A Lyapunov–Krasovskii methodology for ISS and iISS of time-delay systems P Pepe, ZP Jiang Systems & Control Letters 55 (12), 1006-1014, 2006 | 382 | 2006 |
A new approach to state observation of nonlinear systems with delayed output A Germani, C Manes, P Pepe IEEE Transactions on Automatic Control 47 (1), 96-101, 2002 | 351 | 2002 |
On Liapunov–Krasovskii functionals under caratheodory conditions P Pepe Automatica 43 (4), 701-706, 2007 | 119 | 2007 |
Input‐output linearization with delay cancellation for nonlinear delay systems: The problem of the internal stability A Germani, C Manes, P Pepe International Journal of Robust and Nonlinear Control: IFAC‐Affiliated …, 2003 | 119 | 2003 |
Observer-Based Control of LLC DC/DC Resonant Converter Using Extended Describing Functions C Buccella, C Cecati, H Latafat, P Pepe, K Razi IEEE Transactions on Power Electronics 30 (10), 5881-5891, 2014 | 118 | 2014 |
Symbolic models for networks of control systems G Pola, P Pepe, MD Di Benedetto IEEE Transactions on Automatic Control 61 (11), 3663-3668, 2016 | 99 | 2016 |
Input-to-state stability of time-delay systems: a link with exponential stability N Yeganefar, P Pepe, M Dambrine IEEE Transactions on Automatic Control 53 (6), 1526-1531, 2008 | 99 | 2008 |
Input-to-output stability for systems described by retarded functional differential equations I Karafyllis, P Pepe, ZP Jiang European Journal of Control 14 (6), 539-555, 2008 | 94 | 2008 |
A new Lyapunov-Krasovskii methodology for coupled delay differential difference equations P Pepe, ZP Jiang, E Fridman Proceedings of the 45th IEEE Conference on Decision and Control, 2565-2570, 2006 | 93 | 2006 |
The problem of the absolute continuity for Lyapunov–Krasovskii functionals P Pepe IEEE Transactions on Automatic Control 52 (5), 953-957, 2007 | 92 | 2007 |
Converse Lyapunov–Krasovskii theorems for systems described by neutral functional differential equations in Hale's form P Pepe, I Karafyllis International Journal of Control 86 (2), 232-243, 2013 | 88 | 2013 |
Symbolic models for nonlinear time-delay systems using approximate bisimulations G Pola, P Pepe, MD Di Benedetto, P Tabuada Systems & Control Letters 59 (6), 365-373, 2010 | 88 | 2010 |
On the Liapunov–Krasovskii methodology for the ISS of systems described by coupled delay differential and difference equations P Pepe, I Karafyllis, ZP Jiang Automatica 44 (9), 2266-2273, 2008 | 88 | 2008 |
On the stability of coupled delay differential and continuous time difference equations P Pepe, EI Verriest IEEE Transactions on Automatic Control 48 (8), 1422-1427, 2003 | 88 | 2003 |
An asymptotic state observer for a class of nonlinear delay systems A Germani, C Manes, P Pepe Kybernetika 37 (4), [459]-478, 2001 | 83 | 2001 |
On the asymptotic stability of coupled delay differential and continuous time difference equations P Pepe Automatica 41 (1), 107-112, 2005 | 81 | 2005 |
A small-gain condition for iISS of interconnected retarded systems based on Lyapunov–Krasovskii functionals H Ito, P Pepe, ZP Jiang Automatica 46 (10), 1646-1656, 2010 | 76 | 2010 |
Global output stability for systems described by retarded functional differential equations: Lyapunov characterizations I Karafyllis, P Pepe, ZP Jiang European Journal of Control 14 (6), 516-536, 2008 | 75 | 2008 |
Time delay systems: Methods, applications and new trends R Sipahi, T Vyhlídal, SI Niculescu, P Pepe Springer Berlin Heidelberg, 2012 | 74 | 2012 |
Stability results for systems described by coupled retarded functional differential equations and functional difference equations I Karafyllis, P Pepe, ZP Jiang Nonlinear Analysis: Theory, Methods & Applications 71 (7-8), 3339-3362, 2009 | 73 | 2009 |