Continuity Properties in Constructive Mathematics
Ishihara, Hajime
J. Symbolic Logic, Tome 57 (1992) no. 1, p. 557-565 / Harvested from Project Euclid
The purpose of this paper is an axiomatic study of the interrelations between certain continuity properties. We deal with principles which are equivalent to the statements "every mapping is sequentially nondiscontinuous", "every sequentially nondiscontinuous mapping is sequentially continuous", and "every sequentially continuous mapping is continuous". As corollaries, we show that every mapping of a complete separable space is continuous in constructive recursive mathematics (the Kreisel-Lacombe-Schoenfield-Tsejtin theorem) and in intuitionism.
Publié le : 1992-06-14
Classification:  Continuity,  sequential continuity,  sequential nondiscontinuity,  Kreisel-Lacombe-Shoenfield-Tsejtin theorem,  constructive,  03F65,  46S30
@article{1183743977,
     author = {Ishihara, Hajime},
     title = {Continuity Properties in Constructive Mathematics},
     journal = {J. Symbolic Logic},
     volume = {57},
     number = {1},
     year = {1992},
     pages = { 557-565},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1183743977}
}
Ishihara, Hajime. Continuity Properties in Constructive Mathematics. J. Symbolic Logic, Tome 57 (1992) no. 1, pp.  557-565. http://gdmltest.u-ga.fr/item/1183743977/