structure shell recover
command
Syntax
- structure shell recover keyword <range>
Primary keywords:
Stress and stress resultant recovery for shell-type elements. The stresses can only be recovered for elements with an elastic material model, whereas the stress resultants can be recovered for elements with either an elastic or a plastic material model. The range keyword identifies the patch of elements to which the command will apply. The recovered quantities will depend upon the range of elements over which these quantities are being recovered, because nodal averaging only occurs for elements within this range.
If the element has a plastic material model, then the stress state satisfies the plane-stress assumption such that the only non-zero components are \(\sigma_{xx}\), \(\sigma_{yy}\) and \(\sigma_{xy}\). These stress components are tracked at the integration points throughout the element volume and may be discontinuous. The stress resultants are obtained by integrating the stress field through the element thickness. The stress field can be listed with the
structure shell list plastic-stress
command.A comprehensive description of the stress-recovery procedure is provided here.
- resultants <range>
recover the eight stress resultants for all elements in the optional range. The stress resultants are expressed in terms of the surface coordinate system. This command assumes that a consistent surface coordinate system has been established for the group of elements in the range (see the surface keyword). The bending and membrane stress resultants (\(M_x\), \(M_y\), \(M_{xy}\), \(N_x\), \(N_y\), and \(N_{xy}\)) vary linearly over each element, whereas the transverse shear stress resultants (\(Q_x\) and \(Q_y\) ) are constant over each element. The recovery procedure first computes the average values of bending and membrane stress resultants (by averaging at the nodes the contributions from each element in the range), and then enforces the equilibrium condition that expresses the transverse shear stress resultants in terms of the spatial derivatives of the bending stress resultants by spatially differentiating the bending stress resultant field over the element.
Stress resultants can be queried after recovery with the command
structure shell list resultants
and the FISH functionstruct.shell.resultant
. The validity of the stress resultants for a particular element can be queried with the FISH functionstruct.shell.resultant.valid
.
- stress <depth-factor f >
recover a stress tensor (expressed in the global coordinate system) at a specified depth for all elements with an elastic material model in the optional range. The depth equals \(z^\star\) times \(t\)/2, where \(z^\star\) is depth factor and \(t\) is shell thickness. The depth factor must be in the range [-1, +1]. \(z^\star\) equal to +1 / -1 corresponds with the outer/inner shell surface (outer surface defined by positive surface system \(z\)-direction), and \(z^\star\) equal to zero corresponds with the shell midsurface. If the depth factor is not specified, then it defaults to +1.
Stresses are recovered at the three nodal points and centroid of each element with an elastic material model. If the \(xy\)-axes lie on the shell midsurface, then 1) stress components \(σ_{xx}\), \(σ_{yy}\), and \(σ_{xy}\) vary linearly over each element, 2) stress components \(σ_{xz}\) and \(σ_{yz}\) are constant over each element, and 3) \(σ_{zz}\) = 0 over each element. The stresses are obtained from the stress resultants by the following relations which hold for a homogeneous, linear elastic and thin-walled shell
(1)\[\begin{split}\begin{split} \sigma_{xx} &= {N_x \over t} + {12M_x z \over t^3} \\ \sigma_{yy} &= {N_y \over t} + {12M_y z \over t^3} \\ \sigma_{xy} &= {N_{xy} \over t} + {12M_{xy}z \over t^3} \\ \sigma_{xz} &= {3Q_x \over {2t}}\bigg(1 - (2z/t)^2 \bigg) \\ \sigma_{yz} &= {3Q_y \over {2t}}\bigg(1 - (2z/t)^2 \bigg) \\ \sigma_{zz} &= 0 \end{split}\end{split}\]These stresses are computed in the surface coordinate system in which are expressed the stress resultants, and then transformed into the global coordinate system. If the stress resultants are not valid when this command is executed, then an attempt is made to recover them. If this attempt fails, then an error message is displayed indicating the problem. The usual problem is an inconsistency of the surface system, which must be rectified with the
structure shell recover surface
command.Stresses and principal stresses for elements with an elastic material model can be queried after recovery with the commands
structure shell list stress
andstructure shell list stress-principal
, and with the FISH functionsstruct.shell.stress
andstruct.shell.stress.prin
. The depth at which these stresses have been recovered can be queried with the commandstructure shell list depth-factor
and the FISH functionstruct.shell.stress.depth.factor
. The validity of the stresses and principal stresses for a particular element can be queried with the FISH functionstruct.shell.stress.valid
.
- surface v
The vector v enables a surface coordinate system to be generated for all nodes used by the elements in the optional range. The surface coordinate system, \(x'y'z'\), has the following properties: 1) \(z'\) is normal to the surface; 2) \(x'\) is the projection of the given vector onto the surface; and 3) \(y' = z' \times x'\). The \(z'\)-direction is found at each node by taking the average normal direction of all elements in the range that use the node. If surface v is aligned with \(z'\) at any node, then processing stops and an error message is displayed. To proceed, designate a different v, or restrict the range of elements considered.
The surface system at a node automatically becomes invalid under the following conditions: 1) large-strain update; or 2) creation or deletion of a element that uses the node. Validity must be re-established with the command
structure shell recover surface
.The surface coordinate system can be listed with the command
structure node list system-surface
and queried and set with the FISH functionstruct.node.system.surface
. It can be visualized with the Shell plot item by choosing the System attribute called Surface.
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