4.14.5.2. CastFuse Material¶

uniaxialMaterial('Cast', matTag, n, bo, h, fy, E, L, b, Ro, cR1, cR2, a1=s2*Pp/Kp, a2=1.0, a3=a4*Pp/Kp, a4=1.0)

This command is used to construct a parallel material object made up of an arbitrary number of previously-constructed UniaxialMaterial objects.

`matTag` (int)	integer tag identifying material
`n` (int)	Number of yield fingers of the CSF-brace
`bo` (float)	Width of an individual yielding finger at its base of the CSF-brace
`h` (float)	Thickness of an individual yielding finger
`fy` (float)	Yield strength of the steel material of the yielding finger
`E` (float)	Modulus of elasticity of the steel material of the yielding finger
`L` (float)	Height of an individual yielding finger
`b` (float)	Strain hardening ratio
`Ro` (float)	Parameter that controls the Bauschinger effect. Recommended Values for $Ro=between 10 to 30
`cR1` (float)	Parameter that controls the Bauschinger effect. Recommended Value cR1=0.925
`cR2` (float)	Parameter that controls the Bauschinger effect. Recommended Value cR2=0.150
`a1` (float)	isotropic hardening parameter, increase of compression yield envelope as proportion of yield strength after a plastic deformation of a2*(Pp/Kp)
`a2` (float)	isotropic hardening parameter (see explanation under a1). (optional default = 1.0)
`a3` (float)	isotropic hardening parameter, increase of tension yield envelope as proportion of yield strength after a plastic deformation of a4*(Pp/Kp)
`a4` (float)	isotropic hardening parameter (see explanation under a3). (optional default = 1.0)

Gray et al. [1] showed that the monotonic backbone curve of a CSF-brace with known properties (n, bo, h, L, fy, E) after yielding can be expressed as a close-form solution that is given by, $P = P_p/\cos(2d/L)$, in which $d$ is the axial deformation of the brace at increment $i$ and $P_p$ is the yield strength of the CSF-brace and is given by the following expression

$P_p = nb_oh^2f_y/4L$

The elastic stiffness of the CSF-brace is given by,

$K_p = nb_oEh^3f_y/6L^3$