Tallenna
Semidistributive Modules and Rings
A module M is called distributive if the lattice Lat(M) of all its submodules is distributive, i.e., Fn(G + H) = FnG + FnH for all submodules F,G, and H of the module M. all valuation rings in division rings and all commutative Dedekind rings (e.g., rings of integral algebraic numbers or commutative principal ideal rings) are distributive.
- Kirjailija
- A.A. Tuganbaev
- Painos
- Softcover reprint of the original 1st ed. 1998
- ISBN
- 9789401061360
- Kieli
- englanti
- Paino
- 310 grammaa
- Julkaisupäivä
- 15.10.2012
- Kustantaja
- Springer
- Sivumäärä
- 357
