Published: June 01, 1994Received: September 10, 1992Available on J-STAGE: May 22, 2009Accepted: October 18, 1993
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We introduce a spectral distance on the set of compact Riemannian manifolds, making use of their heat kernels, and show some basic properties of the distance on a class of compact Riemannian manifolds with diameters uniformly bounded from above and Ricci curvatures uniformly bounded from below.
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