{"corpus_id":155523281,"paper_sha":"49cad043f8836814e4e8bd0cb00517613c1cb696","doi":"10.1088/1361-6544/ab4e0b","arxiv_id":null,"pmid":null,"pmcid":null,"mag_id":2943428725,"dblp_id":null,"acl_id":null,"title":"Selection of singular solutions in non-local transport equations","year":2019,"publication_date":"2019-12-02","venue":"Nonlinearity","journal":{"name":"Nonlinearity","pages":"325 - 340","volume":"33"},"journal_issn":null,"journal_title":null,"publication_types":[],"pubmed_pub_types":null,"s2_fields_of_study":["Mathematics","Physics"],"reference_count":31,"citation_count":7,"influential_citation_count":1,"is_open_access":true,"arxiv_categories":null,"arxiv_license":null,"arxiv_journal_ref":null,"mesh_headings":null,"chemicals":null,"comments_corrections":null,"source_flags":1,"s2_open_access_pdf_url":"https://digital.csic.es/bitstream/10261/229228/1/SELECTION%20OF%20SINGULAR%20SOLUTIONS.pdf","s2_open_access_landing_url":"https://www.semanticscholar.org/paper/49cad043f8836814e4e8bd0cb00517613c1cb696","s2_open_access_license":"other-oa","s2_open_access_status":"GREEN","pmc_open_access_pdf_url":null,"pmc_open_access_landing_url":null,"pmc_open_access_license":null,"pmc_open_access_status":null,"unpaywall_open_access_pdf_url":null,"unpaywall_open_access_landing_url":null,"unpaywall_open_access_license":null,"unpaywall_open_access_status":null,"abstract":"We consider two different non-local, and non-linear transport equations, both of which form singularities in finite time, starting from smooth initial conditions. The first, is a non-local version of the inviscid Burgers’ equation, which is hyperbolic and forms a shock in finite time; denotes the fractional derivative, which for is the Hilbert transform: . We show that singular solutions of the non-local equation for connect to the hierarchy of shock solutions of Burgers’ equation, which are obtained for . The second equation, is a simplified version of a class of ill-posed problems arising in the theory of vortex sheets and water waves, which are known to exhibit a weak curvature singularity in finite time, known as ‘Moore’s singularity’. The linearized form of (2) allows for a continuous family of curvature singularities, with the scaling exponent as a parameter, each of which is identical to those arising in Moore’s singularity. By considering the stability of each singularity, we are able to determine which exponent is selected, and show that its value depends on the parameter .","claims":[{"public_id":"cl_5c0cee75d5581a314bb9e13d3850e094","status":"active","text":"Singular solutions of the non-local Burgers-type equation connect to the hierarchy of shock solutions of Burgers' equation obtained for different values of the fractional-derivative parameter.","confidence":0.95,"contributors":[{"id":1,"public_id":"12632b8b5f","public_label":"Anonymous (12632b8b5f)","roles":["extraction"],"url":"https://sah.borca.ai/u/12632b8b5f"}],"url":"https://sah.borca.ai/claims/cl_5c0cee75d5581a314bb9e13d3850e094"},{"public_id":"cl_af5804250c0896950db8230f1a8aeb9b","status":"active","text":"Stability analysis identifies which curvature-singularity exponent is selected, and the selected exponent depends on the equation parameter.","confidence":0.96,"contributors":[{"id":1,"public_id":"12632b8b5f","public_label":"Anonymous 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