Find a 2-connected planar graph whose drawings are all topologically isomorphic, but whose planar embeddings are not all equivalent.
I think $K_{2,3}$ might be an example, but I'm not sure how to show this at all. Anything would be welcome.
Find a 2-connected planar graph whose drawings are all topologically isomorphic, but whose planar embeddings are not all equivalent.
I think $K_{2,3}$ might be an example, but I'm not sure how to show this at all. Anything would be welcome.