Singular perturbation

(Redirected from Singular Perturbation)

In mathematics, a singular perturbation problem is a problem containing a small parameter that cannot be approximated by setting the parameter value to zero. More precisely, the solution cannot be uniformly approximated by an asymptotic expansion

as . Here is the small parameter of the problem and are a sequence of functions of of increasing order, such as . This is in contrast to regular perturbation problems, for which a uniform approximation of this form can be obtained. Singularly perturbed problems are generally characterized by dynamics operating on multiple scales. Several classes of singular perturbations are outlined below.

The term "singular perturbation" was coined in the 1940s by Kurt Otto Friedrichs and Wolfgang R. Wasow.[1]

Methods of analysis

edit

A perturbed problem whose solution can be approximated on the whole problem domain, whether space or time, by a single asymptotic expansion has a regular perturbation. Most often in applications, an acceptable approximation to a regularly perturbed problem is found by simply replacing the small parameter   by zero everywhere in the problem statement. This corresponds to taking only the first term of the expansion, yielding an approximation that converges, perhaps slowly, to the true solution as   decreases. The solution to a singularly perturbed problem cannot be approximated in this way: As seen in the examples below, a singular perturbation generally occurs when a problem's small parameter multiplies its highest operator. Thus naively taking the parameter to be zero changes the very nature of the problem. In the case of differential equations, boundary conditions cannot be satisfied; in algebraic equations, the possible number of solutions is decreased.

Singular perturbation theory is a rich and ongoing area of exploration for mathematicians, physicists, and other researchers. The methods used to tackle problems in this field are many. The more basic of these include the method of matched asymptotic expansions and WKB approximation for spatial problems, and in time, the Poincaré–Lindstedt method, the method of multiple scales and periodic averaging. The numerical methods for solving singular perturbation problems are also very popular.[2]

For books on singular perturbation in ODE and PDE's, see for example Holmes, Introduction to Perturbation Methods,[3] Hinch, Perturbation methods[4] or Bender and Orszag, Advanced Mathematical Methods for Scientists and Engineers.[5]

Examples of singular perturbative problems

edit

Each of the examples described below shows how a naive perturbation analysis, which assumes that the problem is regular instead of singular, will fail. Some show how the problem may be solved by more sophisticated singular methods.

Vanishing coefficients in ordinary differential equations

edit

Differential equations that contain a small parameter that premultiplies the highest order term typically exhibit boundary layers, so that the solution evolves in two different scales. For example, consider the boundary value problem

 

Its solution when   is the solid curve shown below. Note that the solution changes rapidly near the origin. If we naively set  , we would get the solution labelled "outer" below which does not model the boundary layer, for which x is close to zero. For more details that show how to obtain the uniformly valid approximation, see method of matched asymptotic expansions.

Examples in time

edit

An electrically driven robot manipulator can have slower mechanical dynamics and faster electrical dynamics, thus exhibiting two time scales. In such cases, we can divide the system into two subsystems, one corresponding to faster dynamics and other corresponding to slower dynamics, and then design controllers for each one of them separately. Through a singular perturbation technique, we can make these two subsystems independent of each other, thereby simplifying the control problem.

Consider a class of system described by the following set of equations:

 
 
 

with  . The second equation indicates that the dynamics of   is much faster than that of  . A theorem due to Tikhonov[6] states that, with the correct conditions on the system, it will initially and very quickly approximate the solution to the equations

 
 
 

on some interval of time and that, as   decreases toward zero, the system will approach the solution more closely in that same interval.[7]

Examples in space

edit

In fluid mechanics, the properties of a slightly viscous fluid are dramatically different outside and inside a narrow boundary layer. Thus the fluid exhibits multiple spatial scales.

Reaction–diffusion systems in which one reagent diffuses much more slowly than another can form spatial patterns marked by areas where a reagent exists, and areas where it does not, with sharp transitions between them. In ecology, predator-prey models such as

 
 

where   is the prey and   is the predator, have been shown to exhibit such patterns.[8]

Algebraic equations

edit

Consider the problem of finding all roots of the polynomial  . In the limit  , this cubic degenerates into the quadratic   with roots at  . Substituting a regular perturbation series

 

in the equation and equating equal powers of   only yields corrections to these two roots:

 

To find the other root, singular perturbation analysis must be used. We must then deal with the fact that the equation degenerates into a quadratic when we let   tend to zero, in that limit one of the roots escapes to infinity. To prevent this root from becoming invisible to the perturbative analysis, we must rescale   to keep track with this escaping root so that in terms of the rescaled variables, it doesn't escape. We define a rescaled variable   where the exponent   will be chosen such that we rescale just fast enough so that the root is at a finite value of   in the limit of   to zero, but such that it doesn't collapse to zero where the other two roots will end up. In terms of   we have

 

We can see that for   the   is dominated by the lower degree terms, while at   it becomes as dominant as the   term while they both dominate the remaining term. This point where the highest order term will no longer vanish in the limit   to zero by becoming equally dominant to another term, is called significant degeneration; this yields the correct rescaling to make the remaining root visible. This choice yields

 

Substituting the perturbation series

 

yields

 

We are then interested in the root at  ; the double root at   are the two roots that we've found above that collapse to zero in the limit of an infinite rescaling. Calculating the first few terms of the series then yields

 

References

edit
  1. ^ Wasow, Wolfgang R. (1981), "ON BOUNDARY LAYER PROBLEMS IN THE THEORY OF ORDINARY DIFFERENTIAL EQUATIONS" (PDF), Mathematics Research Center, University of Wisconsin-Madison, Technical Summary Report, 2244: PDF page 5
  2. ^ Wang, Yingwei; Chen, Suqin; Wu, Xionghua (2010). "A rational spectral collocation method for solving a class of parameterized singular perturbation problems". Journal of Computational and Applied Mathematics. 233 (10): 2652–2660. Bibcode:2010JCoAM.233.2652W. doi:10.1016/j.cam.2009.11.011.
  3. ^ Holmes, Mark H. Introduction to Perturbation Methods. Springer, 1995. ISBN 978-0-387-94203-2
  4. ^ Hinch, E. J. Perturbation methods. Cambridge University Press, 1991. ISBN 978-0-521-37897-0
  5. ^ Bender, Carl M. and Orszag, Steven A. Advanced Mathematical Methods for Scientists and Engineers. Springer, 1999. ISBN 978-0-387-98931-0
  6. ^ Tikhonov, A. N. (1952), "Systems of differential equations containing a small parameter multiplying the derivative" (in Russian), Mat. Sb. 31 (73), pp. 575–586
  7. ^ Verhulst, Ferdinand. Methods and Applications of Singular Perturbations: Boundary Layers and Multiple Timescale Dynamics, Springer, 2005. ISBN 0-387-22966-3.
  8. ^ Owen, M. R. and Lewis, M. A. "How Predation can Slow, Stop, or Reverse a Prey Invasion", Bulletin of Mathematical Biology (2001) 63, 655-684.