jspub.bib
@techreport{lanzendorfer2008ncmm,
title = {{On Pressure Boundary Conditions for Steady Flows of Incompressible Fluids with Pressure and Shear Rate Dependent Viscosities}},
author = {Lanzend\"orfer, M. and Stebel, J.},
institution = {Ne{\v c}as Center for Mathematical Modeling},
year = {2008},
number = {15},
url = {http://www.karlin.mff.cuni.cz/ncmm/preprints/08311085315OnPressBndrCond-submitMB.pdf},
type = {Preprint},
abstract = {We consider a class of incompressible fluids whose viscosities depend
on the~pressure and the~shear rate.
Suitable boundary conditions on the surface force at the
inflow/outflow part of boundary are given.
As an advantage of this, the mean value of the pressure
over the domain is no more a free parameter which would
have to be prescribed otherwise.
We prove the existence and the~uniqueness of weak solutions
(the later for small data)
and~discuss particular applications of the results.},
note = {Submitted to Appl. Math.}
}
@article{bulicek2008,
title = {{Shape Optimization for Navier-Stokes Equations with Algebraic Turbulence Model: Existence Analysis}},
author = {Bul{\'i}{\v c}ek, M. and Haslinger, J. and M{\'a}lek, J. and Stebel, J.},
journal = {Applied Mathematics and Optimization},
year = {2009},
publisher = {Springer},
url = {http://dx.doi.org/10.1007/s00245-009-9066-0},
abstract = {We study a shape optimization problem for the paper machine headbox which distributes a mixture of water and wood fibers in the paper making process. The aim is to find a shape which a priori ensures the given velocity profile on the outlet part. The mathematical formulation leads to an optimal control problem in which the control variable is the shape of the domain representing the header, the state problem is represented by a generalized stationary Navier-Stokes system with nontrivial mixed boundary conditions. In this paper we prove the existence of solutions both to the generalized Navier-Stokes system and to the shape optimization problem.},
note = {Published Online.}
}
@article{stebel2007am,
title = {{Optimal shape design in a fibre orientation model}},
author = {Stebel, J. and M{\"a}kinen, R.A.E. and Toivanen, J.I.},
journal = {Applications of Mathematics},
volume = {52},
number = {5},
pages = {391--405},
year = {2007},
url = {http://dx.doi.org/10.1007/s10492-007-0022-5},
publisher = {Springer},
abstract = {We study a 2D model of the orientation distribution of fibres in a paper machine headbox. The goal is to control the orientation of fibres at the outlet by shape variations. The mathematical formulation leads to an optimization problem with control in coefficients of a linear convection-diffusion equation as the state problem. Existence of solutions both to the state and the optimization problem is analyzed and sensitivity analysis is performed. Further, discretization is done and a numerical example is shown.}
}
@article{haslinger2005cc,
title = {{Shape optimization in problems governed by generalised Navier-Stokes equations: existence analysis}},
author = {Haslinger, J. and M{\'a}lek, J. and Stebel, J.},
journal = {Control and Cybernetics},
volume = {34},
number = {1},
pages = {283--303},
year = {2005},
abstract = {We study a shape optimization problem for a paper machine headbox which distributes a mixture of water and wood fibers in the paper manufacturing process. The aim is to find a shape which a priori ensures the given velocity profile on the outlet part. The mathematical formulation leads to an optimal control problem in which the control variable is the shape of the domain representing the header, the state problem is represented by the generalised Navier-Stokes system with nontrivial boundary conditions. The objective of this paper is to prove the existence of an optimal shape.}
}
@article{haslinger2005iasme,
author = {Haslinger, J. and M{\'a}lek, J. and Stebel, J.},
title = {Shape optimization in problems governed by generalised
{N}avier-{S}tokes equations: existence analysis},
journal = {IASME Trans.},
fjournal = {IASME Transactions},
volume = {2},
year = {2005},
number = {6},
pages = {905--910},
issn = {1790-031X},
mrclass = {49Q10 (35Q30 76D05 76D55)},
mrnumber = {MR2215246 (2006j:49076)},
abstract = {We study a shape optimization problem for a paper machine headbox which distributes a mixture of water and wood fibers in the paper manufacturing process. The aim is to find a shape which a priori ensures the given velocity profile on the outlet part. The state problem is represented by the generalised Navier-Stokes system with nontrivial boundary conditions. The objective of this paper is to prove the existence of an optimal shape.}
}