]. S. +-08, L. Biasotti, B. De-floriani, P. Falcidieno, D. Frosini et al., Describing shapes by geometrical-topological properties of real functions, ACM Computing Surveys (CSUR), vol.40, issue.4, p.12, 2008.

K. Buchin, T. K. Dey, J. Giesen, and M. John, Recursive geometry of the flow complex and topology of the flow complex filtration, Computational Geometry, vol.40, issue.2, pp.115-137, 2008.

A. Banyaga and D. Hurtubise, Lectures on Morse Homology, Lectures on Morse Homology. Kluwer, 2004.

R. Bott, Morse theory indomitable, Publications mathématiques de l'IHÉS, vol.68, issue.1, pp.99-114, 1988.

F. Chazal, L. J. Guibas, S. Y. Oudot, and P. Skraba, Persistence-based clustering in riemannian manifolds, Proceedings of the 27th annual ACM symposium on Computational geometry - SoCG '11, p.97106, 2011.
URL : https://hal.archives-ouvertes.fr/inria-00389390

F. Cazals, F. Chazal, and T. Lewiner, Molecular shape analysis based upon the morse-smale complex and the connolly function, Proceedings of the nineteenth conference on Computational geometry - SCG '03, 2003.

. Morse-smale, complex and the Connolly function, ACM Symposium on Computational Geometry, 2003.

F. Cazals and D. Cohen-steiner, Reconstructing 3D compact sets, Computational Geometry, vol.45, issue.1-2, pp.1-13, 2012.
URL : https://hal.archives-ouvertes.fr/hal-00849819

F. Cazals, A. Parameswaran, and S. Pion, Robust construction of the three-dimensional flow complex, Proceedings of the twenty-fourth annual symposium on Computational geometry - SCG '08, p.182191, 2008.
URL : https://hal.archives-ouvertes.fr/inria-00344962

A. Chattopadhyay, G. Vegter, and C. Yap, Certied computation of planar morsesmale complexes, ACM SoCG, 2012.

T. K. Dey, J. Giesen, E. A. Ramos, and B. Sadri, CRITICAL POINTS OF DISTANCE TO AN ?-SAMPLING OF A SURFACE AND FLOW-COMPLEX-BASED SURFACE RECONSTRUCTION, International Journal of Computational Geometry & Applications, vol.18, issue.01n02, pp.29-61, 2008.

H. Edelsbrunner, Discrete and Computational Geometry, Discrete and Computational Geometry, p.379404, 2003.

H. Edelsbrunner, J. Harer, and A. Zomorodian, Hierarchical morse complexes for piecewise linear 2-manifolds, Proceedings of the seventeenth annual symposium on Computational geometry - SCG '01, 2001.

J. Faugère, A new efficient algorithm for computing Gröbner bases (F4), Journal of Pure and Applied Algebra, vol.139, issue.1-3, pp.61-88, 1999.

R. Forman, Morse Theory for Cell Complexes, Advances in Mathematics, vol.134, issue.1, pp.90-145, 1998.

S. Gerber, P. Bremer, V. Pascucci, and R. Whitaker, Visual Exploration of High Dimensional Scalar Functions, IEEE Transactions on Visualization and Computer Graphics, vol.16, issue.6, pp.1271-1280, 2010.

J. Giesen and M. John, The flow complex: A data structure for geometric modeling, Computational Geometry, vol.39, issue.3, pp.178-190, 2008.

A. In and . Soda, , 2003.

J. Giesen and L. Kuehne, A parallel algorithm for computing the flow complex, Proceedings of the 29th annual symposium on Symposuim on computational geometry - SoCG '13, 2013.

T. Kaczynski, K. Mischaikow, and M. Mrozek, Computational Homology, Computational Homology, 2004.

T. Lewiner, H. Lopes, and G. Tavares, Optimal discrete Morse functions for 2-manifolds, Computational Geometry, vol.26, issue.3, pp.221-233, 2003.

W. John, . Milnor, and . Morse-theory, , 1963.

H. Mühlenbein, M. Schomisch, and J. Born, The parallel genetic algorithm as function optimizer, Parallel Computing, vol.17, issue.6-7, pp.619-632, 1991.

J. B. Roerdink and A. Meijster, The Watershed Transform: Definitions, Algorithms and Parallelization Strategies, Fundamenta Informaticae, vol.41, issue.1,2, pp.187-228, 2000.

F. Rouillier, Solving Zero-Dimensional Systems Through the Rational Univariate Representation, Applicable Algebra in Engineering, Communication and Computing, vol.9, issue.5, pp.433-461, 1999.
URL : https://hal.archives-ouvertes.fr/inria-00073264

N. Revol and F. Rouillier, Motivations for an Arbitrary Precision Interval Arithmetic and the MPFI Library, Reliable Computing, vol.11, issue.4, pp.275-290, 2005.
URL : https://hal.archives-ouvertes.fr/inria-00100985

V. Robins, P. J. Wood, and A. P. Sheppard, Theory and Algorithms for Constructing Discrete Morse Complexes from Grayscale Digital Images, IEEE Transactions on Pattern Analysis and Machine Intelligence, vol.33, issue.8, pp.1646-1658, 2011.

F. Rouillier and P. Zimmermann, Efficient isolation of polynomial's real roots, Journal of Computational and Applied Mathematics, vol.162, issue.1, pp.33-50, 2004.

D. , M. Thomas, and V. Natarajan, Symmetry in scalar eld topology, IEEE Transactions on Visualization and Computer Graphics, vol.17, issue.12, p.20352044, 2011.

D. J. Wales, Exploring Energy Landscapes with Monte Carlo Methods, AIP Conference Proceedings, 2003.

H. Wagner, C. Chen, and E. Vuçini, Efficient Computation of Persistent Homology for Cubical Data, Mathematics and Visualization, pp.91-106, 2011.

E. Weinan, J. Lu, and Y. Yao, The landscape of complex networks, 2012.

X. Zhu, R. Sarkar, and J. Gao, Topological Data Processing for Distributed Sensor Networks with Morse-Smale Decomposition, IEEE INFOCOM 2009 - The 28th Conference on Computer Communications, 2009.