{"status":"ok","message-type":"work","message-version":"1.0.0","message":{"indexed":{"date-parts":[[2026,4,22]],"date-time":"2026-04-22T04:57:25Z","timestamp":1776833845180,"version":"3.51.2"},"reference-count":33,"publisher":"American Mathematical Society (AMS)","issue":"331","license":[{"start":{"date-parts":[[2022,5,6]],"date-time":"2022-05-06T00:00:00Z","timestamp":1651795200000},"content-version":"am","delay-in-days":365,"URL":"https:\/\/www.ams.org\/publications\/copyright-and-permissions"}],"funder":[{"DOI":"10.13039\/100000183","name":"Army Research Office","doi-asserted-by":"publisher","award":["W911NF-18-1- 0308"],"award-info":[{"award-number":["W911NF-18-1- 0308"]}],"id":[{"id":"10.13039\/100000183","id-type":"DOI","asserted-by":"publisher"}]},{"DOI":"10.13039\/100000183","name":"Army Research Office","doi-asserted-by":"publisher","award":["W911NF-18-1- 0308"],"award-info":[{"award-number":["W911NF-18-1- 0308"]}],"id":[{"id":"10.13039\/100000183","id-type":"DOI","asserted-by":"publisher"}]},{"DOI":"10.13039\/100000183","name":"Army Research Office","doi-asserted-by":"publisher","award":["W911NF-18-1- 0308"],"award-info":[{"award-number":["W911NF-18-1- 0308"]}],"id":[{"id":"10.13039\/100000183","id-type":"DOI","asserted-by":"publisher"}]},{"DOI":"10.13039\/100000183","name":"Army Research Office","doi-asserted-by":"publisher","award":["W911NF-18-1- 0308"],"award-info":[{"award-number":["W911NF-18-1- 0308"]}],"id":[{"id":"10.13039\/100000183","id-type":"DOI","asserted-by":"publisher"}]}],"content-domain":{"domain":[],"crossmark-restriction":false},"short-container-title":["Math. Comp."],"abstract":"

\n The shifted boundary method (SBM) is an approximate domain method for boundary value problems, in the broader class of unfitted\/embedded\/immersed methods. It has proven to be quite efficient in handling problems with complex geometries, ranging from Poisson to Darcy, from Navier-Stokes to elasticity and beyond. The key feature of the SBM is a\n shift<\/italic>\n in the location where Dirichlet boundary conditions are applied\u2014from the true to a surrogate boundary\u2014and an appropriate modification (again, a\n shift<\/italic>\n ) of the value of the boundary conditions, in order to reduce the consistency error. In this paper we provide a sound analysis of the method in smooth domains and in domains with corners, highlighting the influence of geometry and distance between exact and surrogate boundaries upon the convergence rate. We consider the Poisson problem with Dirichlet boundary conditions as a model and we first detail a procedure to obtain the crucial shifting between the surrogate and the true boundaries. Next, we give a sufficient condition for the well-posedness and stability of the discrete problem. The behavior of the consistency error arising from shifting the boundary conditions is thoroughly analyzed, for smooth boundaries and for boundaries with corners and edges. The convergence rate is proven to be optimal in the energy norm, and is further enhanced in the\n \n \n \n \n L<\/mml:mi>\n 2<\/mml:mn>\n <\/mml:msup>\n L^2<\/mml:annotation>\n <\/mml:semantics>\n <\/mml:math>\n <\/inline-formula>\n -norm.\n <\/p>","DOI":"10.1090\/mcom\/3641","type":"journal-article","created":{"date-parts":[[2021,3,10]],"date-time":"2021-03-10T10:50:19Z","timestamp":1615373419000},"page":"2041-2069","source":"Crossref","is-referenced-by-count":36,"title":["Analysis of the shifted boundary method for the Poisson problem in domains with corners"],"prefix":"10.1090","volume":"90","author":[{"given":"Nabil","family":"Atallah","sequence":"first","affiliation":[]},{"given":"Claudio","family":"Canuto","sequence":"additional","affiliation":[]},{"given":"Guglielmo","family":"Scovazzi","sequence":"additional","affiliation":[]}],"member":"14","published-online":{"date-parts":[[2021,5,6]]},"reference":[{"key":"1","doi-asserted-by":"publisher","first-page":"112609","DOI":"10.1016\/j.cma.2019.112609","article-title":"Analysis of the shifted boundary method for the Stokes problem","volume":"358","author":"Atallah, Nabil M.","year":"2020","journal-title":"Comput. 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Scovazzi, The shifted boundary method for solid mechanics, (2021), submitted.","DOI":"10.1002\/nme.6779"},{"issue":"8-11","key":"4","doi-asserted-by":"publisher","first-page":"491","DOI":"10.1016\/S0045-7949(02)00404-2","article-title":"A finite element approach for the immersed boundary method","volume":"81","author":"Boffi, Daniele","year":"2003","journal-title":"Comput. \\& Structures","ISSN":"https:\/\/id.crossref.org\/issn\/0045-7949","issn-type":"print"},{"issue":"207","key":"5","doi-asserted-by":"publisher","first-page":"1","DOI":"10.2307\/2153559","article-title":"A robust finite element method for nonhomogeneous Dirichlet problems in domains with curved boundaries","volume":"63","author":"Bramble, James H.","year":"1994","journal-title":"Math. 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Paris","ISSN":"https:\/\/id.crossref.org\/issn\/1631-073X","issn-type":"print"},{"issue":"7","key":"8","doi-asserted-by":"publisher","first-page":"472","DOI":"10.1002\/nme.4823","article-title":"CutFEM: discretizing geometry and partial differential equations","volume":"104","author":"Burman, Erik","year":"2015","journal-title":"Internat. J. Numer. Methods Engrg.","ISSN":"https:\/\/id.crossref.org\/issn\/0029-5981","issn-type":"print"},{"issue":"310","key":"9","doi-asserted-by":"publisher","first-page":"633","DOI":"10.1090\/mcom\/3240","article-title":"A cut finite element method with boundary value correction","volume":"87","author":"Burman, Erik","year":"2018","journal-title":"Math. 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Dauge, Regularity and singularities in polyhedral domains, April 2008, \\url{https:\/\/perso.univrennes1.fr\/monique.dauge\/publis\/Talk Karlsruhe08.pdf}."},{"key":"15","unstructured":"A. Demlow, Elliptic problems on polyhedral domains, 2016, Chapter 2 in Lecture Notes for Course Math663 at TAMU, \\url{https:\/\/www.math.tamu.edu\/ demlow\/Courses}."},{"key":"16","unstructured":"T. Dupont, J. Guzman, and R. Scott, Obtaining higher-order Galerkin accuracy when the boundary is polygonally approximated, 2020, arXiv:2001.03082."},{"key":"17","series-title":"Classics in Applied Mathematics","isbn-type":"print","doi-asserted-by":"publisher","DOI":"10.1137\/1.9781611972030.ch1","volume-title":"Elliptic problems in nonsmooth domains","volume":"69","author":"Grisvard, Pierre","year":"2011","ISBN":"https:\/\/id.crossref.org\/isbn\/9781611972023"},{"issue":"47-48","key":"18","doi-asserted-by":"publisher","first-page":"5537","DOI":"10.1016\/S0045-7825(02)00524-8","article-title":"An unfitted finite element method, based on Nitsche\u2019s method, for elliptic interface problems","volume":"191","author":"Hansbo, Anita","year":"2002","journal-title":"Comput. Methods Appl. Mech. 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