Functions homo/isomorphic to change in scale

LogicalTime · May 28, 2010

I would like to find out which functions retain the same structure when they are scaled. Particularly I am interested in projections.

For example, a parabola 3d space viewed at another angle can still be represented by at^2 + bt+c. A circle however can not (ellipse)

I am guessing conic sections have this property? Are there any other functions that have this property, and what terms are associated with this property?

Bacle · May 28, 2010

I think it would help looking at projective surfaces, with homogeneous coordinates.

HallsofIvy · May 29, 2010

LogicalTime said:

I would like to find out which functions retain the same structure when they are scaled. Particularly I am interested in projections.

For example, a parabola 3d space viewed at another angle can still be represented by at^2 + bt+c. A circle however can not (ellipse)

I am guessing conic sections have this property? Are there any other functions that have this property, and what terms are associated with this property?

Have what property? You assert that a parabola, projected onto any plane, is still a parabola (which is not quite true- it can project to a ray) while that is not true for a circle. But parabola and circle are both conic sections.

Functions homo/isomorphic to change in scale

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