In mathematics graph theory, a single-entry single-exit (SESE) region in a given graph is an ordered edge pair.

For example, with the ordered edge pair, (a, b) of distinct control-flow edges a and b where:

  1. a dominates b
  2. b postdominates a
  3. Every cycle containing a also contains b and vice versa.

where a node x is said to dominate node y in a directed graph if every path from start to y includes x. A node x is said to postdominate a node y if every path from y to end includes x.

So, a and b refer to the entry and exit edge, respectively.

  • The first condition ensures that every path from start into the region passes through the region’s entry edge, a.
  • The second condition ensures that every path from inside the region to end passes through the region’s exit edge, b.
  • The first two conditions are necessary but not enough to characterize SESE regions: since backedges do not alter the dominance or postdominance relationships, the first two conditions alone do not prohibit backedges entering or exiting the region.
  • The third condition encodes two constraints: every path from inside the region to a point 'above' a passed through b, and every path from a point 'below' b to a point inside the region passes through a.[1]

References


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