Difference between revisions of "Vertical Stand"

Revision as of 13:45, 25 March 2013

Description

CAD Geometry

The vertical stand represents a structural part of a machine tool. On one of its surfaces there are guide rails located. On these rails a tool slide is moving due to the machining process the slide has to perform by the machine tool on top. The machining process produces a certain amount of heat which is transported through the structure into the vertical stand. This heat source is considered to be a temperature input at the guide rails. This transfered heat amount leads to deformations within the device induced by the prevailed temperature field denoted by $x$ . The evolution of this field is modeled by the heat equation

$c_p\rho\frac{\partial{x}}{\partial{t}}=\nabla.(\lambda\nabla x)=0$

with the boundary conditions

$\lambda\frac{\partial x}{\partial n}=\kappa(x-x_{ext})$ on $\Gamma_{surf}$ (remaining boundaries),

describing the heat transfer to the ambience and

$\lambda\frac{\partial x}{\partial n}=q \qquad\qquad\qquad$ on $\Gamma_{slide}$ (surface where the tool slide is moving on the guide rails),

which describes the heat transfer between tool slide and vertical stand.

The heat load $q$ induced by the slide and the external temperature $x_{ext}$ serves as the input $u$ of the corresponding state-space system.

The position of the moving slide has been included into the system as a parameter dependency $\mu$ . Due to this motion the region there the input acts on the system is varying and thus one obtains a parameter dependent input matrix $B(\mu)$ .