A priori estimates and application to the symmetry of solutions for critical p-Laplace equations J Vétois Journal of Differential Equations 260 (1), 149-161, 2016 | 96 | 2016 |
The effect of linear perturbations on the Yamabe problem P Esposito, A Pistoia, J Vétois Mathematische Annalen 358, 511-560, 2014 | 66 | 2014 |
Blow-up solutions for asymptotically critical elliptic equations on Riemannian manifolds AM Micheletti, A Pistoia, J Vétois Indiana University mathematics journal, 1719-1746, 2009 | 54 | 2009 |
Bounded stability for strongly coupled critical elliptic systems below the geometric threshold of the conformal Laplacian O Druet, E Hebey, J Vétois Journal of Functional Analysis 258 (3), 999-1059, 2010 | 45 | 2010 |
Sharp Sobolev asymptotics for critical anisotropic equations A El Hamidi, J Vétois Arch. Ration. Mech. Anal 192 (1), 1-36, 2009 | 40 | 2009 |
Sign-changing blow-up for scalar curvature type equations F Robert, J Vétois Communications in Partial Differential Equations 38 (8), 1437-1465, 2013 | 38 | 2013 |
Strong maximum principles for anisotropic elliptic and parabolic equations J Vétois Advanced Nonlinear Studies 12 (1), 101-114, 2012 | 37 | 2012 |
Examples of non-isolated blow-up for perturbations of the scalar curvature equation on non-locally conformally flat manifolds F Robert, J Vétois Journal of Differential Geometry 98 (2), 349-356, 2014 | 34 | 2014 |
Multiple solutions for nonlinear elliptic equations on compact Riemannian manifolds J Vétois International Journal of Mathematics 18 (09), 1071-1111, 2007 | 33 | 2007 |
Infinitely many solutions for cubic nonlinear Schrödinger equations in dimension four J Vétois, S Wang Advances in Nonlinear Analysis 8 (1), 715-724, 2017 | 31 | 2017 |
Sign-changing bubble towers for asymptotically critical elliptic equations on Riemannian manifolds A Pistoia, J Vétois Journal of Differential Equations 254 (11), 4245-4278, 2013 | 27 | 2013 |
Fundamental solutions for anisotropic elliptic equations: existence and a priori estimates FC Cirstea, J Vetois Communications in Partial Differential Equations 40 (4), 727-765, 2015 | 25 | 2015 |
The blow-up of critical anisotropic equations with critical directions J Vétois Nonlinear Differential Equations and Applications NoDEA 18 (2), 173-197, 2011 | 24 | 2011 |
A General Theorem for the Construction of Blowing-up Solutions to Some Elliptic Nonlinear Equations via Lyapunov–Schmidt’s Finite-dimensional Reduction F Robert, J Vétois Concentration Analysis and Applications to PDE: ICTS Workshop, Bangalore …, 2013 | 21 | 2013 |
Positive clusters for smooth perturbations of a critical elliptic equation in dimensions four and five PD Thizy, J Vétois Journal of Functional Analysis 275 (1), 170-195, 2018 | 20 | 2018 |
Existence and regularity for critical anisotropic equations with critical directions J Vétoiss | 20 | 2011 |
A note on the classification of positive solutions to the critical p-Laplace equation in J Vétois Advanced Nonlinear Studies 24 (3), 543-552, 2024 | 18 | 2024 |
A priori estimates for solutions of anisotropic elliptic equations J Vétois Nonlinear Analysis: Theory, Methods & Applications 71 (9), 3881-3905, 2009 | 18 | 2009 |
Continuity and injectivity of optimal maps J Vétois Calculus of Variations and Partial Differential Equations 52, 587-607, 2015 | 17 | 2015 |
Sign-changing solutions to elliptic second order equations: glueing a peak to a degenerate critical manifold F Robert, J Vétois Calculus of Variations and Partial Differential Equations 54 (1), 693-716, 2015 | 16 | 2015 |