Regular solutions of first-order Hamilton–Jacobi equations for boundary control problems and applications to economics S Faggian Applied Mathematics and Optimization 51, 123-162, 2005 | 38 | 2005 |

On the dynamic programming approach for optimal control problems of PDE's with age structure S FAGGIAN*, F Gozzi Mathematical Population Studies 11 (3-4), 233-270, 2004 | 31 | 2004 |

Hamilton–Jacobi equations arising from boundary control problems with state constraints S Faggian SIAM journal on control and optimization 47 (4), 2157-2178, 2008 | 30* | 2008 |

Applications of dynamic programming to economic problems with vintage capital S Faggian Dynamics of Continuous, Discrete and Impulsive Systems. Series A …, 2008 | 28 | 2008 |

Hopf-type estimates and formulas for nonconvex nonconcave Hamilton--Jacobi equations M Bardi, S Faggian SIAM Journal on Mathematical Analysis 29 (5), 1067-1086, 1998 | 27 | 1998 |

Optimal investment models with vintage capital: Dynamic programming approach S Faggian, F Gozzi Journal of Mathematical Economics 46 (4), 416-437, 2010 | 23 | 2010 |

On the Mitra-Wan Forest Management Problem in Continuous Time G Fabbri, S Faggian, G Freni JOURNAL OF ECONOMIC THEORY 157, 1001-1040, 2015 | 22 | 2015 |

Optimal advertising strategies with age-structured goodwill S Faggian, L Grosset Mathematical Methods of Operations Research 78, 259-284, 2013 | 19 | 2013 |

Boundary control problems with convex cost and dynamic programming in infinite dimension part II: Existence for HJB S Faggian Discrete and Continuous Dynamical Systems 12 (2), 323-346, 2004 | 18 | 2004 |

Policy effectiveness in spatial resource wars: A two-region model G Fabbri, S Faggian, G Freni Journal of Economic Dynamics and Control 111, 103818, 2020 | 13 | 2020 |

Optimal control of the mean field equilibrium for a pedestrian tourists’ flow model F Bagagiolo, S Faggian, R Maggistro, R Pesenti Networks and Spatial Economics, 1-24, 2019 | 12 | 2019 |

Boundary-control problems with convex cost and dynamic programming in infinite dimension. I. The maximum principle S Faggian | 10 | 2004 |

On dynamic programming in economic models governed by DDEs G Fabbri, S Faggian, F Gozzi Mathematical Population Studies 15 (4), 267-290, 2008 | 7 | 2008 |

On competition for spatially distributed resources on networks G Fabbri, S Faggian, G Freni University Ca'Foscari of Venice, Dept. of Economics Research Paper Series No 7, 2020 | 5 | 2020 |

First order Hamilton-Jacobi equations in Hilbert spaces, boundary optimal control and applications to economics S Faggian Ph. D. thesis, Universitá degli studi di Pisa, 2002 | 5 | 2002 |

Optimal investment in age-structured goodwill S Faggian, G Luca Available at SSRN 2097829, 2012 | 4 | 2012 |

Dynamic programming for infinite horizon boundary control problems of PDE's with age structure S Faggian, F Gozzi arXiv preprint arXiv:0806.4278, 2008 | 4 | 2008 |

On the Dynamic Programming approach to economic models governed by DDE's G Fabbri, S Faggian, F Gozzi arXiv preprint math/0606344, 2006 | 4 | 2006 |

Maximum principle for boundary control problems arising in optimal investment with vintage capital S Faggian Department of Applied Mathematics, Università Ca'Foscari Venezia Working Papers, 2008 | 3 | 2008 |

Optimal investment with vintage capital: Equilibrium distributions S Faggian, F Gozzi, PM Kort Journal of Mathematical Economics 96, 102516, 2021 | 2 | 2021 |