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ON A DISTANCE DEFINED BY THE LENGTH SPECTRUM ON TEICHMÜLLER SPACE
 ANNALES ACADEMIAE SCIENTIARUM FENNICAE, VOLUMEN 28, 2003, 315326
, 2003
"... We consider a distance dL on the Teichmü ller space T (S0) of a hyperbolic Riemann surface S0. The distance is defined by the length spectrum of Riemann surfaces in T (S0) and we call it the length spectrum metric on T (S0). It is known that the distance dL determines the same topology as that of ..."
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We consider a distance dL on the Teichmü ller space T (S0) of a hyperbolic Riemann surface S0. The distance is defined by the length spectrum of Riemann surfaces in T (S0) and we call it the length spectrum metric on T (S0). It is known that the distance dL determines the same topology