N. Arrizabalaga, L. L. Treust, and N. Raymond, On the MIT Bag Model in the Non-relativistic Limit, Communications in Mathematical Physics, vol.106, issue.4, p.2017
DOI : 10.4171/169
URL : https://hal.archives-ouvertes.fr/hal-01343717

C. Bär and W. Ballmann, Boundary value problems for elliptic differential operators of first order In Surveys in differential geometry, Surv. Differ. Geom, vol.17, pp.1-78, 2012.

C. Bär and W. Ballmann, Guide to Elliptic Boundary Value Problems for Dirac-Type Operators, pp.43-80

R. D. Benguria, S. Fournais, E. Stockmeyer, H. Van-den, and . Bosch, Spectral gaps of Dirac operators with boundary conditions relevant for graphene, 2016.

B. Booß-bavnbek, M. Lesch, and C. Zhu, The Calder?n projection: New definition and applications, Journal of Geometry and Physics, vol.59, issue.7, pp.784-826, 2009.
DOI : 10.1016/j.geomphys.2009.03.012

H. Brezis, Functional analysis, Sobolev spaces and partial differential equations, 2010.
DOI : 10.1007/978-0-387-70914-7

O. Hijazi, S. Montiel, and A. Roldán, Eigenvalue Boundary Problems for the Dirac Operator, Communications in Mathematical Physics, vol.231, issue.3, pp.375-390, 2002.
DOI : 10.1007/s00220-002-0725-0

K. Johnson, The MIT bag model, Acta Phys. Pol., B, issue.6, pp.865-892, 1975.

J. Ne?as, Direct methods in the theory of elliptic equations Translated from the 1967 French original by Gerard Tronel and Alois Kufner

T. Ourmì-eres-bonafos and L. Vega, A strategy for self-adjointness of Dirac operators: Applications to the MIT bag model and ?-shell interactions, 2017.

E. Stockmeyer and S. Vugalter, Infinite mass boundary conditions for Dirac operators, 2016.

B. Thaller, The Dirac equation. Texts and Monographs in Physics, 1992.