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967 lines
27 KiB
C++
967 lines
27 KiB
C++
/*
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Copyright 2015 SINTEF ICT, Applied Mathematics.
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This file is part of the Open Porous Media project (OPM).
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OPM is free software: you can redistribute it and/or modify
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it under the terms of the GNU General Public License as published by
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the Free Software Foundation, either version 3 of the License, or
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(at your option) any later version.
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OPM is distributed in the hope that it will be useful,
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but WITHOUT ANY WARRANTY; without even the implied warranty of
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MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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GNU General Public License for more details.
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You should have received a copy of the GNU General Public License
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along with OPM. If not, see <http://www.gnu.org/licenses/>.
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*/
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#ifndef OPM_AUTODIFF_VFPHELPERS_HPP_
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#define OPM_AUTODIFF_VFPHELPERS_HPP_
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#include <opm/parser/eclipse/EclipseState/Schedule/VFPProdTable.hpp>
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#include <opm/parser/eclipse/EclipseState/Schedule/VFPInjTable.hpp>
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#include <opm/autodiff/AutoDiffHelpers.hpp>
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#include <opm/material/densead/Math.hpp>
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#include <opm/material/densead/Evaluation.hpp>
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/**
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* This file contains a set of helper functions used by VFPProd / VFPInj.
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*/
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namespace Opm {
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namespace detail {
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typedef AutoDiffBlock<double> ADB;
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/**
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* Returns zero if input value is NaN
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*/
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inline double zeroIfNan(const double& value) {
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return (std::isnan(value)) ? 0.0 : value;
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}
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/**
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* Returns zero if input value is NaN
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*/
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template <class EvalWell>
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inline EvalWell zeroIfNan(const EvalWell& value) {
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return (std::isnan(value.value())) ? 0.0 : value;
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}
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/**
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* Returns zero for every entry in the ADB which is NaN
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*/
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inline ADB zeroIfNan(const ADB& values) {
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Selector<ADB::V::Scalar> not_nan_selector(values.value(), Selector<ADB::V::Scalar>::NotNaN);
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const ADB::V z = ADB::V::Zero(values.size());
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const ADB zero = ADB::constant(z, values.blockPattern());
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ADB retval = not_nan_selector.select(values, zero);
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return retval;
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}
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/**
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* Computes the flo parameter according to the flo_type_
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* for production tables
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* @return Production rate of oil, gas or liquid.
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*/
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template <typename T>
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static T getFlo(const T& aqua, const T& liquid, const T& vapour,
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const VFPProdTable::FLO_TYPE& type) {
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switch (type) {
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case VFPProdTable::FLO_OIL:
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//Oil = liquid phase
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return liquid;
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case VFPProdTable::FLO_LIQ:
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//Liquid = aqua + liquid phases
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return aqua + liquid;
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case VFPProdTable::FLO_GAS:
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//Gas = vapor phase
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return vapour;
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case VFPProdTable::FLO_INVALID: //Intentional fall-through
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default:
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OPM_THROW(std::logic_error, "Invalid FLO_TYPE: '" << type << "'");
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}
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}
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/**
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* Computes the flo parameter according to the flo_type_
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* for injection tables
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* @return Production rate of oil, gas or liquid.
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*/
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template <typename T>
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static T getFlo(const T& aqua, const T& liquid, const T& vapour,
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const VFPInjTable::FLO_TYPE& type) {
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switch (type) {
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case VFPInjTable::FLO_OIL:
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//Oil = liquid phase
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return liquid;
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case VFPInjTable::FLO_WAT:
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//Liquid = aqua phase
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return aqua;
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case VFPInjTable::FLO_GAS:
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//Gas = vapor phase
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return vapour;
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case VFPInjTable::FLO_INVALID: //Intentional fall-through
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default:
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OPM_THROW(std::logic_error, "Invalid FLO_TYPE: '" << type << "'");
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}
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}
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/**
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* Computes the wfr parameter according to the wfr_type_
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* @return Production rate of oil, gas or liquid.
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*/
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template <typename T>
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static T getWFR(const T& aqua, const T& liquid, const T& vapour,
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const VFPProdTable::WFR_TYPE& type) {
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switch(type) {
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case VFPProdTable::WFR_WOR: {
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//Water-oil ratio = water / oil
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T wor = aqua / liquid;
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return zeroIfNan(wor);
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}
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case VFPProdTable::WFR_WCT:
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//Water cut = water / (water + oil)
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return zeroIfNan(aqua / (aqua + liquid));
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case VFPProdTable::WFR_WGR:
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//Water-gas ratio = water / gas
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return zeroIfNan(aqua / vapour);
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case VFPProdTable::WFR_INVALID: //Intentional fall-through
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default:
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OPM_THROW(std::logic_error, "Invalid WFR_TYPE: '" << type << "'");
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}
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}
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/**
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* Computes the gfr parameter according to the gfr_type_
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* @return Production rate of oil, gas or liquid.
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*/
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template <typename T>
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static T getGFR(const T& aqua, const T& liquid, const T& vapour,
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const VFPProdTable::GFR_TYPE& type) {
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switch(type) {
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case VFPProdTable::GFR_GOR:
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// Gas-oil ratio = gas / oil
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return zeroIfNan(vapour / liquid);
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case VFPProdTable::GFR_GLR:
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// Gas-liquid ratio = gas / (oil + water)
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return zeroIfNan(vapour / (liquid + aqua));
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case VFPProdTable::GFR_OGR:
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// Oil-gas ratio = oil / gas
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return zeroIfNan(liquid / vapour);
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case VFPProdTable::GFR_INVALID: //Intentional fall-through
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default:
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OPM_THROW(std::logic_error, "Invalid GFR_TYPE: '" << type << "'");
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}
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}
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/**
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* Helper struct for linear interpolation
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*/
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struct InterpData {
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InterpData() : ind_{0, 0}, inv_dist_(0.0), factor_(0.0) {}
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int ind_[2]; //[First element greater than or equal to value, Last element smaller than or equal to value]
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double inv_dist_; // 1 / distance between the two end points of the segment. Used to calculate derivatives and uses 1.0 / 0.0 = 0.0 as a convention
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double factor_; // Interpolation factor
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};
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/**
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* Helper function to find indices etc. for linear interpolation and extrapolation
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* @param value Value to find in values
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* @param values Sorted list of values to search for value in.
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* @return Data required to find the interpolated value
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*/
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inline InterpData findInterpData(const double& value, const std::vector<double>& values) {
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InterpData retval;
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const int nvalues = values.size();
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//If we only have one value in our vector, return that
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if (values.size() == 1) {
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retval.ind_[0] = 0;
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retval.ind_[1] = 0;
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retval.inv_dist_ = 0.0;
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retval.factor_ = 0.0;
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}
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// Else search in the vector
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else {
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//If value is less than all values, use first interval
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if (value < values.front()) {
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retval.ind_[0] = 0;
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retval.ind_[1] = 1;
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}
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//If value is greater than all values, use last interval
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else if (value >= values.back()) {
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retval.ind_[0] = nvalues-2;
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retval.ind_[1] = nvalues-1;
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}
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else {
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//Search internal intervals
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for (int i=1; i<nvalues; ++i) {
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if (values[i] >= value) {
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retval.ind_[0] = i-1;
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retval.ind_[1] = i;
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break;
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}
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}
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}
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const double start = values[retval.ind_[0]];
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const double end = values[retval.ind_[1]];
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//Find interpolation ratio
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if (end > start) {
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//FIXME: Possible source for floating point error here if value and floor are large,
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//but very close to each other
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retval.inv_dist_ = 1.0 / (end-start);
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retval.factor_ = (value-start) * retval.inv_dist_;
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}
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else {
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retval.inv_dist_ = 0.0;
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retval.factor_ = 0.0;
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}
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}
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return retval;
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}
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/**
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* An "ADB-like" structure with a single value and a set of derivatives
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*/
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struct VFPEvaluation {
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VFPEvaluation() : value(0.0), dthp(0.0), dwfr(0.0), dgfr(0.0), dalq(0.0), dflo(0.0) {};
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double value;
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double dthp;
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double dwfr;
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double dgfr;
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double dalq;
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double dflo;
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};
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inline VFPEvaluation operator+(
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VFPEvaluation lhs,
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const VFPEvaluation& rhs) {
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lhs.value += rhs.value;
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lhs.dthp += rhs.dthp;
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lhs.dwfr += rhs.dwfr;
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lhs.dgfr += rhs.dgfr;
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lhs.dalq += rhs.dalq;
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lhs.dflo += rhs.dflo;
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return lhs;
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}
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inline VFPEvaluation operator-(
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VFPEvaluation lhs,
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const VFPEvaluation& rhs) {
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lhs.value -= rhs.value;
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lhs.dthp -= rhs.dthp;
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lhs.dwfr -= rhs.dwfr;
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lhs.dgfr -= rhs.dgfr;
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lhs.dalq -= rhs.dalq;
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lhs.dflo -= rhs.dflo;
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return lhs;
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}
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inline VFPEvaluation operator*(
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double lhs,
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const VFPEvaluation& rhs) {
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VFPEvaluation retval;
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retval.value = rhs.value * lhs;
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retval.dthp = rhs.dthp * lhs;
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retval.dwfr = rhs.dwfr * lhs;
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retval.dgfr = rhs.dgfr * lhs;
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retval.dalq = rhs.dalq * lhs;
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retval.dflo = rhs.dflo * lhs;
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return retval;
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}
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/**
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* Helper function which interpolates data using the indices etc. given in the inputs.
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*/
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inline VFPEvaluation interpolate(
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const VFPProdTable::array_type& array,
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const InterpData& flo_i,
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const InterpData& thp_i,
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const InterpData& wfr_i,
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const InterpData& gfr_i,
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const InterpData& alq_i) {
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//Values and derivatives in a 5D hypercube
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VFPEvaluation nn[2][2][2][2][2];
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//Pick out nearest neighbors (nn) to our evaluation point
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//This is not really required, but performance-wise it may pay off, since the 32-elements
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//we copy to (nn) will fit better in cache than the full original table for the
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//interpolation below.
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//The following ladder of for loops will presumably be unrolled by a reasonable compiler.
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for (int t=0; t<=1; ++t) {
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for (int w=0; w<=1; ++w) {
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for (int g=0; g<=1; ++g) {
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for (int a=0; a<=1; ++a) {
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for (int f=0; f<=1; ++f) {
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//Shorthands for indexing
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const int ti = thp_i.ind_[t];
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const int wi = wfr_i.ind_[w];
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const int gi = gfr_i.ind_[g];
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const int ai = alq_i.ind_[a];
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const int fi = flo_i.ind_[f];
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//Copy element
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nn[t][w][g][a][f].value = array[ti][wi][gi][ai][fi];
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}
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}
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}
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}
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}
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//Calculate derivatives
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//Note that the derivative of the two end points of a line aligned with the
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//"axis of the derivative" are equal
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for (int i=0; i<=1; ++i) {
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for (int j=0; j<=1; ++j) {
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for (int k=0; k<=1; ++k) {
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for (int l=0; l<=1; ++l) {
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nn[0][i][j][k][l].dthp = (nn[1][i][j][k][l].value - nn[0][i][j][k][l].value) * thp_i.inv_dist_;
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nn[i][0][j][k][l].dwfr = (nn[i][1][j][k][l].value - nn[i][0][j][k][l].value) * wfr_i.inv_dist_;
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nn[i][j][0][k][l].dgfr = (nn[i][j][1][k][l].value - nn[i][j][0][k][l].value) * gfr_i.inv_dist_;
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nn[i][j][k][0][l].dalq = (nn[i][j][k][1][l].value - nn[i][j][k][0][l].value) * alq_i.inv_dist_;
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nn[i][j][k][l][0].dflo = (nn[i][j][k][l][1].value - nn[i][j][k][l][0].value) * flo_i.inv_dist_;
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nn[1][i][j][k][l].dthp = nn[0][i][j][k][l].dthp;
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nn[i][1][j][k][l].dwfr = nn[i][0][j][k][l].dwfr;
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nn[i][j][1][k][l].dgfr = nn[i][j][0][k][l].dgfr;
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nn[i][j][k][1][l].dalq = nn[i][j][k][0][l].dalq;
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nn[i][j][k][l][1].dflo = nn[i][j][k][l][0].dflo;
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}
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}
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}
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}
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double t1, t2; //interpolation variables, so that t1 = (1-t) and t2 = t.
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// Remove dimensions one by one
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// Example: going from 3D to 2D to 1D, we start by interpolating along
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// the z axis first, leaving a 2D problem. Then interpolating along the y
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// axis, leaving a 1D, problem, etc.
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t2 = flo_i.factor_;
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t1 = (1.0-t2);
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for (int t=0; t<=1; ++t) {
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for (int w=0; w<=1; ++w) {
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for (int g=0; g<=1; ++g) {
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for (int a=0; a<=1; ++a) {
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nn[t][w][g][a][0] = t1*nn[t][w][g][a][0] + t2*nn[t][w][g][a][1];
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}
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}
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}
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}
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t2 = alq_i.factor_;
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t1 = (1.0-t2);
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for (int t=0; t<=1; ++t) {
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for (int w=0; w<=1; ++w) {
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for (int g=0; g<=1; ++g) {
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nn[t][w][g][0][0] = t1*nn[t][w][g][0][0] + t2*nn[t][w][g][1][0];
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}
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}
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}
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t2 = gfr_i.factor_;
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t1 = (1.0-t2);
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for (int t=0; t<=1; ++t) {
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for (int w=0; w<=1; ++w) {
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nn[t][w][0][0][0] = t1*nn[t][w][0][0][0] + t2*nn[t][w][1][0][0];
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}
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}
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t2 = wfr_i.factor_;
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t1 = (1.0-t2);
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for (int t=0; t<=1; ++t) {
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nn[t][0][0][0][0] = t1*nn[t][0][0][0][0] + t2*nn[t][1][0][0][0];
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}
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t2 = thp_i.factor_;
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t1 = (1.0-t2);
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nn[0][0][0][0][0] = t1*nn[0][0][0][0][0] + t2*nn[1][0][0][0][0];
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return nn[0][0][0][0][0];
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}
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/**
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* This basically models interpolate(VFPProdTable::array_type, ...)
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* which performs 5D interpolation, but here for the 2D case only
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*/
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inline VFPEvaluation interpolate(
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const VFPInjTable::array_type& array,
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const InterpData& flo_i,
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const InterpData& thp_i) {
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//Values and derivatives in a 2D plane
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VFPEvaluation nn[2][2];
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//Pick out nearest neighbors (nn) to our evaluation point
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//The following ladder of for loops will presumably be unrolled by a reasonable compiler.
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for (int t=0; t<=1; ++t) {
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for (int f=0; f<=1; ++f) {
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//Shorthands for indexing
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const int ti = thp_i.ind_[t];
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const int fi = flo_i.ind_[f];
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//Copy element
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nn[t][f].value = array[ti][fi];
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}
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}
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//Calculate derivatives
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//Note that the derivative of the two end points of a line aligned with the
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//"axis of the derivative" are equal
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for (int i=0; i<=1; ++i) {
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nn[0][i].dthp = (nn[1][i].value - nn[0][i].value) * thp_i.inv_dist_;
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nn[i][0].dwfr = -1e100;
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nn[i][0].dgfr = -1e100;
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nn[i][0].dalq = -1e100;
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nn[i][0].dflo = (nn[i][1].value - nn[i][0].value) * flo_i.inv_dist_;
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nn[1][i].dthp = nn[0][i].dthp;
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nn[i][1].dwfr = nn[i][0].dwfr;
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nn[i][1].dgfr = nn[i][0].dgfr;
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nn[i][1].dalq = nn[i][0].dalq;
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nn[i][1].dflo = nn[i][0].dflo;
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}
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double t1, t2; //interpolation variables, so that t1 = (1-t) and t2 = t.
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// Go from 2D to 1D
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t2 = flo_i.factor_;
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t1 = (1.0-t2);
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nn[0][0] = t1*nn[0][0] + t2*nn[0][1];
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nn[1][0] = t1*nn[1][0] + t2*nn[1][1];
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// Go from line to point on line
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t2 = thp_i.factor_;
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t1 = (1.0-t2);
|
|
nn[0][0] = t1*nn[0][0] + t2*nn[1][0];
|
|
|
|
return nn[0][0];
|
|
}
|
|
|
|
inline VFPEvaluation bhp(const VFPProdTable* table,
|
|
const double& aqua,
|
|
const double& liquid,
|
|
const double& vapour,
|
|
const double& thp,
|
|
const double& alq) {
|
|
//Find interpolation variables
|
|
double flo = detail::getFlo(aqua, liquid, vapour, table->getFloType());
|
|
double wfr = detail::getWFR(aqua, liquid, vapour, table->getWFRType());
|
|
double gfr = detail::getGFR(aqua, liquid, vapour, table->getGFRType());
|
|
|
|
//First, find the values to interpolate between
|
|
//Recall that flo is negative in Opm, so switch sign.
|
|
auto flo_i = detail::findInterpData(-flo, table->getFloAxis());
|
|
auto thp_i = detail::findInterpData( thp, table->getTHPAxis());
|
|
auto wfr_i = detail::findInterpData( wfr, table->getWFRAxis());
|
|
auto gfr_i = detail::findInterpData( gfr, table->getGFRAxis());
|
|
auto alq_i = detail::findInterpData( alq, table->getALQAxis());
|
|
|
|
detail::VFPEvaluation retval = detail::interpolate(table->getTable(), flo_i, thp_i, wfr_i, gfr_i, alq_i);
|
|
|
|
return retval;
|
|
}
|
|
|
|
|
|
|
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|
|
inline VFPEvaluation bhp(const VFPInjTable* table,
|
|
const double& aqua,
|
|
const double& liquid,
|
|
const double& vapour,
|
|
const double& thp) {
|
|
//Find interpolation variables
|
|
double flo = detail::getFlo(aqua, liquid, vapour, table->getFloType());
|
|
|
|
//First, find the values to interpolate between
|
|
auto flo_i = detail::findInterpData(flo, table->getFloAxis());
|
|
auto thp_i = detail::findInterpData(thp, table->getTHPAxis());
|
|
|
|
//Then perform the interpolation itself
|
|
detail::VFPEvaluation retval = detail::interpolate(table->getTable(), flo_i, thp_i);
|
|
|
|
return retval;
|
|
}
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
/**
|
|
* Returns the table from the map if found, or throws an exception
|
|
*/
|
|
template <typename T>
|
|
const T* getTable(const std::map<int, T*> tables, int table_id) {
|
|
auto entry = tables.find(table_id);
|
|
if (entry == tables.end()) {
|
|
OPM_THROW(std::invalid_argument, "Nonexistent table " << table_id << " referenced.");
|
|
}
|
|
else {
|
|
return entry->second;
|
|
}
|
|
}
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
/**
|
|
* Sets block_pattern to be the "union of x.blockPattern() and block_pattern".
|
|
*/
|
|
inline void extendBlockPattern(const ADB& x, std::vector<int>& block_pattern) {
|
|
std::vector<int> x_block_pattern = x.blockPattern();
|
|
|
|
if (x_block_pattern.empty()) {
|
|
return;
|
|
}
|
|
else {
|
|
if (block_pattern.empty()) {
|
|
block_pattern = x_block_pattern;
|
|
return;
|
|
}
|
|
else {
|
|
if (x_block_pattern != block_pattern) {
|
|
OPM_THROW(std::logic_error, "Block patterns do not match");
|
|
}
|
|
}
|
|
}
|
|
}
|
|
|
|
/**
|
|
* Finds the common block pattern for all inputs
|
|
*/
|
|
inline std::vector<int> commonBlockPattern(
|
|
const ADB& x1,
|
|
const ADB& x2,
|
|
const ADB& x3,
|
|
const ADB& x4) {
|
|
std::vector<int> block_pattern;
|
|
|
|
extendBlockPattern(x1, block_pattern);
|
|
extendBlockPattern(x2, block_pattern);
|
|
extendBlockPattern(x3, block_pattern);
|
|
extendBlockPattern(x4, block_pattern);
|
|
|
|
return block_pattern;
|
|
}
|
|
|
|
inline std::vector<int> commonBlockPattern(
|
|
const ADB& x1,
|
|
const ADB& x2,
|
|
const ADB& x3,
|
|
const ADB& x4,
|
|
const ADB& x5) {
|
|
std::vector<int> block_pattern = commonBlockPattern(x1, x2, x3, x4);
|
|
extendBlockPattern(x5, block_pattern);
|
|
|
|
return block_pattern;
|
|
}
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
/**
|
|
* Returns the type variable for FLO/GFR/WFR for production tables
|
|
*/
|
|
template <typename TYPE, typename TABLE>
|
|
TYPE getType(const TABLE* table);
|
|
|
|
template <>
|
|
inline
|
|
VFPProdTable::FLO_TYPE getType(const VFPProdTable* table) {
|
|
return table->getFloType();
|
|
}
|
|
|
|
template <>
|
|
inline
|
|
VFPProdTable::WFR_TYPE getType(const VFPProdTable* table) {
|
|
return table->getWFRType();
|
|
}
|
|
|
|
template <>
|
|
inline
|
|
VFPProdTable::GFR_TYPE getType(const VFPProdTable* table) {
|
|
return table->getGFRType();
|
|
}
|
|
|
|
|
|
/**
|
|
* Returns the type variable for FLO for injection tables
|
|
*/
|
|
template <>
|
|
inline
|
|
VFPInjTable::FLO_TYPE getType(const VFPInjTable* table) {
|
|
return table->getFloType();
|
|
}
|
|
|
|
|
|
|
|
|
|
/**
|
|
* Returns the actual ADB for the type of FLO/GFR/WFR type
|
|
*/
|
|
template <typename TYPE>
|
|
ADB getValue(
|
|
const ADB& aqua,
|
|
const ADB& liquid,
|
|
const ADB& vapour, TYPE type);
|
|
|
|
template <>
|
|
inline
|
|
ADB getValue(
|
|
const ADB& aqua,
|
|
const ADB& liquid,
|
|
const ADB& vapour,
|
|
VFPProdTable::FLO_TYPE type) {
|
|
return detail::getFlo(aqua, liquid, vapour, type);
|
|
}
|
|
|
|
template <>
|
|
inline
|
|
ADB getValue(
|
|
const ADB& aqua,
|
|
const ADB& liquid,
|
|
const ADB& vapour,
|
|
VFPProdTable::WFR_TYPE type) {
|
|
return detail::getWFR(aqua, liquid, vapour, type);
|
|
}
|
|
|
|
template <>
|
|
inline
|
|
ADB getValue(
|
|
const ADB& aqua,
|
|
const ADB& liquid,
|
|
const ADB& vapour,
|
|
VFPProdTable::GFR_TYPE type) {
|
|
return detail::getGFR(aqua, liquid, vapour, type);
|
|
}
|
|
|
|
template <>
|
|
inline
|
|
ADB getValue(
|
|
const ADB& aqua,
|
|
const ADB& liquid,
|
|
const ADB& vapour,
|
|
VFPInjTable::FLO_TYPE type) {
|
|
return detail::getFlo(aqua, liquid, vapour, type);
|
|
}
|
|
|
|
/**
|
|
* Given m wells and n types of VFP variables (e.g., FLO = {FLO_OIL, FLO_LIQ}
|
|
* this function combines the n types of ADB objects, so that each of the
|
|
* m wells gets the right ADB.
|
|
* @param TYPE Type of variable to return, e.g., FLO_TYPE, WFR_TYPE, GFR_TYPE
|
|
* @param TABLE Type of table to use, e.g., VFPInjTable, VFPProdTable.
|
|
*/
|
|
template <typename TYPE, typename TABLE>
|
|
ADB combineADBVars(const std::vector<const TABLE*>& well_tables,
|
|
const ADB& aqua,
|
|
const ADB& liquid,
|
|
const ADB& vapour) {
|
|
|
|
const int num_wells = static_cast<int>(well_tables.size());
|
|
assert(aqua.size() == num_wells);
|
|
assert(liquid.size() == num_wells);
|
|
assert(vapour.size() == num_wells);
|
|
|
|
//Caching variable for flo/wfr/gfr
|
|
std::map<TYPE, ADB> map;
|
|
|
|
//Indexing variable used when combining the different ADB types
|
|
std::map<TYPE, std::vector<int> > elems;
|
|
|
|
//Compute all of the different ADB types,
|
|
//and record which wells use which types
|
|
for (int i=0; i<num_wells; ++i) {
|
|
const TABLE* table = well_tables[i];
|
|
|
|
//Only do something if this well is under THP control
|
|
if (table != NULL) {
|
|
TYPE type = getType<TYPE>(table);
|
|
|
|
//"Caching" of flo_type etc: Only calculate used types
|
|
//Create type if it does not exist
|
|
if (map.find(type) == map.end()) {
|
|
map.insert(std::pair<TYPE, ADB>(
|
|
type,
|
|
detail::getValue<TYPE>(aqua, liquid, vapour, type)
|
|
));
|
|
}
|
|
|
|
//Add the index for assembly later in gather_vars
|
|
elems[type].push_back(i);
|
|
}
|
|
}
|
|
|
|
//Loop over all types of ADB variables, and combine them
|
|
//so that each well gets the proper variable
|
|
ADB retval = ADB::constant(ADB::V::Zero(num_wells));
|
|
for (const auto& entry : elems) {
|
|
const auto& key = entry.first;
|
|
const auto& value = entry.second;
|
|
|
|
//Get the ADB for this type of variable
|
|
assert(map.find(key) != map.end());
|
|
const ADB& values = map.find(key)->second;
|
|
|
|
//Get indices to all elements that should use this ADB
|
|
const std::vector<int>& current = value;
|
|
|
|
//Add these elements to retval
|
|
retval = retval + superset(subset(values, current), current, values.size());
|
|
}
|
|
|
|
return retval;
|
|
}
|
|
|
|
/**
|
|
* Helper function that finds x for a given value of y for a line
|
|
* *NOTE ORDER OF ARGUMENTS*
|
|
*/
|
|
inline double findX(const double& x0,
|
|
const double& x1,
|
|
const double& y0,
|
|
const double& y1,
|
|
const double& y) {
|
|
const double dx = x1 - x0;
|
|
const double dy = y1 - y0;
|
|
|
|
/**
|
|
* y = y0 + (dy / dx) * (x - x0)
|
|
* => x = x0 + (y - y0) * (dx / dy)
|
|
*
|
|
* If dy is zero, use x1 as the value.
|
|
*/
|
|
|
|
double x = 0.0;
|
|
|
|
if (dy != 0.0) {
|
|
x = x0 + (y-y0) * (dx/dy);
|
|
}
|
|
else {
|
|
x = x1;
|
|
}
|
|
|
|
return x;
|
|
}
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
/**
|
|
* This function finds the value of THP given a specific BHP.
|
|
* Essentially:
|
|
* Given the function f(thp_array(x)) = bhp_array(x), which is piecewise linear,
|
|
* find thp so that f(thp) = bhp.
|
|
*/
|
|
inline double findTHP(
|
|
const std::vector<double>& bhp_array,
|
|
const std::vector<double>& thp_array,
|
|
double bhp) {
|
|
int nthp = thp_array.size();
|
|
|
|
double thp = -1e100;
|
|
|
|
//Check that our thp axis is sorted
|
|
assert(std::is_sorted(thp_array.begin(), thp_array.end()));
|
|
|
|
/**
|
|
* Our *interpolated* bhp_array will be montonic increasing for increasing
|
|
* THP if our input BHP values are monotonic increasing for increasing
|
|
* THP values. However, if we have to *extrapolate* along any of the other
|
|
* axes, this guarantee holds no more, and bhp_array may be "random"
|
|
*/
|
|
if (std::is_sorted(bhp_array.begin(), bhp_array.end())) {
|
|
//Target bhp less than all values in array, extrapolate
|
|
if (bhp <= bhp_array[0]) {
|
|
//TODO: LOG extrapolation
|
|
const double& x0 = thp_array[0];
|
|
const double& x1 = thp_array[1];
|
|
const double& y0 = bhp_array[0];
|
|
const double& y1 = bhp_array[1];
|
|
thp = detail::findX(x0, x1, y0, y1, bhp);
|
|
}
|
|
//Target bhp greater than all values in array, extrapolate
|
|
else if (bhp > bhp_array[nthp-1]) {
|
|
//TODO: LOG extrapolation
|
|
const double& x0 = thp_array[nthp-2];
|
|
const double& x1 = thp_array[nthp-1];
|
|
const double& y0 = bhp_array[nthp-2];
|
|
const double& y1 = bhp_array[nthp-1];
|
|
thp = detail::findX(x0, x1, y0, y1, bhp);
|
|
}
|
|
//Target bhp within table ranges, interpolate
|
|
else {
|
|
//Loop over the values and find min(bhp_array(thp)) == bhp
|
|
//so that we maximize the rate.
|
|
|
|
//Find i so that bhp_array[i-1] <= bhp <= bhp_array[i];
|
|
//Assuming a small number of values in bhp_array, this should be quite
|
|
//efficient. Other strategies might be bisection, etc.
|
|
int i=0;
|
|
bool found = false;
|
|
for (; i<nthp-1; ++i) {
|
|
const double& y0 = bhp_array[i ];
|
|
const double& y1 = bhp_array[i+1];
|
|
|
|
if (y0 < bhp && bhp <= y1) {
|
|
found = true;
|
|
break;
|
|
}
|
|
}
|
|
//Canary in a coal mine: shouldn't really be required
|
|
assert(found == true);
|
|
static_cast<void>(found); //Silence compiler warning
|
|
|
|
const double& x0 = thp_array[i ];
|
|
const double& x1 = thp_array[i+1];
|
|
const double& y0 = bhp_array[i ];
|
|
const double& y1 = bhp_array[i+1];
|
|
thp = detail::findX(x0, x1, y0, y1, bhp);
|
|
}
|
|
}
|
|
//bhp_array not sorted, raw search.
|
|
else {
|
|
//Find i so that bhp_array[i-1] <= bhp <= bhp_array[i];
|
|
//Since the BHP values might not be sorted, first search within
|
|
//our interpolation values, and then try to extrapolate.
|
|
int i=0;
|
|
bool found = false;
|
|
for (; i<nthp-1; ++i) {
|
|
const double& y0 = bhp_array[i ];
|
|
const double& y1 = bhp_array[i+1];
|
|
|
|
if (y0 < bhp && bhp <= y1) {
|
|
found = true;
|
|
break;
|
|
}
|
|
}
|
|
if (found) {
|
|
const double& x0 = thp_array[i ];
|
|
const double& x1 = thp_array[i+1];
|
|
const double& y0 = bhp_array[i ];
|
|
const double& y1 = bhp_array[i+1];
|
|
thp = detail::findX(x0, x1, y0, y1, bhp);
|
|
}
|
|
else if (bhp <= bhp_array[0]) {
|
|
//TODO: LOG extrapolation
|
|
const double& x0 = thp_array[0];
|
|
const double& x1 = thp_array[1];
|
|
const double& y0 = bhp_array[0];
|
|
const double& y1 = bhp_array[1];
|
|
thp = detail::findX(x0, x1, y0, y1, bhp);
|
|
}
|
|
//Target bhp greater than all values in array, extrapolate
|
|
else if (bhp > bhp_array[nthp-1]) {
|
|
//TODO: LOG extrapolation
|
|
const double& x0 = thp_array[nthp-2];
|
|
const double& x1 = thp_array[nthp-1];
|
|
const double& y0 = bhp_array[nthp-2];
|
|
const double& y1 = bhp_array[nthp-1];
|
|
thp = detail::findX(x0, x1, y0, y1, bhp);
|
|
}
|
|
else {
|
|
OPM_THROW(std::logic_error, "Programmer error: Unable to find THP in THP array");
|
|
}
|
|
}
|
|
|
|
return thp;
|
|
}
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
} // namespace detail
|
|
|
|
|
|
} // namespace
|
|
|
|
|
|
|
|
|
|
#endif /* OPM_AUTODIFF_VFPHELPERS_HPP_ */
|