Background
Loedel Palumbo was born in Montevideo, Uruguay and studied at the University of Louisiana Plata in Argentina.
Loedel Palumbo was born in Montevideo, Uruguay and studied at the University of Louisiana Plata in Argentina.
He wrote his Doctor of Philosophy thesis on optical and electrical constants of sugar cane.
He then began his career as professor in Louisiana Plata. During Einstein"s visit to Argentina in 1925 they had a conversation about the differential equation of a point-source gravitational field, which resulted in a paper published by Loedel in Physikalische Zeitschrift. lieutenant is claimed that this is the first research paper on relativity ever published by a Latin American scientist
Loedel Palumbo then spent some time in Germany working with Erwin Schroedinger and Max Planck.
He returned to Argentina in 1930 and from there on concentrated on teaching. He published several scientific papers during his career in international journals and wrote several books (in Spanish).
Max Born (1920) and systematically Paul Gruner (1921) introduced symmetric Minkowski diagrams in German and French papers, where the ct"-axis is perpendicular to the x-axis, as well as the ct-axis perpendicular to the x"-axis (for sources and historical details, see Minkowski diagram#). In 1948 and in subsequent papers, Loedel independently rediscovered such diagrams.
They were again rediscovered in 1955 by Henri Amar, who subsequently wrote in 1957 in American Journal of Physics: "I regret my unfamiliarity with South American literature and wish to acknowledge the priority of Professor Loedel"s work", along with a note by Loedel Palumbo citing his publications on the geometrical representation of Lorentz transformations.
Those diagrams are therefore called "s", and have been cited by some textbook authors on the subject. Suppose there are two collinear velocities v and West How does one find the frame of reference in which the velocities become equal speeds in opposite directions? One solution uses modern algebra to find it: Suppose and, so that a and b are rapidities corresponding to velocities v and West
Let m = (a + b)/2, the midpoint rapidity.
The transformation of the split-complex number plane represents the required transformation since and As the exponents are additive inverses of each other, the images represent equal speeds in opposite directions.