JournalsaihpcVol. 25, No. 4Volume 25, No. 4 (2008) Annales de l'Institut Henri Poincaré CEditorial Boardpp. 633–658A variational treatment for general elliptic equations of the flame propagation type: regularity of the free boundaryEduardo V. Teixeirapp. 659–678C1-regularity of the Aronsson equation in R2Changyou WangYifeng Yupp. 679–696Strong solutions for a compressible fluid model of Korteweg typeMatthias Kotschotepp. 697–711On the Dirac delta as initial condition for nonlinear Schrödinger equationsV. BanicaL. Vegapp. 713–724The unstable spectrum of the Navier–Stokes operator in the limit of vanishing viscosityRoman ShvydkoySusan Friedlanderpp. 725–741An existence result for a free boundary shallow water model using a Lagrangian schemeF. FloriP. OrengaM. Peybernespp. 743–771Compensated convexity and its applicationsKewei Zhangpp. 773–802Semiconcavity results for optimal control problems admitting no singular minimizing controlsP. CannarsaL. Riffordpp. 803–832A characterization of convex calibrable sets in RN with respect to anisotropic normsV. CasellesA. ChambolleS. MollM. Novagapp. 833–836Erratum to: “The Schrödinger–Maxwell system with Dirac mass” [Ann. Inst. H. Poincaré Anal. Non Linéaire 24 (5) (2007) 773–793]G.M. CocliteH. Holden
pp. 633–658A variational treatment for general elliptic equations of the flame propagation type: regularity of the free boundaryEduardo V. Teixeira
pp. 697–711On the Dirac delta as initial condition for nonlinear Schrödinger equationsV. BanicaL. Vega
pp. 713–724The unstable spectrum of the Navier–Stokes operator in the limit of vanishing viscosityRoman ShvydkoySusan Friedlander
pp. 725–741An existence result for a free boundary shallow water model using a Lagrangian schemeF. FloriP. OrengaM. Peybernes
pp. 773–802Semiconcavity results for optimal control problems admitting no singular minimizing controlsP. CannarsaL. Rifford
pp. 803–832A characterization of convex calibrable sets in RN with respect to anisotropic normsV. CasellesA. ChambolleS. MollM. Novaga
pp. 833–836Erratum to: “The Schrödinger–Maxwell system with Dirac mass” [Ann. Inst. H. Poincaré Anal. Non Linéaire 24 (5) (2007) 773–793]G.M. CocliteH. Holden