References
- Barles , G. ( 1994 ). Solutions de Viscosité des Équations de Hamilton–Jacobi [Viscosity solutions of Hamilton–Jacobi equations]. Mathématiques & Applications , Vol. 17 . Berlin : Springer-Verlag .
- Barles , G. , Evans , L.C. , Souganidis , P.E. ( 1990 ). Wavefront propagation for reaction-diffusion systems of PDE . Duke Math. J. 61 : 835 – 858 .
- Barles , G. , Mirrahimi , S. , Perthame , B. (2009). Concentration in Lotka–Volterra parabolic or integral equations: A general convergence result. Methods Appl. Anal. 16:321–340.
- Barles , G. , Perthame , B. ( 2007 ). Concentrations and constrained Hamilton–Jacobi equations arising in adaptive dynamics . Contemp. Math. 439 : 57 – 68 .
- Champagnat , N. , Ferrière , R. , Arous , G.B. ( 2001 ). The canonical equation of adaptive dynamics: A mathematical view . Selection 2 : 73 – 83 .
- Champagnat , N. , Ferrière , R. , Méléard , S. ( 2006 ). Unifying evolutionary dynamics: From individual stochastic processes to macroscopic models . Th. Pop. Biol. 69 : 297 – 321 .
- Champagnat , N. , Ferrière , R. , Méléard , S. ( 2008 ). Individual-Based Probabilistic Models of Adaptive Evolution and Various Scaling Approximations . Progress in Probability , Vol. 59 . Boston : Birkhaüser .
- Champagnat , N. , Jabin , P.-E. The evolutionary limit for models of populations interacting competitively with many resources. Preprint .
- Cressman , R. , Hofbauer , J. ( 2005 ). Measure dynamics on a one-dimensional continuous trait space: Theoretical foundations for adaptive dynamics . Th. Pop. Biol. 67 : 47 – 59 .
- Desvillettes , L. , Jabin , P.-E. , Mischler , S. , Raoul , G. ( 2008 ). On mutation-selection dynamics . Comm. Math. Sci. 6 : 729 – 747 .
- Dieckmann , U. , Law , R. ( 1996 ). The dynamical theory of coevolution: A derivation from stochastic ecological processes . J. Math. Biol. 34 : 579 – 612 .
- Diekmann , O. ( 2004 ). A beginner's guide to adaptive dynamics . In: Mathematical Modelling of Population Dynamics . Banach Center Publication , Vol. 63 . Warsaw : Polish Academy of Sciences , pp. 47 – 86 .
- Diekmann , O. , Jabin , P.-E. , Mischler , S. , Perthame , B. ( 2005 ). The dynamics of adaptation: An illuminating example and a Hamilton–Jacobi approach . Th. Pop. Biol. 67 : 257 – 271 .
- Evans , L.C. ( 1998 ). Partial Differential Equations . Graduate Studies in Mathematics , Vol. 19 . Providence , RI : American Mathematical Society .
- Evans , L.C. , Souganidis , P.E. ( 1989 ). A PDE approach to geometric optics for certain semilinear parabolic equations . Indiana Univ. Math. J. 38 : 141 – 172 .
- Fleming , W.H. , Souganidis , P.E. ( 1986 ). PDE-viscosity solution approach to some problems of large deviations . Ann. Scuola Norm. Sup. Pisa Cl. Sci. 4 : 171 – 192 .
- Genieys , S. , Volpert , V. , Auger , P. ( 2006 ). Pattern and waves for a model in population dynamics with nonlocal consumption of resources . Math. Model. Nat. Phenom. 1 : 63 – 80 .
- Jabin , P.-E. , Raoul , G. Selection dynamics with competition . To appear in J. Math. Biol.
- Lions , P.L. ( 1982 ). Generalized Solutions of Hamilton–Jacobi Equations . Research Notes in Mathematics , Vol. 69 . Boston : Pitman .
- Lions , P.-L. ( 1985 ). Regularizing effects for first-order Hamilton–Jacobi equations . Applic. Anal. 20 : 283 – 307 .
- Méléard , S. ( 2010 ). Random modeling of adaptive dynamics and evolutionary branching . In: Rodrigues , J.F. , Chalub , F. , eds. The Mathematics of Darwin's Legacy, Mathematics and Biosciences in Interaction . Basel , Switzerland : Birkhäuser .
- Meszéna , G. , Gyllenberg , M. , Jacobs , F.J. , Metz , J.A.J. (2005). Link between population dynamics and dynamics of Darwinian evolution. Phys. Rev. Lett. 95:078105.
- Mirrahimi , S. , Perthame , B. , Bouin , E. , Millien , P. ( 2010 ). Population formulation of adaptativemeso-evolution; Theory and numerics . In: Rodrigues , J.F. , Chalub , F. , eds. The Mathematics of Darwin's Legacy, Mathematics and Biosciences in Interaction . Basel , Switzerland : Birkhäuser .
- Mirrahimi , S. , Perthame , B. , Wakano , J.Y. Evolution of species trait through resource competition. Preprint .
- Perthame , B. , Barles , G. ( 2008 ). Dirac concentrations in Lotka–Volterra parabolic PDEs . Indiana Univ. Math. J. 57 : 3275 – 3301 .
- Perthame , B. , Génieys , S. ( 2007 ). Concentration in the nonlocal Fisher equation: The Hamilton–Jacobi limit . Math. Model. Nat. Phenom. 2 : 135 – 151 .
- Raoul , G. ( 2009 ). Etude qualitative et numérique d’équations aux dérivées partielles issues des sciences de la nature [Qualitative and numerical study of PDEs from natural sciences]. PhD thesis, ENS Cachan, Cachan, France .
- Raoul , G. Local stability of evolutionary attractors for continuous structured populations. To appear in Monatsh. Math.