Integro-differential equation

Navier–Stokes differential equations used to simulate airflow around an obstruction.

Scope

Natural sciences Engineering
Astronomy Physics Chemistry Biology Geology
Applied mathematics
Continuum mechanics Chaos theory Dynamical systems
Social sciences
Economics Population dynamics

Classification

Types

By variable type
Ordinary Partial Differential-algebraic Integro-differential Fractional Linear Non-linear
Dependent and independent variables Autonomous Complex Coupled / Decoupled Exact Homogeneous / Nonhomogeneous
Features
Order Operator Notation

Relation to processes

Difference (discrete analogue)

Solution

General topics

Lyapunov / Asymptotic / Exponential stability
Rate of convergence
Series / Integral solutions

Solution methods

People

In mathematics, an integro-differential equation is an equation that involves both integrals and derivatives of a function.

General first order linear equations

The general first-order, linear (only with respect to the term involving derivative) integro-differential equation is of the form

{\frac {d}{dx}}u(x)+\int _{{x_{0}}}^{x}f(t,u(t))\,dt=g(x,u(x)),\qquad u(x_{0})=u_{0},\qquad x_{0}\geq 0.

As is typical with differential equations, obtaining a closed-form solution can often be difficult. In the relatively few cases where a solution can be found, it is often by some kind of integral transform, where the problem is first transformed into an algebraic setting. In such situations, the solution of the problem may be derived by applying the inverse transform to the solution of this algebraic equation.

Example

Consider the following first-order problem,

u'(x)+2u(x)+5\int _{{0}}^{{x}}u(t)\,dt=\left\{{\begin{array}{ll}1,\qquad x\geq 0\\0,\qquad x<0\end{array}}\right.\qquad {\text{with}}\qquad u(0)=0.

The Laplace transform is defined by,

U(s)={\mathcal {L}}\left\{u(x)\right\}=\int _{0}^{{\infty }}e^{{-sx}}u(x)\,dx.

Upon taking term-by-term Laplace transforms, and utilising the rules for derivatives and integrals, the integro-differential equation is converted into the following algebraic equation,

sU(s)-u(0)+2U(s)+{\frac {5}{s}}U(s)={\frac {1}{s}}.

Thus,

U(s)={\frac {1}{s^{2}+2s+5}}

Inverting the Laplace transform using contour integral methods then gives

u(x)={\frac {1}{2}}e^{{-x}}\sin(2x)

Applications

Integro-differential equations model many situations from science and engineering. A particularly rich source is electrical circuit analysis.

The activity of interacting inhibitory and excitatory neurons can be described by a system of integro-differential equations, see for example the Wilson-Cowan model.

External links

Interactive Mathematics
Numerical solution of the example using Chebfun

References

Vangipuram Lakshmikantham, M. Rama Mohana Rao, “Theory of Integro-Differential Equations”, CRC Press, 1995

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