Problèmes de rigidité et spectre marqué des longueurs

[ADK] A. Avila, J. De Simoi, V. Kaloshin, An integrable deformation of an ellipse of small eccentricity is an ellipse, Ann. of Math. 184 (2016), no. 2, 527–558.

[BCG] G. Besson, G. Courtois, S. Gallot, Entropies et rigidité des espaces localement symétriques de courbure strictement négative, Geometric And Functional Analysis 5 (1995), 731–799.

[BuKa] K. Burns, A. Katok, Manifolds with non-positive curvature, Ergodic Theory and Dynamical Systems 5 (1985) no 2, 307–317.

[Ch] J. Chazarain, Formule de Poisson pour les variétés riemanniennes. Inventiones math. 24(1974), 65–82.

[CdV] Y. Colin de Verdière, Spectre du laplacien et longueurs des géodésiques périodiques II. Comp. Math. 27 (1973) 159–184.

[Cr1] C. B. Croke, Rigidity for surfaces of nonpositive curvature, Comment. Math. Helv. 65 (1990), no.1, 150–169.

[CrSh] C. B. Croke, V. A. Sharafutdinov, Spectral rigidity of a compact negatively curved manifold, Topology 37 (1998), no. 6, pp. 1265–1273.

[DuGu] J.J. Duistermaat, V.W. Guillemin, The spectrum of positive elliptic operators and periodic bicharacteristics, Inventiones Math. 29 (1975), 39–79.

[GWW] C. Gordon, D. Webb, S. Wolpert, Isospectral plane domains and surfaces via Riemannian orbifolds, Inventiones Math. 110 (1992) no 1, 1–22.

[GKL] C. Guillarmou, G. Knieper, T. Lefeuvre, Geodesic stretch, pressure metric and marked length spectrum rigidity, arXiv:1909.08666.

[GL] C. Guillarmou, T. Lefeuvre, The marked length spectrum of Anosov manifolds. Annals of Mathematics 190 (2019), no 1., 321–344.

[GuKa] V. Guillemin, D. Kazhdan, Some inverse spectral results for negatively curved 2-manifolds, Topology 19 (1980), 301–312.

[Ha1] U. Hamenstädt, Time preserving conjugacies of geodesic flows. Ergod. Th. Dynam. Sys. 12 (1992), 67–74.

[Ha2] U. Hamenstädt, Cocycles, symplectic structures and intersection, Geom. Funct. Anal. 9 (1999) 90–140.

[HeZe] H. Hezari, S. Zelditch, One can hear the shape of ellipses of small eccentricity, arXiv:1907.03882.

[Kac] M. Kac, Can one hear the shape of a drum, American Mathematical Monthly. 73 (1966) no 4, part2.

[KaSo] V. Kaloshin, A. Sorrentino, On the local Birkhoff conjecture for convex billiards, Annals of Mathematics 188 (2018), no. 1, 315–380.

 [Ka] A. Kato, Four applications of conformal equivalence to geometry and dynamics, Ergodic Theory and Dynamical Systems 8 (1988), 139–152.

[Mi] J. Milnor, Eigenvalues of the Laplace operator on certain manifolds, Proceedings of the National Academy of Sciences of the United States of America 51 (1964) no 4, 542.

[MKSi] H.P. Mc Kean, I.M. Singer, Curvature and the eigenvalues of the Laplacian, J. Diff. Geom. 1 (1967), 43–69.

[OPS] B. Osgood, R. Philipps, P. Sarnak, Compact isospectral sets of Riemann surfaces, J. Funct. Anal. 80 (1988), 212–234.

[Ot] J-P. Otal, Le spectre marqué des longueurs des surfaces à courbure négative, Annals of Mathematics (2) 131 (1990), no. 1, 151–162.

[Pl] A. Pleijel, A study of certain Green’s functions with applications in the theory of vibrating membranes, Arkiv för mathematik 2 (1954), no 6, 553–569.

[Su] T. Sunada, Riemannian coverings and isospectral manifolds, Annals of Mathematics 121 (1985), 169–186.

[Vi] M-F. Vignéras, Variétés riemanniennes isospectrales non-isométriques, Annals of Mathematics, Second Series, 112 (1980), no. 1, 21–32.

Colin Guillarmou est directeur de recherche au CNRS, affecté au laboratoire de mathématiques d’Orsay (LMO, CNRS et université Paris-Sud).

Thibault Lefeuvre a soutenu sa thèse de l’université Paris-Sud, préparée sous la direction de Colin Guillarmou, en décembre 2019.