- In mathematics, the
Wronskian of n
differentiable functions is the
determinant formed with the
functions and
their derivatives up to
order n – 1. It was...
- Abel's
differential equation identity) is an
equation that
expresses the
Wronskian of two
solutions of a
homogeneous second-order
linear ordinary differential...
- of
infinite series. The
coefficients in Wroński's new
series form the
Wronskian, a
determinant Thomas Muir
named in 1882. As an inventor, he is credited...
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Initial conditions Boundary values Dirichlet Neumann Robin Cauchy problem Wronskian Phase portrait Lyapunov / Asymptotic /
Exponential stability Rate of convergence...
-
Initial conditions Boundary values Dirichlet Neumann Robin Cauchy problem Wronskian Phase portrait Lyapunov / Asymptotic /
Exponential stability Rate of convergence...
- In
scattering theory, the Jost
function is the
Wronskian of the
regular solution and the (irregular) Jost
solution to the
differential equation − ψ ″...
- {W_{i}(x)}{W(x)}},\,\quad i=1,\ldots ,n}
where W ( x ) {\displaystyle W(x)} is the
Wronskian determinant of the
basis y 1 ( x ) , … , y n ( x ) {\displaystyle y_{1}(x)...
-
Initial conditions Boundary values Dirichlet Neumann Robin Cauchy problem Wronskian Phase portrait Lyapunov / Asymptotic /
Exponential stability Rate of convergence...
-
other independent solution U of the
linear ODE has
constant non-zero
Wronskian U ′ u − U u ′ {\displaystyle U'u-Uu'}
which can be
taken to be C after...
-
Initial conditions Boundary values Dirichlet Neumann Robin Cauchy problem Wronskian Phase portrait Lyapunov / Asymptotic /
Exponential stability Rate of convergence...