There exist multilinear Bohnenblust–Hille constants (Cn) n= 1∞ with limn→∞(Cn+ 1− Cn)= 0 D Nunez-Alarcon, D Pellegrino, JB Seoane-Sepúlveda, ... Journal of Functional Analysis 264 (2), 429-463, 2013 | 47 | 2013 |
On the Bohnenblust–Hille inequality and a variant of Littlewoodʼs 4/3 inequality D Nuñez-Alarcón, D Pellegrino, JB Seoane-Sepúlveda Journal of Functional Analysis 264 (1), 326-336, 2013 | 47 | 2013 |
A note on the polynomial Bohnenblust–Hille inequality D Nuñez-Alarcón Journal of Mathematical Analysis and Applications 407 (1), 179-181, 2013 | 23 | 2013 |
Optimal exponents for Hardy–Littlewood inequalities for m-linear operators RM Aron, D Núñez-Alarcón, DM Pellegrino, DM Serrano-Rodríguez Linear Algebra and its Applications 531, 399-422, 2017 | 21 | 2017 |
Remarks on an inequality of Hardy and Littlewood WV Cavalcante, D Núñez-Alarcón Quaestiones Mathematicae 39 (8), 1101-1113, 2016 | 18 | 2016 |
Absolutely summing multilinear operators via interpolation N Albuquerque, D Núñez-Alarcón, J Santos, DM Serrano-Rodríguez Journal of Functional Analysis 269 (6), 1636-1651, 2015 | 16 | 2015 |
On summability of multilinear operators and applications N Albuquerque, G Araujo, W Cavalcante, T Nogueira, D Nunez, ... Annals of Functional Analysis 9 (4), 574-590, 2018 | 14 | 2018 |
On the growth of the optimal constants of the multilinear Bohnenblust–Hille inequality D Núñez-Alarcón Linear Algebra and its Applications 439 (8), 2494-2499, 2013 | 12 | 2013 |
On the polynomial Hardy--Littlewood inequality G Araújo, P Jiménez-Rodriguez, G Munoz-Fernandez, D Núnez-Alarcón, ... arXiv preprint arXiv:1406.1977, 2014 | 11 | 2014 |
Some applications of the Hölder inequality for mixed sums N Albuquerque, T Nogueira, D Nunez-Alarcon, D Pellegrino, P Rueda Positivity 21 (4), 1575-1592, 2017 | 8 | 2017 |
New lower bounds for the constants in the real polynomial Hardy–Littlewood inequality W Cavalcante, D Núñez-Alarcón, D Pellegrino Numerical Functional Analysis and Optimization 37 (8), 927-937, 2016 | 8 | 2016 |
Sharp Anisotropic Hardy–Littlewood Inequality for Positive Multilinear Forms D Núñez-Alarcón, D Pellegrino, DM Serrano-Rodríguez Results in Mathematics 74 (4), 1-10, 2019 | 5 | 2019 |
The best constants in the multiple Khintchine inequality D Núñez-Alarcón, DM Serrano-Rodríguez Linear and Multilinear Algebra 67 (11), 2325-2344, 2019 | 4 | 2019 |
On the generalized Bohnenblust–Hille inequality for real scalars N Caro, D Núñez-Alarcón, DM Serrano-Rodríguez Positivity 21 (4), 1439-1455, 2017 | 4 | 2017 |
Optimal constants for a mixed Littlewood type inequality T Nogueira, D Núñez-Alarcón, D Pellegrino Revista de la Real Academia de Ciencias Exactas, Físicas y Naturales. Serie …, 2017 | 4 | 2017 |
The Orlicz inequality for multilinear forms D Núñez-Alarcón, D Pellegrino, D Serrano-Rodríguez Journal of Mathematical Analysis and Applications 505 (2), 125520, 2022 | 2 | 2022 |
Super-critical Hardy--Littlewood inequalities for multilinear forms D Nunez-Alarcon, D Paulino, D Pellegrino arXiv preprint arXiv:2002.10239, 2020 | 1 | 2020 |
Unified Grothendieck's and Kwapie\'{n}'s theorems for multilinear operators D Núñez-Alarcón, J Santos, D Serrano-Rodríguez arXiv preprint arXiv:2202.04523, 2022 | | 2022 |
Optimal constants of the mixed Littlewood inequalities: the complex case W Cavalcante, D Núñez-Alarcón, D Pellegrino, P Rueda MATHEMATICAL INEQUALITIES & APPLICATIONS 25 (1), 205-220, 2022 | | 2022 |
A subexponential vector-valued Bohnenblust–Hille type inequality N Albuquerque, D Núñez-Alarcón, DM Serrano-Rodríguez Journal of Mathematical Analysis and Applications 432 (1), 314-323, 2015 | | 2015 |