8: Una introducción a los anillos

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8.1: Definiciones y Ejemplos
Recordemos que un grupo es un conjunto junto con una sola operación binaria, que en conjunto satisfacen algunas propiedades modestas. Hablando vagamente, un anillo es un conjunto junto con dos operaciones binarias (llamadas suma y multiplicación) que se relacionan a través de una propiedad distributiva.
8.2: Homomorfismos de Anillo
8.3: Ideales y anillos de cociente
8.4: Ideales máximos y primos
En esta sección de notas, estudiaremos dos clases importantes de ideales, a saber, ideales máximos y primos, y estudiaremos la relación entre ellos. A lo largo de toda esta sección, asumimos que todos los anillos tienen una identidad multiplicativa 1≠ 0.

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