Every finitely generated ideal of a Leavitt path algebra is a principal ideal
Abstract
Let E be an arbitrary graph and K be any field. For every non-graded ideal I of the Leavitt path algebra LK(E), we give an explicit description of the generators of I. Using this, we show that every finitely generated ideal of LK(E) must be principal. In particular, if E is a finite graph, then every ideal of LK(E) must be principal ideal.
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