{"month":"03","type":"journal_article","publisher":"Elsevier","date_created":"2018-12-11T12:02:18Z","quality_controlled":"1","oa_version":"Preprint","scopus_import":1,"issue":"4-5","oa":1,"intvolume":" 160","date_updated":"2021-01-12T07:42:11Z","date_published":"2012-03-01T00:00:00Z","doi":"10.1016/j.dam.2011.10.026","day":"01","external_id":{"arxiv":["1005.2305"]},"user_id":"2DF688A6-F248-11E8-B48F-1D18A9856A87","publication":"Discrete Applied Mathematics","title":"Generalized roof duality and bisubmodular functions","citation":{"ama":"Kolmogorov V. Generalized roof duality and bisubmodular functions. Discrete Applied Mathematics. 2012;160(4-5):416-426. doi:10.1016/j.dam.2011.10.026","short":"V. Kolmogorov, Discrete Applied Mathematics 160 (2012) 416–426.","ista":"Kolmogorov V. 2012. Generalized roof duality and bisubmodular functions. Discrete Applied Mathematics. 160(4–5), 416–426.","chicago":"Kolmogorov, Vladimir. “Generalized Roof Duality and Bisubmodular Functions.” Discrete Applied Mathematics. Elsevier, 2012. https://doi.org/10.1016/j.dam.2011.10.026.","ieee":"V. Kolmogorov, “Generalized roof duality and bisubmodular functions,” Discrete Applied Mathematics, vol. 160, no. 4–5. Elsevier, pp. 416–426, 2012.","mla":"Kolmogorov, Vladimir. “Generalized Roof Duality and Bisubmodular Functions.” Discrete Applied Mathematics, vol. 160, no. 4–5, Elsevier, 2012, pp. 416–26, doi:10.1016/j.dam.2011.10.026.","apa":"Kolmogorov, V. (2012). Generalized roof duality and bisubmodular functions. Discrete Applied Mathematics. Elsevier. https://doi.org/10.1016/j.dam.2011.10.026"},"_id":"3257","main_file_link":[{"url":"http://arxiv.org/abs/1005.2305","open_access":"1"}],"language":[{"iso":"eng"}],"year":"2012","author":[{"first_name":"Vladimir","full_name":"Kolmogorov, Vladimir","last_name":"Kolmogorov","id":"3D50B0BA-F248-11E8-B48F-1D18A9856A87"}],"page":"416 - 426","publist_id":"3397","publication_status":"published","status":"public","abstract":[{"text":"Consider a convex relaxation f̂ of a pseudo-Boolean function f. We say that the relaxation is totally half-integral if f̂(x) is a polyhedral function with half-integral extreme points x, and this property is preserved after adding an arbitrary combination of constraints of the form x i=x j, x i=1-x j, and x i=γ where γ∈{0,1,1/2} is a constant. A well-known example is the roof duality relaxation for quadratic pseudo-Boolean functions f. We argue that total half-integrality is a natural requirement for generalizations of roof duality to arbitrary pseudo-Boolean functions. Our contributions are as follows. First, we provide a complete characterization of totally half-integral relaxations f̂ by establishing a one-to-one correspondence with bisubmodular functions. Second, we give a new characterization of bisubmodular functions. Finally, we show some relationships between general totally half-integral relaxations and relaxations based on the roof duality. On the conceptual level, our results show that bisubmodular functions provide a natural generalization of the roof duality approach to higher-order terms. This can be viewed as a non-submodular analogue of the fact that submodular functions generalize the s-t minimum cut problem with non-negative weights to higher-order terms.","lang":"eng"}],"related_material":{"record":[{"status":"public","id":"2934","relation":"earlier_version"}]},"volume":160,"department":[{"_id":"VlKo"}]}