26:[["$","$L45",null,{"lang":"en","title":"Connected ring","data":[{"id":"Examples_and_non-examples","text":"Examples and non-examples","level":1},{"id":"Generalizations","text":"Generalizations","level":1},{"id":"References","text":"References","level":1}]}],["$","article",null,{"style":{"gridArea":"content","container":"content / inline-size","marginTop":"1em"},"children":[["$","div","enwikipediaConnected ring",{"id":"ww-content","dir":"ltr","children":[[["$","$1","0",{"children":[["$undefined",["$","section",null,{"className":"section_wrapper__8dcj4 top-section intro","data-mw-section-id":"0","children":[["$","span",null,{"children":[false,["$","span",null,{"className":"w-content mw-parser-output","dangerouslySetInnerHTML":{"__html":"$46"}}],["$","$L47",null,{"lang":"en","dict":"$5:props:children:0:props:dict","title":"Connected ring","sectionId":"0"}]]}],false]}]],false]}],["$","$1","1",{"children":[["$L48",["$","section",null,{"className":"section_wrapper__8dcj4 top-section","data-mw-section-id":"1","children":[["$","span",null,{"children":[false,["$","span",null,{"className":"w-content mw-parser-output","dangerouslySetInnerHTML":{"__html":"\n

Connectedness defines a fairly general class of commutative rings. For example, all local rings and all (meet-)irreducible rings are connected. In particular, all integral domains are connected. Non-examples are given by product rings such as Z × Z; here the element (1, 0) is a non-trivial idempotent.

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In algebraic geometry, connectedness is generalized to the concept of a connected scheme.

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