In $1969$, Margulis proved, for suitable constant $r,h>0$ that :

$a(p)=\lim_{r\to \infty} \frac{VolS(p,r)}{e^{h r}}$  with ($(S(p,r)$ is geodesic spheres),exists and applied for Riemannian compact manifolds of hyperbolic type  with negative  curvature  which it is the main result implies purely exponential growth of volume of geodesic spheres.Really I'am curiouse to know if this limit does exist for Manifolds with positive curvature ,we may lookk to apply this in unit tangent bundle of $S^4$ ? and what about continuity of $a(p)$ in this case ?