Reverse mathematics and semisimple rings

Archive for Mathematical Logic 61 (5):769-793 (2022)
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Abstract

This paper studies various equivalent characterizations of left semisimple rings from the standpoint of reverse mathematics. We first show that \ is equivalent to the statement that any left module over a left semisimple ring is semisimple over \. We then study characterizations of left semisimple rings in terms of projective modules as well as injective modules, and obtain the following results: \ is equivalent to the statement that any left module over a left semisimple ring is projective over \; \ is equivalent to the statement that any left module over a left semisimple ring is injective over \; \ proves the statement that if every cyclic left R-module is projective, then R is a left semisimple ring; \ proves the statement that if every cyclic left R-module is injective, then R is a left semisimple ring.

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10.1007/s00153-021-00812-4

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References found in this work

Subsystems of Second Order Arithmetic.Stephen G. Simpson - 1999 - Studia Logica 77 (1):129-129.
The Complexity of Radicals and Socles of Modules.Huishan Wu - 2020 - Notre Dame Journal of Formal Logic 61 (1):141-153.
Reverse Mathematics and Fully Ordered Groups.Reed Solomon - 1998 - Notre Dame Journal of Formal Logic 39 (2):157-189.
Ring structure theorems and arithmetic comprehension.Huishan Wu - 2020 - Archive for Mathematical Logic 60 (1-2):145-160.
Countable algebra and set existence axioms.Harvey M. Friedman - 1983 - Annals of Pure and Applied Logic 25 (2):141.

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