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Led by Javier Fernández de Bobadilla and Ilya Smirnov, the researchers will collaborate with Johannes Gutenberg University of Mainz. This call aims to select research projects involving both Spanish and German groups. The DFG will fund the German groups, and the AEI will fund the Spanish…
BCAM people
Carlo Estadilla will defend his thesis on Tuesday, December 3rd
- The defence will take place at Salón de Grados at the Faculty of Science and Technology of the Leioa Campus and o
About the center
BCAM welcomes more than 300 students from various schools in the Basque Country in November
- Some of these visits took place as part of the OREskolak initiative and the First Lego League initiative.
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The paper is a collaboration between the MATHDES group at BCAM an
Latest publications
View allMixed-precision finite element kernels and assembly: Rounding error analysis and hardware acceleration
Croci, M.; Wells, G. N. (2024-10-16)
In this paper we develop the first fine-grained rounding error analysis of finite element (FE) cell kernels and assembly. The theory includes mixed-precision implementations and accounts for hardware-acceleration via matrix ...
WEIGHTED LORENTZ SPACES: SHARP MIXED Ap − A∞ ESTIMATE FOR MAXIMAL FUNCTIONS
Accomazzo, N.; Duoandikoetxea, J.; Nieraeth, Z.; Ombrosi, S.; Pérez, C. (2023-01-01)
We prove the sharp mixed Ap − A∞ weighted estimate for the Hardy-Littlewood maximal function in the context of weighted Lorentz spaces, namely 11 ∥M∥ p,q ≲p,q,n [w]p [σ]min(p,q) , L (w) Ap A∞ 1 where σ = w 1−p . Our met...
SELF-IMPROVING POINCARE ́-SOBOLEV TYPE FUNCTIONALS IN PRODUCT SPACES
Pérez, C.; Cejas, M.E.; Mosquera, C.; Rela, E. (2021-01-01)
In this paper we give a geometric condition which ensures that (q,p)-Poincar ́e-Sobolev inequalities are implied from generalized (1, 1)-Poincar ́e inequalities related to L1 norms in the context of product spaces. The conce...
AN EXTREMAL PROBLEM AND INEQUALITIES FOR ENTIRE FUNCTIONS OF EXPONENTIAL TYPE
Sousa, M.; Chirre, A.; Dimitrov, D.K.; Quesada-Herrera, E. (2024-01-01)
We study two variations of the classical one-delta problem for entire functions of exponential type, known also as the Carath ́eodory–Fej ́er– Tura ́n problem. The first variation imposes the additional requirement that the ...