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0 pointsthrowawaymath6y ago0 comments

A metric is a distance function. Defining a metric on a space is one of ways you create a topology.

I'm not sure what the parent means by the metric being the identity function, however. The Euclidean metric is basically the hypotenuse of a triangle parameterized by two vectors. The adjacent and opposite sides of the triangle are measured to be the Euclidean norm of each vector (their length), and the hypotenuse is the shortest distance between them.

The Euclidean metric is not the only metric - you can define distance however you'd like as long as it's consistent. But I'm not sure how the identity function works as a metric, because that would map a vector to another vector, not a scalar.

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andrewla6y ago

In differential geometry the metric [1] is a tensor that defines the relationship of vectors in the space to vectors in the tangent space. The identity function as a metric means that you are in a locally flat space where geodesics (the path taken by traveling in a given direction) are straight lines.

A metric in a traditional metric space is a global distance function; you can use the metric tensor in a Riemannian manifold to allow integration to find the distance between two points.

[1] https://en.wikipedia.org/wiki/Metric_tensor

throwawaymathOP6y ago

Ah, so that's the setting we're talking about. Thanks for explaining that.

joppy6y ago

The metric in a vector space is a dot product. If you just have one vector space, it’s not that interesting then, but if you have many vector spaces all glued together (like a tangent space to a curved surface), then looking at how the dot product varies between nearby tangent spaces tells you a lot about the surface (Gaussian curvature and so on).

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