The Derivation Algebras of Some Leibniz Algebras and Their Properties;
All of their contributions were crowned by the achievements of Newton and Leibniz.
In as early as the 17th century, Leibniz took interest in and carefully studied the Chinese culture and became a forerunner of cultural exchanges between China and Germany.
Realizations and Properties of Some Leibniz Algebras
L-operators and Lb-equation on Leibniz Algebras
Leibniz was an inventor of the calculus and a forefather of modern mathematical logic.
Theodicy is the term coined by the eighteenth-century philosopher Leibniz, and he applied this term theodicy to just that kind of philosophical sentiment that's implied by its etymology.
Analysis about Some Related Property of Low Dimentional Leibniz Algebras;
Example and graphical representation of orbits of dynamical systems on Leibniz algebroids
Some Research on Complete Leibniz Algebras
Leibniz was isolated and he railed against the teachings of the universities.
Newton-Leibniz Theory of Multi-variables;
For Leibniz, a Monad is part of a fundamental multiplicity and each one, within its heart, carries all the information of the universe in a single, stable form.
In mathematics, Newton established "the Newton binomial theorem", and nearly simultaneously established the calculus study with Leibniz.
Steinberg Leibniz Algebras;
The Relationship Between Differential Mean Value Theorem and Newton-Leibniz Formula and Its Verification;
Hom-Leibniz Central Extension on the q-Deformed Witt Algebra