Titlebook: Refinement Monoids, Equidecomposability Types, and Boolean Inverse Semigroups; Friedrich Wehrung Book 2017 Springer International Publishi

CUB

Refinement Monoids, Equidecomposability Types, and Boolean Inverse Semigroups978-3-319-61599-8Series ISSN 0075-8434 Series E-ISSN 1617-9692

ablate

Partial Commutative Monoids,l commutative monoid, which works then as the “enveloping monoid of .”. Although this process has been mostly studied in case . satisfies the refinement axiom (this originates in Tarski [109]), the initial part of the work does not require that axiom.

不感興趣

Type Monoids and V-Measures, action. The latter concept has been studied in a wide array of works including Banach [17], Tarski [109]. Its relation with type monoids of Boolean inverse semigroups was recognized in Wallis’ Ph.D. thesis [116], see also Kudryavtseva et al. [71], Lawson and Scott [77].

脫離

Constructions Involving Involutary Semirings and Rings,-automorphism (we will talk about .), semirings will enjoy quite a fruitful interaction with Boolean inverse semigroups, the basic idea being to have the multiplications agree and the inversion map correspond to the involution.

迅速成長

Background,Generally speaking, this book deals with arithmetical systems that arise naturally as invariants of various mathematical structures.

釋放

micturition

CAJ

Arbitrary

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