# A quasitopos containing CONV and MET as full subcategories.

International Journal of Mathematics and Mathematical Sciences (1988)

- Volume: 11, Issue: 3, page 417-438
- ISSN: 0161-1712

## Access Full Article

top## How to cite

topLowen, E., and Lowen, R.. "A quasitopos containing CONV and MET as full subcategories.." International Journal of Mathematics and Mathematical Sciences 11.3 (1988): 417-438. <http://eudml.org/doc/46372>.

@article{Lowen1988,

author = {Lowen, E., Lowen, R.},

journal = {International Journal of Mathematics and Mathematical Sciences},

keywords = {limit; distance; cartesian closed category; category of convergence- approach spaces; quasitopos; approach spaces; bireflective subcategory; convergence spaces},

language = {eng},

number = {3},

pages = {417-438},

publisher = {Hindawi Publishing Corporation, New York},

title = {A quasitopos containing CONV and MET as full subcategories.},

url = {http://eudml.org/doc/46372},

volume = {11},

year = {1988},

}

TY - JOUR

AU - Lowen, E.

AU - Lowen, R.

TI - A quasitopos containing CONV and MET as full subcategories.

JO - International Journal of Mathematics and Mathematical Sciences

PY - 1988

PB - Hindawi Publishing Corporation, New York

VL - 11

IS - 3

SP - 417

EP - 438

LA - eng

KW - limit; distance; cartesian closed category; category of convergence- approach spaces; quasitopos; approach spaces; bireflective subcategory; convergence spaces

UR - http://eudml.org/doc/46372

ER -

## Citations in EuDML Documents

top- E. Lowen, R. Lowen, C. Verbeeck, Exponential objects in the construct $\mathrm{\mathit{P}\mathit{R}\mathit{A}\mathit{P}}$
- E. Lowen, R. Lowen, Topological quasitopos hulls of categories containing topological and metric objects
- R. Baekeland, Robert Lowen, Measures of compactness in approach spaces
- E. Lowen-Colebunders, R. Lowen, M. Nauwelaerts, The cartesian closed hull of the category of approach spaces
- Mark Nauwelaerts, Cartesian closed hull for (quasi-)metric spaces (revisited)
- M. Sioen, Symmetric monoidal closed structures in $\mathrm{\mathit{P}\mathit{R}\mathit{A}\mathit{P}}$

## NotesEmbed ?

topTo embed these notes on your page include the following JavaScript code on your page where you want the notes to appear.