When can $l_p$-norm objective functions be minimized via graph cuts?
Abstract
Techniques based on minimal graph cuts have become a standard tool for solving combinatorial optimization problems arising in image processing and computer vision applications. These techniques can be used to minimize objective functions written as the sum of a set of unary and pairwise terms, provided that the objective function is submodular. This can be interpreted as minimizing the -norm of the vector containing all pairwise and unary terms. By raising each term to a power , the same technique can also be used to minimize the -norm of the vector. Unfortunately, the submodularity of an -norm objective function does not guarantee the submodularity of the corresponding -norm objective function. The contribution of this paper is to provide useful conditions under which an -norm objective function is submodular for all , thereby identifying a large class of -norm objective functions that can be minimized via minimal graph cuts.
Cite
@article{arxiv.1802.00624,
title = {When can $l_p$-norm objective functions be minimized via graph cuts?},
author = {Filip Malmberg and Robin Strand},
journal= {arXiv preprint arXiv:1802.00624},
year = {2019}
}
Comments
In proceedings of the 19th international workshop on combinatorial image analysis (IWCIA), 2018