(Ph.D. in mathematics)
Formule des traces semi-classique au niveau d'une �nergie critique.
[1] A semi-classical trace formula at a non-degenerate level.
Journal of Functional Analysis 208 (2004), no.2, 446-481.
[2] A semi-classical trace formula at a totally degenerate critical level.
Communication in Mathematical Physics 247 (2004), no.2, 513-526.
[3] Contributions of non-extremum critical points to the semi-classical trace formula.
Journal of Functional Analysis 217 (2004), no.1, 79-102.
[4] Fundamental solutions of homogeneous elliptic differential operators.
Bulletin des Sciences Math�matiques 130 (2006), no.3, 264-268.
[5] Asymptotic approximation of degenerate fiber integrals.
Journal of Mathematical Analysis and Applications 320 (2006), no. 2, 528-542.
[6] Semi-classical spectral estimates for Schr�dinger operators. Degenerate maximum of the potential.
Journal of Differential Equations 226 (2006), no.1, 295-322.
[7] Spectral fluctuations of Schr�dinger operators generated by critical points of the potential.
Journal of Statistical Physics.
[8] Convolutions of semi-classical spectral distributions and periodic orbit theory.
Journal of Functional Analysis.
[9] Spectral estimates for degenerate critical levels.
Journal of Fourier Analysis and Applications.
[10] Equilibrium and eigenfunctions estimates in the semi-classical regime.
Journal of Mathematical Physics.
[11] Semi-classical spectral estimates for Schr�dinger operators. Degenerate minimum of the potential.
http://uk.arxiv.org/find/grp_math/1/au:+camus/0/1/0/all/0/1