Found 11 relevant results in 1.02s where lecturer="Menny Akka Ginosar"
Introduction to the mathematical foundations of engineering sciences, as far as concerning differential and integral calculus.
Introduction to the mathematical foundations of engineering sciences, as far as concerning differential and integral calculus.
We will model and solve scientific problems with partial differential equations. Differential equations which are important in applications will be classified and solved. Elliptic, parabolic and hyperbolic differential equations will be treated. The following mathematical tools will be introduced: Laplace and Fourier transforms, Fourier series, separation of variables, methods of characteristics.
Introductory seminar about rational quadratic forms. P-adic numbers, Hasse's local to global principle and the finiteness of the genus will be discussed.
Dynamical systems is an exciting and very active field in pure (and applied) mathematics, that involves tools and techniques from many areas such as analysis, geometry and number theory. This introductory course will focus on discrete time dynamical systems, which can be obtained by iterating a function.
Introduction to Linear Algebra
Linear Algebra
Lineare Algebra
Introduction to Linear Algebra
Linear Algebra I
Lineare Algebra I
Introduction to the theory of vector spaces for students of mathematics or physics: Basics, vector spaces, linear transformations, solutions of systems of equations, matrices, determinants, endomorphisms, eigenvalues, eigenvectors.
Linear Algebra II
Lineare Algebra II
Eigenvalues and eigenvectors, Jordan normal form, bilinear forms, euclidean and unitary vector spaces, spectral theorem, multilinear algebra, tensor product
Introduction to (algebraic) number theory via representing integers as sum of squares.
No description available.