A differential geometric approach for the numerical solution of mixed differential algebraic systems of equations is presented and a general local parametrization for such systems is constructed multistep ode solvers are then applied for obtaining locally a numerical approximation to the solution of the differential algebraic system. In mathematics a differential algebraic system of equations daes is a system of equations that either contains differential equations and algebraic equations or is equivalent to such a system such systems occur as the general form of systems of differential equations for vector valued functions x in one independent variable t . A differential geometric approach for the numerical solution of mixed differential algebraic systems of equations is presented and a general local parametrization for such systems is constructed. Answers to differential equations problems solve odes linear nonlinear ordinary and numerical differential equations bessel functions spheroidal functions algebra geometry plotting graphics mathematics including solving odes finding an ode a function satisfies and solving an ode using a slew of numerical methods. The geometry of power exponents includes the newton polyhedron normal cones of its faces power and logarithmic transformations on the basis of the geometry universal algorithms for simplifications of systems of nonlinear equations algebraic ordinary differential and partial differential were developed
How it works:
1. Register a Free 1 month Trial Account.
2. Download as many books as you like ( Personal use )
3. No Commitment. Cancel anytime.
4. Join Over 100.000 Happy Readers.
5. That's it. What you waiting for? Sign Up and Get Your Books.