Show 'a' is Irreducible: If R a Max Ideal in R

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In summary, the conversation discusses the relationship between commutative rings, maximal ideals, and irreducible elements. It suggests that if a principal ideal in a commutative ring is a maximal ideal, then the element generating it must be irreducible. The conversation also explores the definition of a prime element and how it relates to prime ideals in commutative rings.
  • #1
mansi
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Here’s an interesting question…
Let R be a commutative ring and ‘a’ an element in R. If the principal ideal Ra is a maximal ideal of R then show that ‘a’ is an irreducible element.
If a is prime, this is pretty obvious…if a is not prime, then we say a= bc for some b,c in R. Now we need to show that either of them is a unit. I can’t imagine how… :frown:
 
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  • #2
If a is reducible, try finding a bigger ideal than (a). Maximal ideals are always prime ideals!
 
  • #3
the usual definition of a prime element in a commutative ring with identity, is that it generates a prime ideal.
 

1. What does it mean for a show to be irreducible?

A show is considered irreducible if it cannot be broken down into smaller components, meaning it is not a composite of two or more smaller shows.

2. Why is it important for a show to be irreducible?

Irreducible shows are important because they represent the most fundamental components of a larger show. They cannot be simplified or reduced any further, making them essential building blocks in understanding complex concepts.

3. What is a maximal ideal in relation to an irreducible show?

A maximal ideal is a subset of a show in which there is no larger ideal that properly contains it. In other words, it is the largest possible ideal in a given show. In the context of an irreducible show, a maximal ideal would be a subset of the show that cannot be further reduced or broken down.

4. How do you prove that a show is irreducible if it has a maximal ideal?

To prove that a show is irreducible if it has a maximal ideal, you would need to show that there are no smaller components or factors that make up the show. This can be done through various mathematical techniques, such as using theorems and proofs.

5. Can a show be both irreducible and have a maximal ideal?

Yes, a show can be both irreducible and have a maximal ideal. In fact, having a maximal ideal is often a defining characteristic of an irreducible show.

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