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A Faulkner-Bennett diagram (also known as a Plan diagram) is a diagram that shows any plan or series of events between the current state and a future state or states. Adjacent lines show alternate plans which can be connected to the main one, and points on these and the main line show events, choices, or changes in circumstance. The actual course of events taken can be listed using a special notation. These diagrams were conceived in 2015 by logicians Gavin Faulkner and Alexander Bennett for the purpose of explaining series of events and logical contingencies. It is a type of flowchart.
Example
editThis image shows a basic Faulkner-Bennett diagram. It contains two phases and the usual baseline, starting at and ending at . There are many subplans or contingencies, which are connected to each other in various ways. All junctions are marked.
Structure
editFaulkner-Bennett diagrams follow a clear and concise structure, divided into plans, phases, and points.
Baseline
editThe baseline of a Faulkner-Bennett diagram is the basic plan outline. It begins at , which represents the starting position before the plan is enacted, and ends at , which is the ideal final position after the plan concludes.
Phases
editEach diagram is divided into phases. There can be any number of these, and they are divided using vertical lines on the baseline up. They are numbered using Roman numerals in ascending order as the distance increases from . In the diagram above, there are two phases, I and II. It is common to see higher numbers of phases as the total length of the plan increases. Higher-numbered phases are done so to indicate increasing levels of unpredictability.
Points
editKey to the concept of the Faulkner-Bennett diagram is that of points. Points can be on the baseline or any other plan line, and represent a variety of things. In the above diagram, there are four points: , the starting point, , the ending point, and , two event points.
Points come in different varieties depending on what, if anything, changes at their occurrence. The three main types of points are:
Name | Division |
---|---|
Event point | Simple event, no change in course, it will continue along current plan line. |
Contingency point | Has a change to cause change in course, in which case it will change lines. |
Split point | Must change course, will change line to one of two or more options. |
Naming
editWhile each point is often referred to by a relative name to its line (i.e., the first point on a line is , the second is , and so on), it can also be referred to by an absolute name, such that each individual point in a single diagram has a unique name.
For instance, the first point on the baseline after is often labelled just , but has an absolute name of: . The second point on a contingency extending from an external junction in phase III has a relative name of , but an absolute name of . The third point on a second-level contingency in phase III extending from an internal junction in phase II extending from an external junction in phase I could be or
Junctions
editInternal decisions
editExternal decisions
editCrossing lines
editAlternates
editWhenever the plan reaches a junction point, like in the diagram, there is a possibility of continuing on the baseline, but also the possibility of going to another plan line, known as an alternate or contingency. The points on the contingency reset back to . Contingencies can both stack and return to the baseline, like at in the diagram.
The formula for staying on this baseline is:
The formula for entering on the contingency at is:
Notation
editThere is a notation for writing out specific paths on a given diagram. The example used in this article has a large, though finite, number of possible paths. The simplest path is always that of the baseline. The baseline path of the given diagram is given thus:
where each Arabic numeral indicates a change in phase, each comma indicates the start of a new point, indicates the starting point, represents an ending variant , and each series of lowercase Roman letters is a point.
Another, more complicated, path of the diagram is thus:
where previous definitions apply, represents a shift to a contingency away from the current plan and baseline, is a shift to a contingency closer to the baseline, represents a contingency that crosses phase lines, and represents ascending plans away from the baseline. Note: the notation for points resets to at every phase change and every plan change.
An explanation of all used conventions:
Name | Notation | Explanation |
---|---|---|
Point progression | The points and are reached in succession. | |
Phase change on baseline | Points up to are reached, then the phase changes to number and the letters reset. | |
Phase change off baseline | is the last point in phase . | |
Start | represents the starting position. | |
End | represents the ending position, variant . | |
Plan split | is the point of split, and the plan followed. | |
Plan change (external, up) | is the point where the plan changes to a variant due to external cause. | |
Plan change (external, down) | is the point where the plan changes to a lesser-variant due to external cause. | |
Plan change (internal, up) | is the point where the plan changes to a variant by choice. | |
Plan change (internal, down) | is the point where the plan changes to a lesser-variant by choice. |
History
editReferences
editExternal links
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