.. index:: pair: watertap.core.zero_order_diso;build_diso
.. currentmodule:: watertap.core.zero_order_diso
The build_diso method is intended to be used to rapidly construct a standard set of material balance equations for zero-order type models with a double inlet and single outlet.
from idaes.core import declare_process_block_class
from watertap.core import build_diso, ZeroOrderBaseData
@declare_process_block_class("CofermentationZO")
class CofermentationZOData(ZeroOrderBaseData):
CONFIG = ZeroOrderBaseData.CONFIG()
def build(self):
super().build()
self._tech_type = "cofermentation"
build_diso(self)
The build_diso method constructs a simple representation of unit operation with two inlets (named inlet1 and inlet2) and one outlet (named treated). A StateBlock is constructed for each inlet and outlet with a Port associated with each of these.
The build_diso method creates the following variables in addition to those created by the StateBlocks.
Variable | Name | Indices | Notes |
---|---|---|---|
r_{t} | recovery_frac_mass_H2O | time | Fraction of mass flow of water in inlet that goes to treated stream. |
f_{t,j} | removal_frac_mass_comp | time, component | Fraction of mass flow of each component that is removed from the inlet streams. |
recovery_frac_mass_H2O is intended to be fixed to zero (e.g., for reactor that yields solid product at treated outlet) or 1 (e.g., for reactor that yields product stream without water losses), but the user can optionally set this to some fraction.
The build_diso method writes the following constraints which relate the inlet states to those in the treated outlet stream. First, a water recovery equation is written for water to relate the flowrate at the treated outlet to that at the inlet:
water_recovery_equation(t):
r_t \times (M_{inlet1,t,H2O} + M_{inlet2,t,H2O}) = M_{treated,t,H2O}
where M_{t,H2O} is mass flowrate of water at time t.
Note, a mass balance for water is ignored since build_diso is intended to only account for constituent removal/conversion at the treated outlet. Thus, a mass balance constraint is only written for each solute.
solute_treated_equation(t, j):
(1 - f_{t, j}) \times (M_{inlet1,t,j} + M_{inlet2,t,j}) = M_{treated,t,j}