{"_id":"t4dsEvDmA5LT98QP6","bibbaseid":"zayed-hassan-aninverseproblemofthewaveequationforageneraldoublyconnectedregioninr2withafinitenumberofpiecewisesmoothrobinboundaryconditions-2002","author_short":["Zayed, E. M. E.","Hassan, I. H. A."],"bibdata":{"bibtype":"article","type":"article","added-at":"2020-02-21T00:00:00.000+0100","author":[{"propositions":[],"lastnames":["Zayed"],"firstnames":["E.","M.","E."],"suffixes":[]},{"propositions":[],"lastnames":["Hassan"],"firstnames":["I.","H.","Abdel-Halim"],"suffixes":[]}],"biburl":"https://www.bibsonomy.org/bibtex/2b5b76a5a94ffc0eb056c61ad281e5054/dblp","ee":"https://doi.org/10.1016/S0096-3003(01)00186-2","interhash":"e6f48e3a822f812ef5ae240642080589","intrahash":"b5b76a5a94ffc0eb056c61ad281e5054","journal":"Appl. Math. Comput.","keywords":"dblp","number":"1","pages":"187-204","timestamp":"2020-02-22T11:48:03.000+0100","title":"An inverse problem of the wave equation for a general doubly connected region in R2 with a finite number of piecewise smooth Robin boundary conditions.","url":"http://dblp.uni-trier.de/db/journals/amc/amc132.html#ZayedH02","volume":"132","year":"2002","author_short":["Zayed, E. M. E.","Hassan, I. H. A."],"key":"journals/amc/ZayedH02","id":"journals/amc/ZayedH02","bibbaseid":"zayed-hassan-aninverseproblemofthewaveequationforageneraldoublyconnectedregioninr2withafinitenumberofpiecewisesmoothrobinboundaryconditions-2002","role":"author","urls":{"Link":"https://doi.org/10.1016/S0096-3003(01)00186-2","Paper":"http://dblp.uni-trier.de/db/journals/amc/amc132.html#ZayedH02"},"keyword":["dblp"],"metadata":{"authorlinks":{}},"html":""},"bibtype":"article","biburl":"http://www.bibsonomy.org/bib/author/HALIM?items=1000","dataSources":["Hh8xeo4TtcB3FzCgo"],"keywords":["dblp"],"search_terms":["inverse","problem","wave","equation","general","doubly","connected","region","finite","number","piecewise","smooth","robin","boundary","conditions","zayed","hassan"],"title":"An inverse problem of the wave equation for a general doubly connected region in R2 with a finite number of piecewise smooth Robin boundary conditions.","year":2002}