S. Barberà and D. Coelho, How to choose a non-controversial list with k names, Social Choice and Welfare, vol.31, pp.79-96, 2008.

J. Bartholdi, C. A. Tovey, and M. A. Trick, Voting schemes for which it can be dicult to tell who won the election, Social Choice and Welfare, vol.6, issue.3, pp.157-165, 1989.

N. Betzler, J. Guo, and R. Niedermeier, Parameterized computational complexity of Dodgson and Young elections, Algorithm Theory -SWAT, 2008.

A. Barvinok, Polynomial time algorithm for counting integral points in polyhedra when the dimension is xed, Mathematics of Operations Research, vol.19, pp.769-779, 1994.

A. Barvinok and J. Pommersheim, An algorithmic theory of lattice points in polyhedra, New Perspectives in Algebraic Combinatorics, vol.38, pp.91-147, 1996.

M. Brion, Points entiers dans les polyhèdres convexes, Annales Scientiques de l'Ecole Normale Supérieure, vol.21, issue.4, pp.653-663, 1998.

M. Bruynooghe, R. Cools, S. Verdoolaege, and K. Woods, Computation and manipulation of enumerators of integer projections of parametric polytopes, 2005.

I. Caragiannis, J. Covey, M. Feldman, M. Christopher, C. Homan et al., On the Approximability of Dodgson and Young Elections, Articial Intelligence, vol.187, pp.31-51, 2012.

P. Clauss and V. Loechner, Parametric analysis of polyhedral iteration spaces, Journal of VLSI Signal Processing, vol.2, pp.179-194, 1998.
URL : https://hal.archives-ouvertes.fr/inria-00534840

, A cone unimodular if its generators form a basis of the lattice Z d

D. Coelho, Understanding, evaluating and selecting voting rules through games and axioms, 2004.

C. Marquis-de, Essai sur l'Application de l'Analyse à la Probabilité des Décisions Rendues à la Pluralité des Voix, 1785.

S. Courtin, B. Mbih, and I. Moyouwou, Are Condorcet procedures so bad according to the reinforcement axiom? Thema Working, pp.2012-2049, 2012.

C. L. Dodgson, A Method of Taking Votes on More than Two Issues, 1876.

E. Ehrhart, Sur les polyèdres rationnels homothétiques à n dimensions. Comptes Rendus de l'Academie des Sciences, vol.254, pp.616-618, 1962.

E. Ehrhart, Sur un problème de géométrie diophantienne linéaire, Journal für die Reine und Angewandte Mathematik, vol.226, pp.1-49, 1967.

P. C. Fishburn, Condorcet Social Choice Functions. SIAM Journal on Applied Mathematics, vol.33, pp.469-489, 1977.

W. V. Gehrlein and P. C. Fishburn, The probability of the paradox of voting: A computable solution, Journal of Economic Theory, vol.13, pp.14-25, 1976.

W. V. Gehrlein, The Condorcet criterion and committee selection, Mathematical Social Sciences, vol.10, pp.199-209, 1985.

W. V. Gehrlein and D. Lepelley, Voting Paradoxes and Group Coherence, 2010.
URL : https://hal.archives-ouvertes.fr/hal-01243452

H. C. Haung and V. C. Chua, Analytical representation of probabilities under IAC condition, Social Choice and Welfare, vol.17, pp.143-155, 2000.

E. Hemaspaandra, L. Hemaspaandra, and J. Rothe, Exact analysis of Dodgson elections: Lewis Carroll's 1876 voting system is complete for parallel access to NP, Journal of the ACM, vol.44, issue.6, pp.806-825, 1997.

E. Kamwa, The Kemeny rule and committee elections, Economics Bulletin, vol.33, issue.1, pp.648-654, 2013.

E. Kamwa and V. Merlin, Coincidence of Condorcet committees, 2013.
URL : https://hal.archives-ouvertes.fr/hal-01631176

E. Kamwa, On the Fishburn's social choice function, International Journal of Economic Theory, vol.11, issue.2, 2015.

E. Kamwa, On stable voting rules for electing committees, 2015.

J. Kemeny, Mathematics without numbers, Daedalus, vol.88, pp.571-591, 1959.

J. Kemeny and I. Snell, Mathematical Models in the Social Sciences, 1960.

G. H. Kramer, A dynamical model of political equilibrium, Journal of Economic Theory, vol.16, pp.310-334, 1977.

D. Lepelley, A. Louichi, and H. Smaoui, On Ehrhart polynomials and probability calculations in voting theory, Social Choice and Welfare, vol.30, issue.3, pp.363-383, 2008.
URL : https://hal.archives-ouvertes.fr/hal-01245310

N. R. Miller, A new solution set for tournaments and majority voting : Further graphtheoretical approaches to the theory of voting, American Journal of Political Science, vol.21, pp.68-96, 1980.

T. C. Ratli, Some startling inconsistencies when electing committees, Social Choice and Welfare, vol.21, pp.433-454, 2003.

T. Schwartz, The Logic of Collective Choice, 1986.

P. Simpson, On dening areas of voter choice, Quarterly Journal of Economics, vol.83, pp.478-490, 1969.

S. Verdoolaege, R. Seghir, K. Beyls, V. Loechner, and M. Bruynooghe, Analytical computation of Ehrhart polynomials: enabling more compiler analysis and optimizations, Proceedings of International Conference on Compilers, Architecture and Synthesis for Embedded Systems, 2004.

H. P. Young, Social Choice scoring functions, SIAM Journal of Applied Mathematics, vol.28, pp.824-838, 1975.

H. P. Young, Extending Condorcet's rule, Journal of Economic Theory, vol.16, pp.335-353, 1977.

H. Young and A. Levenglick, A consistent extension of Condorcet's election principle, SIAM Journal of Applied Mathematics, vol.35, pp.285-300, 1978.