First, what is it called?
What I make is Euclidean cutter type more dimensional graphics. Others have made a fit in type more dimensional graphics. The difference is in projection. In cutter type more dimensional graphics, it is a straight line from the point to a view at point through the view plane and if it is inside the view plane exactly then it is viewed, otherwise it is cut out of view. Fit in type more dimensional graphics is like project the entire space down into a lower dimension and continue until you have projected to your two dimensional screen, it is a mathematical process. Euclidean graphics have straight lines be straight and dimensions be perpendicular to each other, all of them.
Hyperboloid graphics is in a space represented by rotation of a hyperbola around an axis and takes one more Euclidean dimension to represent than it is itself. This is commonly called hyperbolic graphics but there may be other ways to represent spaces using hyperbolas.
Spherical space is represented by a circle in one dimension, a sphere in two dimensions, and a four dimensional Euclidean rotation of a sphere in three spherical dimensions. All points are a uniform distance from a center in Euclidean. My proposed power of this would make it coordinate part in Euclidean as would be to a power and with origin sign.
Warps are when one point or set of points correspond to another point or set of points where they would not normally. Warps can also have properties such as which way is relative forward or sideways or a combination.
Our possibly three dimensional Euclidean space can be better utilized and understood with these weird space graphics maths. You can move in a square and actually move back to a rotated position and end up exploring four or more squares in a square room with no extra space and all the imagination. Some theories of how this space we live in exists and functions suppose different space than three Euclidean dimensions. Who knows and who will find out? As a plus, it is fun.