论文信息 - Distance and Measurement in Domain Theory

Distance and Measurement in Domain Theory

Abstract We investigate the notion of distance on domains. In particular, we show that measurement is a fundamental concept underlying partial metrics by proving that a domain in its Scott topology is partially metrizable only if it admits a measurement. Conversely, the natural notion of a distance associated with a measurement not only yields meaningful partial metrics on domains of essential importance in computation, such as I R , Σ∞ and P ω, it also serves as a useful theoretical device by allowing one to establish the existence of partial metrics on arbitrary ω-continuous dcpo's.

Pawel Waszkiewicz

[1] S. G. Matthews,et al. Partial Metric Topology , 1994 .

[2] Abbas Edalat,et al. A Computational Model for Metric Spaces , 1998, Theor. Comput. Sci..

[3] S. J. O''Neill,et al. Partial Metrics, Valuations, and Domain Theory , 1995 .

[4] Samson Abramsky,et al. Domain theory , 1995, LICS 1995.

[5] A. Frink. Distance functions and the metrization problem , 1937 .

[6] Reinhold Heckmann,et al. Approximation of Metric Spaces by Partial Metric Spaces , 1999, Appl. Categorical Struct..

[7] Michael W. Mislove,et al. A foundation for computation , 2000 .

[8] Philipp Sünderhauf. Sobriety in Terms of Nets , 2000, Appl. Categorical Struct..