If we say our connection is torsion free, then the metric compatibility condition completely determines it. While this is geometrically intuitive way to do it, are there other interesting tensor fields which we can put on a manifold whom when we impose a compatibility condition with the connection that we uniquely get the connection?
2026-03-30 17:02:47.1774890167
Are there tensor structures other than a metric which could be defined on a manifold which imply a connection through compatibility criterion?
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