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Book Categories |
1 | Ordered sets and ordered groups | 1 |
2 | Ordered fields | 37 |
3 | Completions of ordered groups and fields | 59 |
4 | Algebras of continuous functions | 69 |
5 | Normability and universality | 108 |
6 | The operational calculus and the field [actual symbol not reproducible] | 127 |
7 | Examples | 144 |
8 | Non-standard structures for super-real fields and the gap theorem | 158 |
9 | [actual symbol not reproducible] as a hyper-real field | 203 |
10 | Models and weak Cauchy completeness | 249 |
11 | Rigid fields and solid structures | 278 |
12 | Open questions | 339 |
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Add Super-Real Fields: Totally Ordered Fields with Additional Structure, Super-fields are a class of totally ordered fields that are larger than the real line. They arise from quotients of the algebra of continuous functions on a compact space by a prime ideal, and generalize the well-known class of ultrapowers, and indeed the, Super-Real Fields: Totally Ordered Fields with Additional Structure to the inventory that you are selling on WonderClubX
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Add Super-Real Fields: Totally Ordered Fields with Additional Structure, Super-fields are a class of totally ordered fields that are larger than the real line. They arise from quotients of the algebra of continuous functions on a compact space by a prime ideal, and generalize the well-known class of ultrapowers, and indeed the, Super-Real Fields: Totally Ordered Fields with Additional Structure to your collection on WonderClub |