[{"_id":"3974","publication_status":"published","status":"public","author":[{"id":"3FB178DA-F248-11E8-B48F-1D18A9856A87","orcid":"0000-0002-9823-6833","first_name":"Herbert","last_name":"Edelsbrunner"},{"last_name":"Harer","first_name":"John"},{"id":"34A254A0-F248-11E8-B48F-1D18A9856A87","first_name":"Amit","last_name":"Patel"}],"date_updated":"2021-01-12T07:53:35Z","dini_type":"doc-type:conferenceObject","date_created":"2018-12-11T12:06:13Z","type":"conference","abstract":[{"lang":"eng"}],"publist_id":"2155","extern":1,"citation":{"ieee":"H. Edelsbrunner, J. Harer, and A. Patel, “Reeb spaces of piecewise linear mappings,” presented at the SCG: Symposium on Computational Geometry, 2008, pp. 242–250.","apa":"Edelsbrunner, H., Harer, J., & Patel, A. (2008). Reeb spaces of piecewise linear mappings (pp. 242–250). Presented at the SCG: Symposium on Computational Geometry, ACM. https://doi.org/10.1145/1377676.1377720","ista":"Edelsbrunner H, Harer J, Patel A. 2008. Reeb spaces of piecewise linear mappings. SCG: Symposium on Computational Geometry, 242–250.","chicago":"Edelsbrunner, Herbert, John Harer, and Amit Patel. “Reeb Spaces of Piecewise Linear Mappings,” 242–50. ACM, 2008. https://doi.org/10.1145/1377676.1377720.","short":"H. Edelsbrunner, J. Harer, A. Patel, in:, ACM, 2008, pp. 242–250.","mla":"Edelsbrunner, Herbert, et al. Reeb Spaces of Piecewise Linear Mappings. ACM, 2008, pp. 242–50, doi:10.1145/1377676.1377720."},"quality_controlled":0,"page":"242 - 250","conference":{"name":"SCG: Symposium on Computational Geometry"},"date_published":"2008-01-01T00:00:00Z","dc":{"date":["2008"],"title":["Reeb spaces of piecewise linear mappings"],"relation":["info:eu-repo/semantics/altIdentifier/doi/10.1145/1377676.1377720"],"publisher":["ACM"],"source":["Edelsbrunner H, Harer J, Patel A. Reeb spaces of piecewise linear mappings. In: ACM; 2008:242-250. doi:10.1145/1377676.1377720"],"rights":["info:eu-repo/semantics/closedAccess"],"creator":["Herbert Edelsbrunner","Harer, John","Amit Patel"],"description":["Generalizing the concept of a Reeb graph, the Reeb space of a multivariate continuous mapping identifies points of the domain that belong to a common component of the preimage of a point in the range. We study the local and global structure of this space for generic, piecewise linear mappings on a combinatorial manifold."],"type":["info:eu-repo/semantics/conferenceObject","doc-type:conferenceObject","text","http://purl.org/coar/resource_type/c_5794"],"identifier":["https://research-explorer.ista.ac.at/record/3974"]},"month":"01","day":"01","uri_base":"https://research-explorer.ista.ac.at"}]