References
R. Bowen,Anosov foliations are hyperfinite. Preprint.
R. Bowen andB. Marcus,Unique ergodicity for horocycle foliation. Preprint.
D. Capocaccia, A definition of Gibbs state for a compact set with Zv action,Commun. Math. Phys.,48 (1976), 85–88.
G. Choquet etP.-A. Meyer, Existence et unicité des représentations intégrales dans les convexes compacts quelconques,Ann. Inst. Fourier,13 (1963), 139–154.
A. Connes. Unpublished.
R. Edwards, K. Millett andD. Sullivan, Foliations with all leaves compact,Topology,16 (1977), 13–32.
L. Garnett,An ergodic theory for foliations. Preprint.
J. Plante, Foliations with measure preserving holonomy,Ann. Math.,102 (1975), 327–362.
D. Ruelle,Thermodynamic formalism, Addison-Wesley, Reading, Mass., 1978.
D. Ruelle andD. Sullivan, Currents, flows and diffeomorphisms,Topology,14 (1975), 319–327.
S. Schwartzmann, Asymptotic cycles,Ann. Math.,66 (1957), 270–284.
M. Shub, Endomorphisms of compact differentiable manifolds,Amer. J. Math.,91 (1969), 175–199.
Ia. G. Sinai, Gibbsian measures in ergodic theory,Uspehi Mat. Nauk,27, no 4 (1972), 21–64. English translation,Russian Math. Surveys,27, no 4 (1972), 21–69.
D. Sullivan, Cycles for the dynamical study of foliated manifolds and complex manifolds,Inventiones math.,36 (1976), 225–255.
D. Sullivan andR. F. Williams, On the homology of attractors,Topology,15 (1976), 259–262.
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Ruelle, D. Integral representation of measures associated with a foliation. Publications Mathématiques de L’Institut des Hautes Scientifiques 48, 127–132 (1978). https://doi.org/10.1007/BF02684314
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DOI: https://doi.org/10.1007/BF02684314