Existence and multiplicity results for some superlinear elliptic problems on RN Existence and multiplicity results T Bartsch, Z Qiang Wang Communications in Partial Differential Equations 20 (9-10), 1725-1741, 1995 | 914 | 1995 |
Nonlinear Schrödinger equations with steep potential well T Bartsch, A Pankov, ZQ Wang Communications in Contemporary Mathematics 3 (04), 549-569, 2001 | 429 | 2001 |
Critical point theory for asymptotically quadratic functionals and applications to problems with resonance T Bartsch, S Li Nonlinear Analysis: Theory, Methods & Applications 28 (3), 419-441, 1997 | 367 | 1997 |
On an elliptic equation with concave and convex nonlinearities T Bartsch, M Willem Proceedings of the American Mathematical Society 123 (11), 3555-3561, 1995 | 340 | 1995 |
Sign changing solutions of superlinear Schrödinger equations T Bartsch, Z Liu, T Weth Taylor & Francis Group 29 (1-2), 25-42, 2005 | 272 | 2005 |
Infinitely many solutions of a symmetric Dirichlet problem T Bartsch Nonlinear Analysis: Theory, Methods & Applications 20 (10), 1205-1216, 1993 | 263 | 1993 |
A Liouville theorem, a-priori bounds, and bifurcating branches of positive solutions for a nonlinear elliptic system T Bartsch, N Dancer, ZQ Wang Calculus of Variations and Partial Differential Equations 37 (3), 345-361, 2010 | 257 | 2010 |
Note on ground states of nonlinear Schrodinger systems T Bartsch, ZQ Wang Rn 1, 2, 2006 | 248 | 2006 |
Topological methods for variational problems with symmetries T Bartsch Springer, 2006 | 246 | 2006 |
Infinitely many radial solutions of a semilinear elliptic problem on ℝN T Bartsch, M Willem Archive for rational mechanics and analysis 124, 261-276, 1993 | 246 | 1993 |
Partial symmetry of least energy nodal solutions to some variational problems T Bartsch, T Weth, M Willem Journal d’Analyse Mathématique 96 (1), 1-18, 2005 | 233 | 2005 |
Bound states for a coupled Schrödinger system T Bartsch, ZQ Wang, J Wei Journal of Fixed Point Theory and Applications 2 (2), 353-367, 2007 | 230 | 2007 |
A natural constraint approach to normalized solutions of nonlinear Schrödinger equations and systems T Bartsch, N Soave Journal of Functional Analysis 272 (12), 4998-5037, 2017 | 217 | 2017 |
Infinitely many nonradial solutions of a Euclidean scalar field equation T Bartsch, M Willem Journal of functional analysis 117 (2), 447-460, 1993 | 215 | 1993 |
Three nodal solutions of singularly perturbed elliptic equations on domains without topology T Bartsch, T Weth Annales de l'Institut Henri Poincaré C, Analyse non linéaire 22 (3), 259-281, 2005 | 213 | 2005 |
On the existence of sign changing solutions for semilinear Dirichlet problems T Bartsch, ZQ Wang | 198 | 1996 |
On a superlinear elliptic p-Laplacian equation T Bartsch, Z Liu Journal of Differential Equations 198 (1), 149-175, 2004 | 194 | 2004 |
Multiple positive solutions for a nonlinear Schrödinger equation T BartschRID="*", ... Zeitschrift für angewandte Mathematik und Physik ZAMP 51 (3), 366-384, 2000 | 190 | 2000 |
Nodal solutions of a p-Laplacian equation T Bartsch, Z Liu, T Weth Proceedings of the London Mathematical Society 91 (1), 129-152, 2005 | 184 | 2005 |
Deformation theorems on non‐metrizable vector spaces and applications to critical point theory T Bartsch, Y Ding Mathematische Nachrichten 279 (12), 1267-1288, 2006 | 181 | 2006 |