) PPC²_hTs = max (0, Y_hji – [m_hji - s_Yhji]),

where Φ_hTs = number of alerts triggered by threshold type T with sensitivity s in data set from health facility h; t= the time of alert φ; = 2 representing number of weeks after alert turns on; and ∞ = 8 or 24 representing window period. Once an alert threshold triggers an alert at time t, and a control measure is applied, we ignored alerts within the next 6-month period until t+24 with the assumption that effective control measures will be taken and risk for another epidemic soon will be minimal.

For each value of each type of threshold at each health facility, the number of potentially prevented cases was transformed into a proportion (percentage), by adding the number of potentially prevented cases for the alerts obtained and dividing this sum by the sum, over all weeks in the dataset, of the number of potentially prevented cases in that week. Let %PPC_hTs denote percent of PPC_hTs and %PPC_Ts denotes the mean of %PPC_hTs from the different health facilities.

1) %PPC¹_hTs =∕

(Note: here the t and ij notations are used interchangeably.)

To compare the performance of dissimilar alert types on a single scale, a curve was plotted for each type of algorithm showing mean %PPC vs. average number of alerts triggered per year, with each point representing a particular threshold value.

Random Alert

To calculate the expected PPC for randomly timed alerts, the excess cases under excess case definition (q_k) for all weeks in the study was averaged to obtain an overall mean. For a window of length ∞ weeks, PPC_hrΦ represents the expected PPC for Φ randomly chosen alerts in dataset from health facility h.

Annual Alert

To determine the optimal week, we calculated PPC for a policy of triggering an alert automatically during week j (j = 1..49) every year, using window ∞. The optimal week was the week j with the maximum value of PPC. The value of PPC corresponding to the optimal week simulated an "optimally timed" policy of annual interventions; thus, it represents one alert every year.

describes PPC from health facility h when the alert is triggered every year at week j, and

denotes the maximum PPC from the best possible week.

=and

= and

Optimally Timed Alerts

To calculate the expected PPC for optimally timed alerts, we followed a recursive procedure. First, we searched through all weeks in the data set and chose the single week on which an alert would have the maximum PPC under a given case definition (q_k). Then, the process was repeated with the weeks that remained after "blocking" alerts for a period of 24 weeks before or after the first alert (since our algorithms were similarly constrained never to have two alerts <24 weeks apart). This process was repeated up to a total of 10 alerts for each site. This process approximates the optimal timing of alerts, although theoretically all possible combinations of a given number of alerts would have to be tried to ensure optimal timing. Since each site had a slightly different number of weeks in the dataset, a given number of alerts corresponded to slightly different frequencies in the different sites (hence, the horizontal scatter of points in Figure 2). The "optimal alert" points in Figure 2 were calculated by "binning" similar frequency values and averaging the %PPC across values in a bin. Percent PPC from all districts for a given number of random and optimally timed alerts and for the annual alert were calculated in analogous ways.

Comparison of Use of Weekly versus Monthly Data

We also compared the efficiency of the weekly percentile method applied to weekly data vs. the same method applied to monthly data. For this purpose weekly data were converted into monthly data, and alert threshold levels based on the percentile were built and a similar procedure was used, except that an alert was triggered when the observed monthly value exceeded the threshold determined by the method in any single month. For this comparison, we considered PPC formula q₁, with φ = 8 weeks. A set of computer programs written in Stata to perform the methods presented in this article is available.