In this paper equations in R³ which are illustrations of “linear” ellipses, i.e. ellipses which tend to become segments of a geodesic of R², because their eccentricities tend to unit () will be found. During a linearization process of ellipses, varying vectors will be mapped, from which ellipses and their relations in R² , to varying vector fields and their relations in R³ are defined. These vector fields and their relations in R³ are called “holographic”. At the limit , the holographic relationships are formalistically similar to Maxwell's equations. This is a theoretical derivation of Maxwell’s equations and not a systematic classification of experimental data as Maxwell did.

Constantinos Krikos, An allegory, a myth and the foundations of physical theories, Amazon 2017

Alexia E. Schulz and William C. Schulz, A Practical Introduction to Differential Forms (Transgalactic Publishing Company Flagstaff, Vienna, Cosmopolis, August 12, 2013)