An improved Hardy-Sobolev inequality and its application N Chaudhuri, M Ramaswamy Proceedings of the American Mathematical Society 130 (2), 489-505, 2002 | 274 | 2002 |

Optimal entropy solutions for conservation laws with discontinuous flux-functions Adimurthi, S Mishra, GDV Gowda Journal of Hyperbolic Differential Equations 2 (04), 783-837, 2005 | 191 | 2005 |

Godunov-type methods for conservation laws with a flux function discontinuous in space Adimurthi, J Jaffré, GDV Gowda SIAM Journal on Numerical Analysis 42 (1), 179-208, 2004 | 183 | 2004 |

Blow-up analysis in dimension 2 and a sharp form of Trudinger–Moser inequality Adimurthi, O Druet Taylor & Francis Group 29 (1-2), 295-322, 2005 | 146 | 2005 |

Global compactness properties of semilinear elliptic equations with critical exponential growth M Struwe Journal of Functional Analysis 175 (1), 125-167, 2000 | 105 | 2000 |

The Neumann problem for elliptic equations with critical nonlinearity A Adimurthi, G Mancini Scuola Normale Superiore, 1991 | 101 | 1991 |

The role of the mean curvature in semilinear Neumann problem involving critical exponent A Adimurthi, G Mancini, SL Yadava Communications in Partial Differential Equations 20 (3-4), 591-631, 1995 | 97 | 1995 |

A singular Moser-Trudinger embedding and its applications K Sandeep Nonlinear Differential Equations and Applications NoDEA 13 (5-6), 585-603, 2007 | 79 | 2007 |

Characterization of concentration points and L∞-estimates for solutions of a semilinear Neumann problem involving the critical Sobolev exponent A Adimurthi, F Pacella, SL Yadava Differential and Integral Equations 8 (1), 41-68, 1995 | 69 | 1995 |

Optimal Hardy–Rellich inequalities, maximum principle and related eigenvalue problem M Grossi, S Santra Journal of Functional Analysis 240 (1), 36-83, 2006 | 63 | 2006 |

Existence of positive solutions of the semilinear Dirichlet problem with critical growth for the n-Laplacian. Adimurthi Ann. Scuola Norm. Sup. Pisa Cl. Sci., 0 | 59* | |

Existence and nonexistence of TV bounds for scalar conservation laws with discontinuous flux SS Ghoshal, R Dutta, GD Veerappa Gowda Communications on pure and applied mathematics 64 (1), 84-115, 2011 | 55 | 2011 |

Exact controllability of scalar conservation laws with strict convex flux A Adimurthi, S Ghoshal, V Gowda | 47* | 2011 |

Asymptotic estimates for a two-dimensional problem with polynomial nonlinearity M Grossi Proceedings of the American Mathematical Society 132 (4), 1013-1019, 2004 | 47 | 2004 |

Conservation law with discontinuous flux A Adimurthi, GD Veerappa Gowda | 45 | 2000 |

An improved Hardy-Sobolev inequality in *W*^{1,p} and its application to Schrödinger operatorsMJ Esteban Nonlinear Differential Equations and Applications NoDEA 12 (2), 243-263, 2005 | 41 | 2005 |

Structure of entropy solutions to scalar conservation laws with strictly convex flux Adimurthi, SS Ghoshal, GD Veerappa Gowda Journal of Hyperbolic Differential Equations 9 (04), 571-611, 2012 | 30 | 2012 |

Critical exponent problem in R2 with Neumann boundary condition A Adimurthi, SL Yadava Communications in Partial Differential Equations 15 (4), 459-470, 1990 | 30 | 1990 |

Explicit Hopf–Lax type formulas for Hamilton–Jacobi equations and conservation laws with discontinuous coefficients S Mishra, GDV Gowda Journal of Differential Equations 241 (1), 1-31, 2007 | 28 | 2007 |

On compactness in the Trüdinger-Moser inequality C Tintarev ANNALI SCUOLA NORMALE SUPERIORE-CLASSE DI SCIENZE, 399-416, 2014 | 26 | 2014 |