Transfers Set to Self-Calculate
This analysis rule includes the transfer elements that have the self-calculating flag set to TRUE. This can indicate the following.
- No reliable data exists on which to base the quantity calculation
- Start and end times of the transfer are unknown
The following table lists a sample log output for this analysis.
Sample Log
| Time | Severity | Element | Attribute | Message |
|---|---|---|---|---|
| 9/1/2005 10:06 | ...REPORTING TRANSFER SET TO SELF-CALCULATE | |||
| 9/1/2005 10:06 | Warning | TransferA | Source = NodeA; Destination = ProcessA |
Analysis Method
- Collect a list of all transfer elements within the time range of the Case that satisfy the following criteria:
- Status Attribute value is IS (In Service)
- If the transfer is not marked as self-calculating, remove it from the analyzed list.
- Write to the log section of the case. Report the test name and the Measurement Basis. Report the list of offending transfers, ordered by name and cause of violation.
Configuration Using the Wizard
The configuration of the Transfers set to Self Calculate is a selection of the General Gross Error Analysis Rule. You open the window for configuring the test (shown in the following figure) from the General Gross Error Analysis Rule Wizard.
Open the Gross Error Configuration window as described in Configuring - General Gross Error Analysis Rule.
On the Transfers tab, select Transfers set to self-calculate.
A Transfers set to self-calculate - Attributes window opens.
Select the Attributes that represent the Self-Calculating Flag, according to the following table:
Attributes
Selections Description Status Transfer in/out of service status. The default is to 'ObjectStatus'. Self-Calculating Flag Indicates if the measurement is automatically calculated by the Sigmafine reconciliation solver. The default is 'SelfCalculatingFlag'. Click OK to finish the configuration.
The text "CONFIGURED" displays next to the 'Transfers set to self-calculate' selection.
To run this test, see Running the General Gross Error Analysis.