Solutions of the differential equations of some infinite linear chains and two-dimensional arrays

Martens, Walter Frederick

05 1900

No description available.

Differential equations, Linear

On some problems concerning differential equations of diffusion type

Crownover, Richard McCranie

05 1900

No description available.

Differential equations

Diffusion

Numerical solution of the equations for a continuous medium reactor

Price, Robert McCollum

08 1900

No description available.

Nuclear reactors

Differential equations

Infinite dimensional dynamics described by ordinary differential equations

Carvalho, Alexandre Nolasco de

08 1900

No description available.

Dynamics

Differential equations, Partial

Higher order algorithms for the numerical integration of stochastic differential equations

Honeycutt, Rebecca Lee

08 1900

No description available.

Algorithms

Stochastic differential equations

The form of a solution to the inhomogeneous heat equation

Lee, Philip Francis

05 1900

No description available.

Differential equations, Partial

Heat

The existence and structure of the solution of y ́= Aya + Bxb

Buchanan, Angela Marie.

January 1973

No description available.

Implicit methods in initial value problems

Hussein, Sayed A.

January 1991

No description available.

510

Differential equations solving

The global behavior of solutions of a certain third order differential equation

Shi, Changgui

January 1992

In computer vision, object recognition involves segmentation of the image into separate components. One way to do this is to detect the edges of the components. Several algorithms for edge detection exist and one of the most sophisticated is the Canny edge detector.Canny [2] designed an optimal edge detector for images which are corrupted with noise. He suggested that a Gaussian filter be applied to the image and edges be sought in the smoothed image. The directional derivative of the Gaussian is obtained, then convolved with the image. The direction, n, involved is normal to the edge direction. Edges are assumed to exist where the result is a local extreme, i.e., where∂2 (g * f) = 0.(0.1)_____∂n2In the above, g(x, y) is the Gaussian, f (x, y) is the image function and The direction of n is an estimate of the direction of the gradient of the true edge. In this thesis, we discuss the computational algorithm of the Canny edge detector and its implementation. Our experimental results show that the Canny edge detection scheme is robust enough to perform well over a wide range of signal-to-noise ratios. In most cases the Canny edge detector performs much better than the other edge detectors. / Department of Mathematical Sciences

Homoclinic bifurcations

Drysdale, David

January 1994

Previously obtained results from the study of homoclinic bifurcations in ordinary differential equations are presented. The standard technique of analysis involves the construction of a Poincaré map on a surface near to the homoclinic point. This map is the composition of an inside map, with behaviour linearized about the homoclinic point, together with an outside map, with behaviour linearized about the homoclinic orbit. The Poincaré map is then reduced to a one-dimensional map, involving the return time between successive visits to the Poincaré surface. These standard techniques in the contemplation of homoclinic systems are then extended to a class of partial differential equations, on unbounded domains. This follows a method introduced by Fowler [Stud. Appl. Math. 83 (1990), pp. 329–353]. This extension involves more technicalities than in the case of ordinary differential equations. The method of Fowler is extended to cover the case of vector-valued partial differential equations, and to consider the consequences of symmetry invariances. A Poincaré map is derived, and then is reduced to a finite-dimensional map. This map has dimension equal to the number of symmetry invariances of the system. Some simple examples of this finite-dimensional map are studied, in isolation. A number of interesting bifurcation pictures are produced for these simple examples, involving considerable variation with the values of coefficients of the map. Partial differential equations on finite domains are then considered, yielding similar results to the ordinary differential equation case. The limit as domain size tends to infinity is examined, yielding a criterion for distinction between the applicability of finite and infinite domain results. Finally, these methods are applied to the Ginzburg-Landau system. This involves the numerical calculation of coefficients for the finite-dimensional map. The finite-dimensional map thus derived supports an interesting interlocked isola structure, and moreover correlates with numerical integration data.

510

Partial differential equations