Recent Submissions

  • Flow with $A_\infty(\mathbb R)$ density and transport equation in $\mathrm{BMO}(\mathbb R)$ 

    Jiang R.; Li K.; Xiao J. (Forum of Mathematics, Sigma, 2019-11)
    We show that, if $b\in L^1(0,T;L^1_{\rm {loc}}(\mathbb R))$ has spatial derivative in the John-Nirenberg space ${\rm{BMO}}(\mathbb R)$, then it generates a unique flow $\phi(t,\cdot)$ which has an $A_\infty(\mathbb R)$ ...
  • Bilinear Calderón--Zygmund theory on product spaces 

    Li K.; Martikainen H.; Vuorinen E. (Journal des Math\'ematiques Pures et Appliqu\'ees, 2019-10)
    We develop a wide general theory of bilinear bi-parameter singular integrals $T$. This includes general Calder\'on--Zygmund type principles in the bilinear bi-parameter setting: easier bounds, like estimates in the Banach ...
  • Quantitative weighted estimates for Rubio de Francia's Littlewood--Paley square function 

    Garg R.; Roncal L.; Shrivastava S. (Journal of Geometric Analysis, 2019-12)
    We consider the Rubio de Francia's Littlewood--Paley square function associated with an arbitrary family of intervals in $\mathbb{R}$ with finite overlapping. Quantitative weighted estimates are obtained for this operator. ...
  • An optimal scaling to computationally tractable dimensionless models: Study of latex particles morphology formation 

    Rusconi S.; Dutykh D.; Zarnescu A.; Sokolovski D.; Akhmatskaya E. (Computer Physics Communications, 2020-02)
    In modelling of chemical, physical or biological systems it may occur that the coefficients, multiplying various terms in the equation of interest, differ greatly in magnitude, if a particular system of units is used. Such ...
  • Some geometric properties of Riemann’s non-differentiable function 

    Eceizabarrena D. (Comptes Rendus Mathematique, 2019-11-06)
    Riemann’s non-differentiable function is a celebrated example of a continuous but almost nowhere differentiable function. There is strong numeric evidence that one of its complex versions represents a geometric trajectory ...
  • Models for damped water waves 

    Granero-Belinchon R.; Scrobogna S. (SIAM Journal of Applied Mathematics, 2019)
    In this paper we derive some new weakly nonlinear asymptotic models describing viscous waves in deep water with or without surface tension effects. These asymptotic models take into account several different dissipative ...
  • Análisis de Fourier en el toro infinito-dimensional 

    Fernández E. (2019-10-24)
    Se presentan algunos resultados originales de análisis armónico para funciones definidas en el toro infinito, que es el grupo topológico compacto consistente en el producto cartesiano de una familia numerable de toros ...
  • Asymptotic behaviour of some nonlocal equations in mathematical biology and kinetic theory 

    Havva Yoldaş (2019-09)
    We study the long-time behaviour of solutions to some partial differential equations arising in modeling of several biological and physical phenomena. In this work, the type of the equations we consider is mainly nonlocal, ...
  • Minimizers of a Landau-de Gennes energy with a subquadratic elastic energy 

    Canevari G.; Majumdar A.; Stroffolini B. (Archive for Rational Mechanics and Analysis, 2019)
    We study a modified Landau-de Gennes model for nematic liq- uid crystals, where the elastic term is assumed to be of subquadratic growth in the gradient. We analyze the behaviour of global minimizers in two- and three-dimensional ...
  • Reconstruction of the Derivative of the Conductivity at the Boundary 

    Ponce-Vanegas F. (2019-08)
    We describe a method to reconstruct the conductivity and its normal derivative at the boundary from the knowledge of the potential and current measured at the boundary. This boundary determination implies the uniqueness ...
  • A Bilinear Strategy for Calderón's Problem 

    Ponce-Vanegas F. (2019-08)
    Electrical Impedance Imaging would suffer a serious obstruction if for two different conductivities the potential and current measured at the boundary were the same. The Calder\'on's problem is to decide whether the ...
  • $A_1$ theory of weights for rough homogeneous singular integrals and commutators 

    Pérez C.; Rivera-Ríos I.; Roncal L. (Annali della Scuola Normale Superiore di Pisa. Classe di Scienze. Serie V, 2019)
    Quantitative $A_1-A_\infty$ estimates for rough homogeneous singular integrals $T_{\Omega}$ and commutators of $\BMO$ symbols and $T_{\Omega}$ are obtained. In particular the following estimates are proved: \[ \|T_\Omega ...
  • On the absolute divergence of Fourier series in the infinite dimensional torus 

    Fernández E.; Roncal L. (Colloquium Mathematicum, 2019-03-22)
    In this note we present some simple counterexamples, based on quadratic forms in infinitely many variables, showing that the implication $f\in C^{(\infty}(\mathbb{T}^\omega)\Longrightarrow\sum_{\bar{p}\in\mathbb{Z}^\inf ...
  • Hypocoercivity of linear kinetic equations via Harris's Theorem 

    Cañizo J. A.; Cao C.; Evans J.; Yoldaş H. (Kinetic & Related Models, 2019-02-27)
    We study convergence to equilibrium of the linear relaxation Boltzmann (also known as linear BGK) and the linear Boltzmann equations either on the torus $(x,v) \in \mathbb{T}^d \times \mathbb{R}^d$ or on the whole ...
  • Improved fractional Poincaré type inequalities in John domains 

    Cejas E.; Drelichman I.; Martínez-Perales J. (Arkiv för Matematik, 2019)
    We obtain improved fractional Poincaré inequalities in John domains of a metric space $(X, d)$ endowed with a doubling measure $\mu$ under some mild regularity conditions on the measure $\mu$. We also give sufficient ...
  • Bilinear identities involving the $k$-plane transform and Fourier extension operators 

    Beltran D.; Vega L. (2019)
    We prove certain $L^2(\mathbb{R}^n)$ bilinear estimates for Fourier extension operators associated to spheres and hyperboloids under the action of the $k$-plane transform. As the estimates are $L^2$-based, they follow from ...
  • Endpoint Sobolev continuity of the fractional maximal function in higher dimensions 

    Beltran D.; Madrid J. (2019)
    We establish continuity mapping properties of the non-centered fractional maximal operator $M_{\beta}$ in the endpoint input space $W^{1,1}(\mathbb{R}^d)$ for $d \geq 2$ in the cases for which its boundedness is known. ...
  • A Hardy-type inequality and some spectral characterizations for the Dirac–Coulomb operator 

    Cassano B.; Pizzichillo F.; Vega L. (Revista Matemática Complutense, 2019-06)
    We prove a sharp Hardy-type inequality for the Dirac operator. We exploit this inequality to obtain spectral properties of the Dirac operator perturbed with Hermitian matrix-valued potentials $\mathbf V$ of Coulomb type: ...
  • On extension problem, trace hardy and Hardy’s inequalities for some fractional Laplacians 

    Boggarapu P.; Roncal L.; Thangavelu S. (Communications on pure and applied analysis, 2019-09)
    We obtain generalised trace Hardy inequalities for fractional powers of general operators given by sums of squares of vector fields. Such inequalities are derived by means of particular solutions of an extended equation ...
  • Bloom type upper bounds in the product BMO setting 

    Li K.; Martikainen H.; Vuorinen E. (Journal of Geometric Analysis, 2019-04-08)
    We prove some Bloom type estimates in the product BMO setting. More specifically, for a bounded singular integral $T_n$ in $\mathbb R^n$ and a bounded singular integral $T_m$ in $\mathbb R^m$ we prove that $$ \| [T_n^1, ...

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