Results 311 to 320 of about 2,471,206 (379)
Fluid mechanics of sarcomeres as porous media.
Soft MatterSevern J, Vacus T, Lauga E.
europepmc +1 more source
Some of the next articles are maybe not open access.
Related searches:
Related searches:
International journal of numerical methods for heat & fluid flow, 2020
Purpose This paper aims to review some effective methods for fully fourth-order nonlinear integral boundary value problems with fractal derivatives. Design/methodology/approach Boundary value problems arise everywhere in engineering, hence two-scale ...
Ji-Huan He
semanticscholar +1 more source
Purpose This paper aims to review some effective methods for fully fourth-order nonlinear integral boundary value problems with fractal derivatives. Design/methodology/approach Boundary value problems arise everywhere in engineering, hence two-scale ...
Ji-Huan He
semanticscholar +1 more source
A global uniqueness theorem for an inverse boundary value problem
, 1987In this paper, we show that the single smooth coefficient of the elliptic operator LY = v yv can be determined from knowledge of its Dirichlet integrals for arbitrary boundary values on a fixed region 2 C R', n ? 3. From a physical point of view, we show
J. Sylvester, G. Uhlmann
semanticscholar +1 more source
Background field removal by solving the Laplacian boundary value problem
NMR in Biomedicine, 2014The removal of the background magnetic field is a critical step in generating phase images and quantitative susceptibility maps, which have recently been receiving increasing attention.
Dong Zhou +3 more
semanticscholar +1 more source
, 1988 When a person begins the study of ordinary differential equations, he is usually confronted first by initial value problems, i.e. a differential equation plus conditions which the solution must satisfy at a given point x = x0.
William Miller, Mayer Humi
openaire +1 more source
2014
In this chapter we discuss boundary value problems for second order nonlinear equations. The linear case has been discussed in Chapter 9.
Shair Ahmad, Antonio Ambrosetti
openaire +2 more sources
In this chapter we discuss boundary value problems for second order nonlinear equations. The linear case has been discussed in Chapter 9.
Shair Ahmad, Antonio Ambrosetti
openaire +2 more sources
1996
Publisher Summary This chapter illustrates that the potential inside a domain of solution is specified by its boundary values at the surfaces of this domain and by its source distribution. This may be multiply connected but it always contains the optic axis.
Peter Hawkes, Erwin Kasper
openaire +2 more sources
Publisher Summary This chapter illustrates that the potential inside a domain of solution is specified by its boundary values at the surfaces of this domain and by its source distribution. This may be multiply connected but it always contains the optic axis.
Peter Hawkes, Erwin Kasper
openaire +2 more sources
2012
When solving initial value problems for ordinary differential equations, differential algebraic equations or partial differential equations, as discussed in previous chapters, a unique solution to the equations, if it exists, is obtained by specifying the values of all the components at the starting point of the range of integration.
G.R. Lindfield, J.E.T. Penny
openaire +3 more sources
When solving initial value problems for ordinary differential equations, differential algebraic equations or partial differential equations, as discussed in previous chapters, a unique solution to the equations, if it exists, is obtained by specifying the values of all the components at the starting point of the range of integration.
G.R. Lindfield, J.E.T. Penny
openaire +3 more sources
2011
This chapter deals with Newton methods for boundary value problems (BVPs) in nonlinear partial differential equations (PDEs). There are two principal approaches: (a) finite dimensional Newton methods applied to given systems of already discretized PDEs, also called discrete Newton methods, and (b) function space oriented inexact Newton methods directly
Peter Deuflhard, Peter Deuflhard
openaire +3 more sources
This chapter deals with Newton methods for boundary value problems (BVPs) in nonlinear partial differential equations (PDEs). There are two principal approaches: (a) finite dimensional Newton methods applied to given systems of already discretized PDEs, also called discrete Newton methods, and (b) function space oriented inexact Newton methods directly
Peter Deuflhard, Peter Deuflhard
openaire +3 more sources