Categories Ask Mathematics Involution in a commutative unital real C* algebra Post author By Math Dev Post date March 31, 2020 No Comments on Involution in a commutative unital real C* algebra It follows immediately from Gelfand duality that the involution in a commutative unital real C* algebra is the identity. Is there a direct proof from the axioms of C* algebras? Tags It follows immediately from Gelfand duality that the involution in a commutative unital real C* algebra is the identity. Is there a direct pr ← How to highlight Sudoku box where the element is selected? → Is this sequence $x_n=(1-\frac12)^{(\frac12-\frac13)^{…^{(\frac{1}{n}-\frac{1}{n+1})}}}$ uniformly distributed modulo 1? Leave a Reply Cancel replyYour email address will not be published. Required fields are marked *Comment Name * Email * Website Save my name, email, and website in this browser for the next time I comment. {{#message}}{{{message}}}{{/message}}{{^message}}Your submission failed. The server responded with {{status_text}} (code {{status_code}}). Please contact the developer of this form processor to improve this message. Learn More{{/message}}{{#message}}{{{message}}}{{/message}}{{^message}}It appears your submission was successful. Even though the server responded OK, it is possible the submission was not processed. Please contact the developer of this form processor to improve this message. Learn More{{/message}}Submitting…