ConfinedConcrete01 Material
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This
command
is
used
to
construct
an
uniaxial
material
object
of
confined
concrete
in
according
to
the
work
of
Braga,
Gigliotti
and
Laterza
(2006).
The
confined
concrete
model
(BGL
model)
has
not
tensile
strength
and
degraded
linear
unloading/reloading
stiffness
as
proposed
by
Karsan
and
Jirsa
(1969).
The
BGL
model
accounts
for
confinement
effects
due
to
different
arrangements
of
transverse
reinforcement
and/or
external
strengthening
such
as
steel
jackets
or
FRP
wraps.
The
confinement
effect
along
the
column is described
as
well.
In
order
to
obtain
th e
compressive
envelope
curve a
non
linear
approach
is
performed
at
each
increment
of
column
axial
strain.
The
sougth
curve
is
obtained
crossing
different
stress‐strain
relationships,
each
of
which
corresponding
to
a
different
level
of
confinement.
Currently,
the
Attard
and
Setunge’s
model
is
implemented
in
calculating
each
active
curve
of
the
confined
concrete.
| uniaxialMaterial ConfinedConcrete01 $tag $secType $fpc $Ec (<-epscu $epscu> OR <-gamma $gamma>) (<-nu $nu> OR <-varub> OR <-varnoub>) $L1 ($L2) ($L3) $phis $S $fyh $Es0 $haRatio $mu $phiLon <-internal $phisi $Si $fyhi $Es0i $haRatioi $mui> <-wrap $cover $Am $Sw $fuil $Es0w> <-gravel> <-silica> <-tol $tol> <-maxNumIter $maxNumIter> <-epscuLimit $epscuLimit> <-stRatio $stRatio> |
| $tag | integer tag identifying material. |
| $secType | tag for the transverse reinforcement configuration. See NOTE 1. |
| $fpc | unconfined cylindrical strength of concrete specimen. |
| $Ec | initial elastic modulus of unconfined concrete. |
| <-epscu $epscu> OR <-gamma $gamma> | confined concrete ultimate strain. See NOTE 2. |
| <-nu $nu> OR <-varub> OR <-varnoub> | Poisson's Ratio. See NOTE 3. |
| $L1 | length/diameter of square/circular core section measured respect to the hoop center line. |
| ($L2), ($L3) | additional dimensions when multiple hoops are being used. See NOTE 4. |
| $phis | hoop diameter. If section arrangement has multiple hoops it refers to the external hoop. |
| $S | hoop spacing. |
| $fyh | yielding strength of the hoop steel. |
| $Es0 | elastic modulus of the hoop steel. |
| $haRatio | hardening ratio of the hoop steel. |
| $mu | ductility factor of the hoop steel. |
| $phiLon | diameter of longitudinal bars. |
| <-internal $phisi $Si $fyhi $Es0i $haRatioi $mui> | optional parameters for defining the internal transverse reinforcement. If they are not specified they will be assumed equal to the external ones (for S2, S3, S4a, S4b and S5 typed). |
| <-wrap $cover $Am $Sw $ful $Es0w> | optional parameters required when section is strengthened with FRP wraps. |
NOTES:
1) The following section types are available:
| S1 | square section with S1 type of transverse reinforcement with or without external FRP wrapping; |
| S2 | square section with S2 type of transverse reinforcement with or without external FRP wrapping; |
| S3 | square section with S3 type of transverse reinforcement with or without external FRP wrapping; |
| S4a | square section with S4a type of transverse reinforcement with or without external FRP wrapping; |
| S4b | square section with S4b type of transverse reinforcement with or without external FRP wrapping; |
| S5 | square section with S5 type of transverse reinforcement with or without external FRP wrapping; |
| C | circular section with or without external FRP wrapping; |
| R | rectangular section with or without external FRP wrapping. |
2) The confined concrete ultimate strain is defined using -epscu or -gamma. If -gamma option, $gamma specified is the ratio of the strength corresponding to ultimate strain to the peak strength of the confined concrete stress-strain curve. If $gamma cannot be achieved in the range [0, $epscuLimit] then $epscuLimit (optional, default: 0.05) will be assumed as ultimate strain.
3) Poisson's Ratio is specified by one of 3 methods: a)providing $nu using the -nu option. b)using the -varUB option in which Poisson’s ratio is defined as a function of axial strain by means of the expression proposed by Braga et al. (2006) with the upper bound equal to 0.5; or c) using the -varNoUB option in which case Poisson’s ratio is defined as a function of axial strain by means of the expression proposed by Braga et al. (2006) without any upper bound.
4) $L1, $L2 and $L3 are required when either S4a or S4b section types is used. $L1 and $L2 must be used for rectangular section.
5) Stresses and strains can be defined either as positive or as negative values. All commands are not case sensitive.
EXAMPLES:
REFEERENCES:
- Attard, M. M., Setunge, S., 1996. “Stress-strain relationship of confined and unconfined concrete”. Material Journal ACI, 93(5), 432-444
- Braga, F., Gigliotti, R., Laterza, M., 2006. “Analytical stress-strain relationship for concrete confined by steel stirrups and/or FRP jackets”. Journal of Structural Engineering ASCE, 132(9), 1402-1416.
- D’Amato M., February 2009. “Analytical models for non linear analysis of RC structures: confined concrete and bond-slips of longitudinal bars”. Doctoral Thesis. University of Basilicata, Potenza, Italy.
- Karsan, I. D., Jirsa, J. O., 1969. “Behavior of concrete under compressive loadings”, Journal of Structural Division ASCE, 95(12), 2543-2563.
Code Developed by: Michele D'Amato, University of Basilicata, Italy