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Abstract Let f: M M be a C^1+ diffeomorphism on an m₀ -dimensional compact smooth Riemannian manifold M and a hyperbolic ergodic f -invariant probability measure. This paper obtains an upper bound for the stable (unstable) pointwise dimension of, which is given by the unique solution of an equation involving the sub-additive measure-theoretic pressure. If is a Sinai–Ruelle–Bowen (SRB) measure, then the Kaplan–Yorke conjecture is true under some additional conditions and the Lyapunov dimension of can be approximated gradually by the Hausdorff dimension of a sequence of hyperbolic sets \ ₙ\₍ ₁. The limit behaviour of the Carathéodory singular dimension of ₙ on the unstable manifold with respect to the super-additive singular valued potential is also studied.
WANG et al. (Mon,) studied this question.