2024-04-28 00:48:03 +0200 | received badge | ● Popular Question (source) |
2024-01-05 18:56:50 +0200 | marked best answer | How can I manipulate Clifford Algebra elements symbolically? Problem Sometimes I would like to run functions from the Expression class on a Clifford algebra element. For example, simplification: I receive the error: The behavior I would like is to treat e1, e2, and e3 as symbols. But SR(e1) throws Why I think this should work An analogous addition of structure preserves simplification operations, namely with vectors: Current Workaround My current workaround is to extract the coefficients, map them with the operations in question, and then recreate the Clifford algebra term. Question Is there a more elegant or canonical way to do this? |
2024-01-05 18:56:50 +0200 | received badge | ● Scholar (source) |
2024-01-04 05:27:00 +0200 | commented answer | How can I manipulate Clifford Algebra elements symbolically? Thank you for the response! This does indeed address my workaround of having to write the lift function. But I really wo |
2024-01-04 05:26:40 +0200 | commented answer | How can I manipulate Clifford Algebra elements symbolically? Thank you for the response! This does indeed address my workaround of having to write the lift function. But I really wo |
2024-01-04 05:25:57 +0200 | received badge | ● Supporter (source) |
2023-12-31 21:57:02 +0200 | asked a question | How can I manipulate Clifford Algebra elements symbolically? How can I manipulate Clifford Algebra elements symbolically? Problem Sometimes I would like to run functions from the E |
2023-12-20 09:59:43 +0200 | received badge | ● Student (source) |
2023-12-17 22:26:00 +0200 | commented question | Why is addition between a symbol and a Clifford algebra element unsupported? Great, thank you |
2023-12-15 23:14:36 +0200 | asked a question | Why is addition between a symbol and a Clifford algebra element unsupported? Why is addition between a symbol and a Clifford algebra element unsupported? To reproduce error: from sage.algebras.cli |