Julio Delgado is a Research Associate at Imperial College London and member of the Pure Analysis and PDEs group. His main interest is Harmonic Analysis and their interactions with Partial Differential Equations, Operator Theory and Functional Analysis. More specifically his research include: pseudo-differential operators, Weyl-Hormander calculus, degenerate elliptic operators, Schatten-von Neumann ideals, Analysis of operators on Lie groups and manifolds.
Daher R, Delgado J, Ruzhansky M, Titchmarsh theorems for Fourier transforms of Hölder-Lipschitz functions on compact homogeneous manifolds
Delgado J, Ruzhansky M, 2014, Fourier multipliers, symbols and nuclearity on compact manifolds
Delgado J, Ruzhansky M, 2017, -BOUNDS FOR PSEUDO-DIFFERENTIAL OPERATORS ON COMPACT LIE GROUPS, Journal of the Institute of Mathematics of Jussieu, ISSN:1474-7480, Pages:1-29
Delgado J, Ruzhansky M, The bounded approximation property of variable Lebesgue spaces and nuclearity
Delgado J, Ruzhansky M, Schatten-von Neumann classes of integral operators