Answer to Question #217017 in Differential Geometry | Topology for Prathibha Rose

Solution:

The following metrics on "\\mathbb{R}^{2}" are not equivalent to one another: the Euclidean metric d, the hub metric "\\varrho_{h}" , and the discrete metric "\\varrho_{\\text {disc }}". These are defined as follows:

The euclidean metric on "\\mathbb{R}^{2}" is defined by

"d(\\underline{x}, \\underline{y})=\\sqrt{\\left(x_{1}-y_{1}\\right)^{2}+\\left(x_{2}-y_{2}\\right)^{2}},"

where "\\underline{x}=\\left(x_{1}, x_{2}\\right)" and "\\underline{y}=\\left(y_{1}, y_{2}\\right)" . 

Let "X=\\mathbb{R}^{2}" . For "x=\\left(x_{1}, x_{2}\\right), y=\\left(y_{1},y_{2}\\right)" define "\\varrho_{h}(x, y)" as follows. If x=y then "\\varrho_{h}(x, y)=0" . If "x\\ne y" then

"\\varrho_{h}(x, y)=\\sqrt{x_{1}^{2}+x_{2}^{2}}+\\sqrt{y_{1}^{2}+y_{2}^{2}}"

The metric "\\varrho_{h}" is called the hub metric on "\\mathbb{R}^{2}" .

The discrete metric on an arbitrary set X is defined by

"d(x, y)=\\left\\{\\begin{array}{lll}\n\n0 & \\text { if } & x=y \\\\\n\n1 & \\text { if } & x \\neq y\n\n\\end{array}\\right."

Every metric defines open balls, but even if metrics are equivalent their open balls may look very differently (compare e.g. open balls in "\\mathbb{R}^{2}" taken with respect to d and "\\left.\\varrho_{\\text {ort }}\\right)" . It turns out, however, that each metric defines also a collection of so-called open sets, and that open sets defined by two metrics are the same precisely when these metrics are equivalent.