Optimal Decay Estimates for Time-Fractional and Other NonLocal Subdiffusion Equations via Energy Methods V Vergara, R Zacher SIAM Journal on Mathematical Analysis 47 (1), 210-239, 2015 | 168 | 2015 |
Decay estimates for time-fractional and other non-local in time subdiffusion equations in J Kemppainen, J Siljander, V Vergara, R Zacher Mathematische Annalen 366 (3), 941–979, 2016 | 144 | 2016 |
Stability, instability, and blowup for time fractional and other nonlocal in time semilinear subdiffusion equations V Vergara, R Zacher In Press Journal of Evolution Equations, 1-28, 2017 | 73 | 2017 |
Lyapunov functions and convergence to steady state for differential equations of fractional order V Vergara, R Zacher Mathematische Zeitschrift 259 (2), 287-309, 2008 | 69 | 2008 |
A priori bounds for degenerate and singular evolutionary partial integro-differential equations V Vergara, R Zacher Nonlinear Analysis: Theory, Methods & Applications 73 (11), 3572-3585, 2010 | 36 | 2010 |
Fundamental solutions and decay of fully non-local problems JC Pozo, V Vergara Discrete & Continuous Dynamical Systems - A 39 (1), 639-666, 2019 | 33 | 2019 |
Bounded solutions of a k-Hessian equation in a ball J Sánchez, V Vergara Journal of Differential Equations 261 (1), 797–820, 2016 | 28 | 2016 |
Uniform stability of resolvent families C Lizama, V Vergara Proceedings of the American Mathematical Society 132 (1), 175-181, 2004 | 25 | 2004 |
Well-posedness and long-time behaviour for the non-isothermal Cahn-Hilliard equation with memory J Prüss, V Vergara, R Zacher Discrete and Continuous Dynamical Systems (DCDS-A) 26.2 (2010): 625-647., 2009 | 22 | 2009 |
Bounded solutions of a k-Hessian equation involving a weighted nonlinear source J Sánchez, V Vergara In Press Journal of Differential Equations, http://dx.doi.org/10.1016/j.jde …, 2017 | 18 | 2017 |
A Lyapunov-type inequality for a ψ-Laplacian operator J Sánchez, V Vergara Nonlinear Analysis: Theory, Methods & Applications 74 (18), 7071-7077, 2011 | 17 | 2011 |
A conserved phase field system with memory and relaxed chemical potential V Vergara Journal of mathematical analysis and applications 328 (2), 789-812, 2007 | 15 | 2007 |
Maximal regularity and global well-posedness for a phase field system with memory V Vergara The Journal of Integral Equations and Applications, 93-115, 2007 | 15 | 2007 |
Existence of attracting periodic orbits for the Newton’s method S Plaza, V Vergara Sci. Ser. A: Math. Sci 7, 31-36, 2001 | 11 | 2001 |
Long-time behavior of nonlinear integro-differential evolution equations J Sánchez, V Vergara Nonlinear Analysis: Theory, Methods & Applications 91, 20--31, 2013 | 10 | 2013 |
Convergence to steady state for a phase field system with memory V Vergara Halle (Saale), Univ., Diss., 2006, 2006 | 9 | 2006 |
Asymptotic behaviour of the time-fractional telegraph equation V Vergara Journal of Applied Probability 51 (3), 890--893, 2014 | 7 | 2014 |
Convergence to steady states of solutions to nonlinear integral evolution equations. V Vergara Calculus of Variations & Partial Differential Equations 40, 2011 | 7 | 2011 |
A non-linear stable non-Gaussian process in fractional time S Solís, V Vergara | 6 | 2022 |
A non-local in time telegraph equation JC Pozo, V Vergara Nonlinear Analysis 193, 111411, 2020 | 6 | 2020 |