Notation of ideals in ring theory

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    Notation Ring Theory
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SUMMARY

The discussion centers on the notation of ideals in ring theory, specifically in Principal Ideal Domains (PIDs). The notation is defined as the ideal generated by elements a and b, which consists of all linear combinations of a and b, expressed as = {as + bt | s, t are in R}. The user initially found the notation confusing but ultimately clarified that represents an ideal for any elements a and b in a PID. The user also conjectured properties of the greatest common divisor (gcd) in relation to ideals.

PREREQUISITES
  • Understanding of Principal Ideal Domains (PIDs)
  • Familiarity with the concept of ideals in ring theory
  • Knowledge of linear combinations in algebra
  • Basic grasp of greatest common divisors (gcd) in the context of rings
NEXT STEPS
  • Study the properties of ideals in Principal Ideal Domains (PIDs)
  • Learn about the structure and examples of linear combinations in ring theory
  • Explore the relationship between gcd and ideals in algebraic structures
  • Investigate additional resources on ring theory notation and definitions
USEFUL FOR

Mathematics students, particularly those studying abstract algebra, ring theorists, and anyone looking to deepen their understanding of ideals in Principal Ideal Domains.

erraticimpulse
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So right now I'm trying to solve this problem in ring theory for homework. The question pertains to proving that in a PID, D, if a,b are elements of D then the gcd of a and b can be written as a linear combination. In any event I know where I have to go but I'm stuck on this one bit of notation.

<a,b> = <d>.

I've never seen notation for an ideal like that with 2 elements separated by a comma. I'd appreciate any insight into this.

Oh and here's the site from wolfram where I originally discovered it:
http://mathworld.wolfram.com/PrincipalIdealDomain.html
 
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<a,b> is any linear combination of a and b.

That is, <a,b>={as+bt|s,t are in R}
 
Thanks man. You rock my socks!
 
Okay well, it turned out that the idea from wolfram was more confusing than helpful. There's a scarce amount of information in my text and notes on PID's. The only conjectures that I feel safe in making: if given gcd(a,b)=d then gcd(a,d)=d and gcd(b,d)=d. Not sure how helpful those are though. I think what I'm most confused about is Wolfram's assertion that <a,b> is an ideal for any a,b. I can't verify this anywhere.
 
Nevermind, I figured it out. Thanks for the insight Ziox!
 

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