164 research outputs found
On k-Column Sparse Packing Programs
We consider the class of packing integer programs (PIPs) that are column
sparse, i.e. there is a specified upper bound k on the number of constraints
that each variable appears in. We give an (ek+o(k))-approximation algorithm for
k-column sparse PIPs, improving on recent results of and
. We also show that the integrality gap of our linear programming
relaxation is at least 2k-1; it is known that k-column sparse PIPs are
-hard to approximate. We also extend our result (at the loss
of a small constant factor) to the more general case of maximizing a submodular
objective over k-column sparse packing constraints.Comment: 19 pages, v3: additional detail
On Integer Programming, Discrepancy, and Convolution
Integer programs with a constant number of constraints are solvable in
pseudo-polynomial time. We give a new algorithm with a better pseudo-polynomial
running time than previous results. Moreover, we establish a strong connection
to the problem (min, +)-convolution. (min, +)-convolution has a trivial
quadratic time algorithm and it has been conjectured that this cannot be
improved significantly. We show that further improvements to our
pseudo-polynomial algorithm for any fixed number of constraints are equivalent
to improvements for (min, +)-convolution. This is a strong evidence that our
algorithm's running time is the best possible. We also present a faster
specialized algorithm for testing feasibility of an integer program with few
constraints and for this we also give a tight lower bound, which is based on
the SETH.Comment: A preliminary version appeared in the proceedings of ITCS 201
On a generalization of iterated and randomized rounding
We give a general method for rounding linear programs that combines the
commonly used iterated rounding and randomized rounding techniques. In
particular, we show that whenever iterated rounding can be applied to a problem
with some slack, there is a randomized procedure that returns an integral
solution that satisfies the guarantees of iterated rounding and also has
concentration properties. We use this to give new results for several classic
problems where iterated rounding has been useful
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