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10 results on '"Magniez, Jocelyn"'

1. L p -estimates for the heat semigroup on differential forms, and related problems

Author

Magniez, Jocelyn and Ouhabaz, El Maati

Subjects
Mathematics - Analysis of PDEs
Abstract

We consider a complete non-compact Riemannian manifold satisfying the volume doubling property and a Gaussian upper bound for its heat kernel (on functions). Let -- $\rightarrow$ $\Delta$ k be the Hodge-de Rham Laplacian on differential k-forms with k $\ge$ 1. By the Bochner decomposition formula -- $\rightarrow$ $\Delta$ k = * + R k. Under the assumption that the negative part R -- k is in an enlarged Kato class, we prove that for all p $\in$ [1, $\infty$], e --t -- $\rightarrow$ $\Delta$ k p--p $\le$ C(t log t) D 4 (1-- 2 p) (for large t). This estimate can be improved if R -- k is strongly sub-critical. In general, (e --t -- $\rightarrow$ $\Delta$ k) t>0 is not uniformly bounded on L p for any p = 2. We also prove the gradient estimate e --t$\Delta$ p--p $\le$ Ct -- 1 p , where $\Delta$ is the Laplace-Beltrami operator (acting on functions). Finally we discuss heat kernel bounds on forms and the Riesz transform on L p for p > 2.

Published
2017

2. Riesz transforms on non-compact manifolds

Author

Chen, Peng, Magniez, Jocelyn, and Ouhabaz, El Maati

Subjects
Mathematics - Analysis of PDEs
Abstract

Let $M$ be a complete non-compact Riemannian manifold satisfying the doubling volume property as well as a Gaussian upper bound for the corresponding heat kernel. We study the boundedness of the Riesz transform $d\Delta ^{-\frac{1}{2}}$ on both Hardy spaces $H^p$ and Lebesgue spaces $L^p$ under two different conditions on the negative part of the Ricci curvature $R^-$. First we prove that if $R^-$ is $\alpha$-subcritical for some $\alpha \in [0,1)$, then the Riesz transform $d^*\Delta^{-\frac{1}{2}}$ on differential $1$-forms is bounded from the associated Hardy space $H^p_{\overrightarrow{\Delta}}(\Lambda^1T^*M)$ to $L^p(M)$ for all $p\in [1,2]$. As a consequence, the Riesz transform (on functions) is bounded on $ L^p$ for all $p\in (1,p_0)$ where $p_0>2$ depends on $\alpha$ and the constant appearing in the doubling property. Second, we prove that if $$\int_0^1 \left\|\frac{|R^-|^{\frac{1}{2}}}{v(\cdot,\ \sqrt{t})^{\frac{1}{p_1}}}\right\|_{p_1}\frac{dt}{\sqrt{t}}+\int_1^\infty \left\|\frac{|R^-|^{\frac{1}{2}}}{v(\cdot,\ \sqrt{t})^{\frac{1}{p_2}}}\right\|_{p_2}\frac{dt}{\sqrt{t}}<\infty,$$ for some $p_1>2$ and $p_2>3$, then the Riesz transform $d\Delta^{-\frac{1}{2}}$ is bounded on $L^p$ for all $1 0$, then $d\Delta^{-\frac{1}{2}}$ is bounded on $L^p$ for all $12$ under conditions on $R^-$ and the potential $V$. We prove both positive and negative results on the boundedness of $dA^{-\frac{1}{2}}$ on $L^p$

Published
2014

3. Riesz transforms of the Hodge-de Rham Laplacian on Riemannian manifolds

Author

Magniez, Jocelyn

Subjects
Mathematics - Analysis of PDEs
Abstract

Let $M$ be a complete non-compact Riemannian manifold satisfying the doubling volume property. Let $\overrightarrow{\Delta}$ be the Hodge-de Rham Laplacian acting on 1-differential forms. According to the Bochner formula, $\overrightarrow{\Delta}=\nabla^*\nabla+R_+-R_-$ where $R_+$ and $R_-$ are respectively the positive and negative part of the Ricci curvature and $\nabla$ is the Levi-Civita connection. We study the boundedness of the Riesz transform $d^*(\overrightarrow{\Delta})^{-\frac{1}{/2}}$ from $L^p(\Lambda^1T^*M)$ to $L^p(M)$ and of the Riesz transform $d(\overrightarrow{\Delta})^{-\frac{1}{2}}$ from $L^p(\Lambda^1T^*M)$ to $L^p(\Lambda^2T^*M)$. We prove that, if the heat kernel on functions $p_t(x,y)$ satisfies a Gaussian upper bound and if the negative part $R_-$ of the Ricci curvature is $\epsilon$-sub-critical for some $\epsilon\in[0,1)$, then $d^*(\overrightarrow{\Delta})^{-\frac{1}{2}}$ is bounded from $L^p(\Lambda^1T^*M)$ to $L^p(M)$ and $d(\overrightarrow{\Delta})^{-\frac{1}{2}}$ is bounded from $L^p(\Lambda^1T^*M)$ to $L^p(\Lambda^2T^* M)$ for $p\in(p_0',2]$ where $p_0>2$ depends on $\epsilon$ and on a constant appearing in the doubling volume property. A duality argument gives the boundedness of the Riesz transform $d(\Delta)^{-\frac{1}{2}}$ from $L^p(M)$ to $L^p(\Lambda^1T^*M)$ for $p\in [2,p_0)$ where $\Delta$ is the non-negative Laplace-Beltrami operator. We also give a condition on $R_-$ to be $\epsilon$-sub-critical under both analytic and geometric assumptions.

Published
2014

7. Etude de la bornitude des transformées de Riesz sur Lp via le Laplacien de Hodge-de Rham

Author

MAGNIEZ, Jocelyn, Institut de Mathématiques de Bordeaux (IMB), Université Bordeaux Segalen - Bordeaux 2-Université Sciences et Technologies - Bordeaux 1-Université de Bordeaux (UB)-Institut Polytechnique de Bordeaux (Bordeaux INP)-Centre National de la Recherche Scientifique (CNRS), Université de Bordeaux, El Maati Ouhabaz, David Lannes [Président], Thierry Coulhon [Rapporteur], Marc Arnaudon, Frédéric Bernicot, Colin Guillarmou, Emmanuel Russ, Ouhabaz, El Maati, Arnaudon, Marc, Bernicot, Frédéric, Guillarmou, Colin, Russ, Emmanuel, Lannes, David, and Coulhon, Thierry

Subjects
Heat kernels, Riesz transforms, Sobolev regularity, Opérateurs de Schrödinger, [MATH.MATH-OA]Mathematics [math]/Operator Algebras [math.OA], Régularité de Sobolev, Laplacien de Hodge-de Rham, Variété riemanienne, Riemannian manifolds, Off-diagonal estimates, Estimées hors-diagonales, Noyaux de la chaleur, Transformées de Riesz, [MATH.MATH-AG]Mathematics [math]/Algebraic Geometry [math.AG], Schrödinger operators, Hodge-de Rham Laplacian
Abstract

This thesis has two main parts. The first one deals with the study of the boundedness on Lp of the Riesz transform d∆-½ , where ∆ denotes the nonnegative Laplace-Beltrami operator. The second one deals with the Sobolev regularity W1,p of the solution of the heat equation. We also establish some results on the Riesz transforms of Schrödinger operators with a potential possibly having a negative part. In this work, we consider a complete non-compact Riemannian manifold (M, g). We assume that M satisfies the volume doubling property (with doubling constant equal to D) as well as a Gaussian upper estimate for its heat kernel associated to the operator ∆. We work with the Hodge-de Rham Laplacian ∆, acting on 1-differential forms of M. With the Bochner formula, linking ∆to the Ricci curvature of M, we see ∆ has a vector-valued Schrödinger operator. It is a duality argument, based on a commutation formula, which links the study of ∆to the one of ∆. [...]; Cette thèse comporte deux sujets d’étude mêlés. Le premier concerne l’étude de la bornitude sur Lp de la transformée de Riesz d∆-½ , où ∆ désigne l’opérateur de Laplace-Beltrami (positif). Le second traite de la régularité de Sobolev W1,p de la solution de l’équation de la chaleur non perturbée. Nous établissons également quelques résultats concernant les transformées de Riesz d’opérateurs de Schrödinger avec un potentiel comportant éventuellement une partie négative.Dans le cadre de ces travaux, nous nous plaçons sur une variété riemanienne (M, g) complète et non compacte. Nous supposons que M satisfait la propriété de doublement de volume (de constante de doublement égale à D) ainsi qu’une estimation gaussienne supérieure pour son noyau de la chaleur (celui associé à l’opérateur ∆). Nous travaillons avec le laplacien de Hodge-de Rham, noté ∆, agissant sur les 1-formes différentielles de M. En s’appuyant sur la formule de Bochner, liant ∆ à la courbure de Ricci de M, nous assimilons ∆ à un opérateur de Schrödinger à valeurs vectorielles. C’est un argument de dualité, basé sur une formule de commutation algébrique, qui lie l’étude de ∆ à celle de ∆. [...]

Published
2015

8. The Hodge–de Rham Laplacian and Lp-boundedness of Riesz transforms on non-compact manifolds

Author

CHEN, Peng, MAGNIEZ, Jocelyn, OUHABAZ, El Maati, Institut de Mathématiques de Bordeaux (IMB), Université Bordeaux Segalen - Bordeaux 2-Université Sciences et Technologies - Bordeaux 1-Université de Bordeaux (UB)-Institut Polytechnique de Bordeaux (Bordeaux INP)-Centre National de la Recherche Scientifique (CNRS), and ANR-12-BS01-0013,HAB,Aux frontières de l'analyse Harmonique(2012)

Subjects
[MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP]
Abstract

International audience; Let M be a complete non-compact Riemannian manifold satisfying the doubling volume property as well as a Gaussian upper bound for the corresponding heat kernel. We study the boundedness of the Riesz transform d∆ − 1 2 on both Hardy spaces H p and Lebesgue spaces L p under two different conditions on the negative part of the Ricci curvature R − . First we prove that if R − is α-subcritical for some α ∈ [0, 1), then the Riesz transform d * − → ∆ − 1 2 on differential 1-forms is bounded from the associated Hardy space H p − → ∆ (Λ 1 T * M) to L p (M) for all p ∈ [1, 2]. As a consequence, d∆ − 1 2 is bounded on L p for all p ∈ (1, p 0) where p 0 > 2 depends on α and the constant appearing in the doubling property. Second, we prove that if 1 0 |R − | 1 2 v(·, √ t) 1 p 1 p1 dt √ t + ∞ 1 |R − | 1 2 v(·, √ t) 1 p 2 p2 dt √ t < ∞, for some p 1 > 2 and p 2 > 3, then the Riesz transform d∆ − 1 2 is bounded on L p for all 1 < p < p 2 . In the particular case where v(x, r) ≥ Cr D for all r ≥ 1 and |R − | ∈ L D/2−η ∩ L D/2+η for some η > 0, then d∆ − 1 2 is bounded on L p for all 1 < p < D. Furthermore, we study the boundedness of the Riesz transform of Schrödinger operators A = ∆ + V on L p for p > 2 under conditions on R − and the potential V . We prove both positive and negative results on the boundedness of dA − 1 2 on L p .

Published
2015

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