scientific article
From MaRDI portal
Publication:4040821
zbMath0657.01002MaRDI QIDQ4040821
Publication date: 5 June 1993
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
spherical geometrynon-Euclidean geometryalgebraspacesundialsBrahmaguptaLobachevskian geometrymultidimensional spacesGroups of transformationsfifth postulatecurvature of spaceGeometric transformationsTheory of parallels
Related Items (44)
Searches for the origins of the epistemological concept of model in mathematics ⋮ Book review of: A. Papadoupoulos and G. Théret, La théorie des lignes paralléles de Johann Heinrich Lambert; G. Saccheri, Euclid vindicated from every blemish. Edited by V. de Risi ⋮ Why Euclid's geometry brooked no doubt: J. H. Lambert on certainty and the existence of models ⋮ Operationalism: an interpretation of the philosophy of ancient Greek geometry ⋮ Charles Peirce and Bertrand Russell on Euclid ⋮ Os tratados de George Salmon no contexto da matemática britânica no século XIX: De uma abordagem sintética para uma abordagem analítica ⋮ On models for visualizing four-dimensional figures ⋮ Mathematics and her sisters in Medieval Islam: A selective review of work done from 1985 to 1995 ⋮ A few comments on the Clifford algebra \(C\ell_2\) of the standard Euclidean plane ⋮ Dynamical systems of operators induced by scaled hypercomplex rings ⋮ P. Tannery : le lien entre les mathématiques et la $Revue$ $Philosophique$ ⋮ Certain invertible operator-block matrices induced by \(C^*\)-algebras and scaled hypercomplex numbers ⋮ Non-euclidean geometries: the Cayley-Klein approach ⋮ Spectral analysis of equations over quaternions ⋮ Regular functions on the scaled hypercomplex numbers ⋮ Geometry of two-dimensional surfaces in space \(^2\mathbb{R}_5 \) ⋮ Alicia Boole Stott, a geometer in higher dimension ⋮ Operators induced by certain hypercomplex systems ⋮ Lie–Hamilton systems on curved spaces: a geometrical approach ⋮ Geometry-preserving numerical methods for physical systems with finite-dimensional Lie algebras ⋮ Counting Polygons and Fishes in Uniform Tessellations of the Hyperbolic Plane ⋮ Free probability on Banach algebras induced by scaled hypercomplex numbers ⋮ Scattering study of fermions due to double Dirac delta potential in quaternionic relativistic quantum mechanics ⋮ What did Gauss read in the appendix? ⋮ The mathematical and astronomical manuscript in the collection of the Institute of Oriental Studies of the Academy of Sciences of Uzbekistan at Tashkent ⋮ The Foundations of Geometry by Peano’s School and Some Epistemological Considerations ⋮ On the Neuber theory of micropolar elasticity. A pseudotensor formulation ⋮ Bisecting Horn Angles ⋮ Lie symmetries for Lie systems: applications to systems of ODEs and PDEs ⋮ Farkas and János Bolyai ⋮ Einstein's velocity addition law and its hyperbolic geometry ⋮ Einstein's special relativity: Unleashing the power of its hyperbolic geometry ⋮ Quintessence and phantom emerging from the split-complex field and the split-quaternion field ⋮ Euclidean geometry and physical space ⋮ The Poincaré metric and isoperimetric inequalities for hyperbolic polygons ⋮ On a micropolar theory of growing solids ⋮ Gauss as Scientific Mediator Between Mathematics and Geodesy from the Past to the Present ⋮ Правило множителей в ковариантных формулировках микрополярных теорий механики континуума ⋮ Multi-variable quaternionic spectral analysis ⋮ The independence of the parallel postulate and development of rigorous consistency proofs ⋮ De Donder-Weyl theory and a hypercomplex extension of quantum mechanics to field theory ⋮ Split-quaternions and the Dirac equation ⋮ Clifford algebraic approach to the de Donder-Weyl Hamiltonian theory ⋮ An efficient method for solving equations in generalized quaternion and octonion algebras
Cites Work
This page was built for publication:
