“parameters, variation of”的意思、由来-百科全书

parameters, variation of

mathematics

general method for finding a particular solution of a differential equation by replacing the constants in the solution of a related (homogeneous) equation by functions and determining these functions so that the original differential equation will be satisfied.

To illustrate the method, suppose it is desired to find a particular solution of the equation

y″+p(x)y′+q(x)y=g(x).

To use this method, it is necessary first to know the general solution of the corresponding homogeneous equation—i.e., the related equation in which the right-hand side is zero. If y₁(x) and y₂(x) are two distinct solutions of the equation, then any combination

ay₁(x)+by₂(x)

will also be a solution, called the general solution, for any constants a and b.

The variation of parameters consists of replacing the constants a and b by functions u₁(x) and u₂(x) and determining what these functions must be to satisfy the original nonhomogeneous equation. After some manipulations, it can be shown that if the functions u₁(x) and u₂(x) satisfy the equations

u′₁y₁+u′₂y₂=0

and

u₁′y₁′+u₂′y₂′=g,

then

u₁y₁+u₂y₂

will satisfy the original differential equation. These last two equations can be solved to give

u₁′=−y₂g/(y₁y₂′−y₁′y₂)

and

u₂′=y₁g/(y₁y₂′−y₁′y₂).

These last equations either will determine u₁ and u₂ or else will serve as a starting point for finding an approximate solution.

词条	parameters, variation of
释义	parameters, variation of mathematics general method for finding a particular solution of a differential equation by replacing the constants in the solution of a related (homogeneous) equation by functions and determining these functions so that the original differential equation will be satisfied. To illustrate the method, suppose it is desired to find a particular solution of the equation y″+p(x)y′+q(x)y=g(x). To use this method, it is necessary first to know the general solution of the corresponding homogeneous equation—i.e., the related equation in which the right-hand side is zero. If y₁(x) and y₂(x) are two distinct solutions of the equation, then any combination ay₁(x)+by₂(x) will also be a solution, called the general solution, for any constants a and b. The variation of parameters consists of replacing the constants a and b by functions u₁(x) and u₂(x) and determining what these functions must be to satisfy the original nonhomogeneous equation. After some manipulations, it can be shown that if the functions u₁(x) and u₂(x) satisfy the equations u′₁y₁+u′₂y₂=0 and u₁′y₁′+u₂′y₂′=g, then u₁y₁+u₂y₂ will satisfy the original differential equation. These last two equations can be solved to give u₁′=−y₂g/(y₁y₂′−y₁′y₂) and u₂′=y₁g/(y₁y₂′−y₁′y₂). These last equations either will determine u₁ and u₂ or else will serve as a starting point for finding an approximate solution.
随便看	Agnes Nestor Agnes of Poitou Agnes, Saint Agnes Scott College Agnes Smedley Agnes Surriage Frankland, Lady Agnes Surriage, Lady Frankland Agnew, Spiro T. Agni Agnihotri, Shiv Narayan Agnolo Gaddi Agnon, S.Y. agnosticism Agnostus Agnus Dei Agnès Sorel Agnès Varda Agobard, Saint agon agonism agora Agoracritus Agostinho Neto Agostino Agazzari Agostino Bassi