Abstract
Submodularity is a fundamental phenomenon in combinatorial optimization.
Submodular functions occur in a variety of combinatorial settings such as
coverage problems, cut problems, welfare maximization, and many more.
Therefore, a lot of work has been concerned with maximizing or minimizing a
submodular function, often subject to combinatorial constraints. Many of these
algorithmic results exhibit a common structure. Namely, the function is
extended to a continuous, usually non-linear, function on a convex domain.
Then, this relaxation is solved, and the fractional solution rounded to yield
an integral solution. Often, the continuous extension has a natural
interpretation in terms of distributions on subsets of the ground set. This
interpretation is often crucial to the results and their analysis. The purpose
of this survey is to highlight this connection between extensions,
distributions, relaxations, and optimization in the context of submodular
functions. We also present the first constant factor approximation algorithm
for minimizing symmetric submodular functions subject to a cardinality
constraint.
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