Strict Topological Extensions and Power-objects for b-convergence
| AUTHOR | Leseberg Dieter |
| PUBLISHER | LAP Lambert Academic Publishing (03/31/2015) |
| PRODUCT TYPE | Paperback (Paperback) |
Description
We consider antiform b-convergence as a common generalization of preuniform convergence, well-known point-convergences and suitable set-convergences as well. The corresponding defined category ab-CONV is a topological construct which is cartesian closed. Then the above mentioned categories can be nicely embedded into ab-CONV. Moreover, we will establish a one-to-one correspondence between some b-convergence and the related symmetric strict topological extension.
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Product Details
ISBN-13:
9783659512056
ISBN-10:
3659512052
Binding:
Paperback or Softback (Trade Paperback (Us))
Content Language:
English
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Page Count:
52
Carton Quantity:
136
Product Dimensions:
6.00 x 0.12 x 9.00 inches
Weight:
0.20 pound(s)
Country of Origin:
US
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BISAC Categories
Mathematics | General
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We consider antiform b-convergence as a common generalization of preuniform convergence, well-known point-convergences and suitable set-convergences as well. The corresponding defined category ab-CONV is a topological construct which is cartesian closed. Then the above mentioned categories can be nicely embedded into ab-CONV. Moreover, we will establish a one-to-one correspondence between some b-convergence and the related symmetric strict topological extension.
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