~jdpipe/ascend/trunk-old : contents of models/ternary

~jdpipe/ascend/trunk-old : (revision 2989)
REQUIRE "atoms.a4l";
(* => atoms.a4l, measures.a4l, system.a4l, basemodel.a4l *)
REQUIRE "plot.a4l";
(* => plot.a4l, atoms.a4l, measures.a4l, system.a4l, basemodel.a4l *)
PROVIDE "ternary_plot.a4l";

(*
 *  ternary_plot.a4l
 *  by Kenneth H. Tyner
 *  Part of the ASCEND Library
 *  $Date: 1998/06/17 19:32:35 $
 *  $Revision: 1.6 $
 *  $Author: mthomas $
 *  $Source: /afs/cs.cmu.edu/project/ascend/Repository/models/ternary_plot.a4l,v $
 *
 *  This file is part of the ASCEND Modeling Library.
 *
 *  Copyright (C) 1997  Carnegie Mellon University
 *
 *  The ASCEND Modeling Library is free software; you can redistribute
 *  it and/or modify it under the terms of the GNU General Public
 *  License as published by the Free Software Foundation; either
 *  version 2 of the License, or (at your option) any later version.
 *
 *  The ASCEND Modeling Library is distributed in hope that it will be
 *  useful, but WITHOUT ANY WARRANTY; without even the implied
 *  warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.
 *  See the GNU General Public License for more details.
 *
 *  You should have received a copy of the GNU General Public License
 *  along with this program.  If not, see <http://www.gnu.org/licenses/>.
 *)

(*
	T E R N A R Y _ P L O T . A 4 L
	-------------------------------

	AUTHOR:		Kenneth H. Tyner

	DATES:		6/97 - First Public Release


	CONTENTS:	Ternary plots to complement distillation modeling.





	NOTES:		These models useable but are still in a state of flux.
			The parameter lists may change without notice!!!!
*)
MODEL ternary_plot_right_all(
    components WILL_BE set OF symbol_constant;
    npnts IS_A set OF integer_constant;
    comp_data[components][npnts] WILL_BE real;
    ) WHERE (
	CARD[components] = 3;
    );
    (* make triangle *)
    nt_points IS_A set OF integer_constant;
    nt_points :== [0..3];
    x_points[nt_points] IS_A real;
    y_points[nt_points] IS_A real;
    triangle IS_A plt_curve(nt_points,y_points,x_points);

    FOR i IN components CREATE
	FOR j IN [components - [i]] CREATE
	    curve[i][j] IS_A
		plt_curve(npnts,comp_data[i],comp_data[j]);
	END FOR;
    END FOR;
    FOR i IN components CREATE
	FOR j IN [components - [i]] CREATE
	    plots[i][j][plot_set[i][j]] ALIASES (
		triangle, curve[i][j]
		) WHERE plot_set[i][j] IS_A set OF symbol_constant
		WITH_VALUE ('triangle','profile');
	END FOR;
    END FOR;
    FOR i IN components CREATE
	FOR j IN [components - [i]] CREATE
	    plot[i][j] IS_A
		plt_plot_symbol(plot_set[i][j],
		plots[i][j]);
	END FOR;
    END FOR;

  METHODS
    METHOD default_self;
	x_points[0,2,3] := 0;
	x_points[1] := 1;
	y_points[0,1,3] := 0;
	y_points[2] := 1;
	FOR i IN components DO
	    FOR j IN [components - [i]] DO
		plot[i][j].title := 'i vs j';
		plot[i][j].YLabel := i;
		plot[i][j].XLabel := j;
		plot[i][j].Ylow := 0;
		plot[i][j].Yhigh := 1;
	    END FOR;
	END FOR;
    END default_self;
    METHOD default_all;
	RUN default_self;
    END default_all;
    METHOD scale_self;
    END scale_self;
    METHOD scale_all;
	RUN scale_self;
    END scale_all;
    METHOD bound_self;
    END bound_self;
    METHOD bound_all;
	RUN bound_self;
    END bound_all;
    METHOD check_self;
    END check_self;
    METHOD check_all;
	RUN check_self;
    END check_all;
END ternary_plot_right_all;

MODEL ternary_plot_equilateral_all(
    components WILL_BE set OF symbol_constant;
    npnts WILL_BE set OF integer_constant;
    comp_data[components][npnts] WILL_BE real;
    ) WHERE (
	CARD[components] = 3;
    );
    (* make triangle *)

    tcomp1[0..58] IS_A fraction;
    tcomp2[0..58] IS_A fraction;

    nt_points IS_A set OF integer_constant;
    nt_points :== [0..58];
    x_points[nt_points] IS_A fraction;
    y_points[nt_points] IS_A fraction;
    triangle IS_A plt_curve(nt_points,y_points,x_points);


    x_comp_top[1..2][components][npnts] IS_A fraction;
    y_comp_top[components][npnts] IS_A fraction;

    FOR i IN components CREATE
	FOR j IN npnts CREATE
	x_comp_top[1][i][j] = (comp_data[CHOICE[components - [i]]][j] +
	    comp_data[components - [i,CHOICE[components - [i]]]][j])/2;
	x_comp_top[2][i][j] = 1 - x_comp_top[1][i][j];
	y_comp_top[i][j] = 2 * abs(comp_data[CHOICE[components - [i]]][j]
	    - x_comp_top[1][i][j]);
	END FOR;
    END FOR;

    FOR i IN components CREATE
	FOR j IN [1..2] CREATE
	    curve[i][j] IS_A
		plt_curve(npnts,y_comp_top[i],x_comp_top[j][i]);
	END FOR;
    END FOR;

    FOR i IN components CREATE
	FOR j IN [1..2] CREATE
	    plots[i][j][plot_set[i][j]] ALIASES (
		triangle, curve[i][j]
		) WHERE plot_set[i][j] IS_A set OF symbol_constant
		WITH_VALUE ('triangle','profile');
	END FOR;
    END FOR;
    FOR i IN components CREATE
	FOR j IN [1..2] CREATE
	    plot[i][j] IS_A
		plt_plot_symbol(plot_set[i][j],
		plots[i][j]);
	END FOR;
    END FOR;

METHODS
METHOD default_self;
    FIX tcomp1[0..58];
    FIX tcomp2[0..58];

    tcomp1[0] := 1;
    tcomp2[0] := 0;
    FOR i IN [1..5] DO
	tcomp1[4*i-3] := 0;
	tcomp1[4*i-3+1] := 0;
	tcomp2[4*i-3] := tcomp1[4*i-3-1];
	tcomp2[4*i-3+1] := tcomp2[4*i-3] - 0.1;
	tcomp1[4*i-3+2] := tcomp2[4*i-3+1];
	tcomp1[4*i-3+3] := tcomp1[4*i-3+2] - 0.1;
	tcomp2[4*i-3+2] := 0;
	tcomp2[4*i-3+3] := 0;
    END FOR;

    FOR i IN [6..10] DO
	tcomp2[4*i-3] := tcomp2[4*i-4] + 0.1;
	tcomp2[4*i-3+1] := tcomp2[4*i-3];
	tcomp2[4*i-3+2] := tcomp2[4*i-3+1] + 0.1;
	tcomp2[4*i-3+3] := tcomp2[4*i-3+2];

	tcomp1[4*i-3] := 0;
	tcomp1[4*i-3+1] := 1 - tcomp2[4*i-3+1];
	tcomp1[4*i-3+2] := 1 - tcomp2[4*i-3+2];
	tcomp1[4*i-3+3] := 0;
    END FOR;
    tcomp1[40] := 0.1;
    tcomp2[40] := 0.9;
    FOR i IN [10..14] DO
	tcomp1[4*i+1] := tcomp1[4*i+1-1];
	tcomp1[4*i+1+1] := tcomp1[4*i+1] + 0.1;
	tcomp1[4*i+1+2] := tcomp1[4*i+1+1];
	tcomp1[4*i+1+3] := tcomp1[4*i+1+2] + 0.1;
	tcomp2[4*i+1] := 0;
	tcomp2[4*i+1+1] := 0;
	tcomp2[4*i+1+2] := 1 - tcomp1[4*i+1+2];
	tcomp2[4*i+1+3] := 1 - tcomp1[4*i+1+3];
    END FOR;
    tcomp1[59..60] := 1;
    tcomp2[59..60] := 0;
    FOR i IN components DO
	FOR j IN [1..2] DO
	    plot[i][j].title := 'i vs j';
	    plot[i][j].YLabel := i;
	    plot[i][j].XLabel := j;
	    plot[i][j].Ylow := 0;
	    plot[i][j].Yhigh := 1;
	END FOR;
    END FOR;

    FOR i IN nt_points DO
	x_points[i] := (tcomp2[i] - tcomp1[i] + 1)/2;
	y_points[i] := 2 * abs(tcomp2[i] - x_points[i]);
    END FOR;

END default_self;
METHOD default_all;
    RUN default_self;
END default_all;
METHOD scale_self;
END scale_self;
METHOD scale_all;
    RUN scale_self;
END scale_all;
METHOD bound_self;
END bound_self;
METHOD bound_all;
    RUN bound_self;
END bound_all;
METHOD check_self;
END check_self;
METHOD check_all;
    RUN check_self;
END check_all;

END ternary_plot_equilateral_all;

MODEL ternary_plot_right(
    Title IS_A symbol_constant;
    components WILL_BE set OF symbol_constant;
    y_comp IS_A symbol_constant;
    x_comp IS_A symbol_constant;
    npnts IS_A set OF integer_constant;
    comp_data[components][npnts] WILL_BE fraction;
    ) WHERE (
	CARD[components] = 3;
        y_comp IN components == TRUE;
	x_comp IN components == TRUE;
    );
    (* make triangle *)
    nt_points IS_A set OF integer_constant;
    nt_points :== [0..3];
    x_points[nt_points] IS_A real;
    y_points[nt_points] IS_A real;
    triangle IS_A plt_curve(nt_points,y_points,x_points);

    curve IS_A
	plt_curve(npnts,comp_data[y_comp],comp_data[x_comp]);

    plots[plot_set] ALIASES (
	triangle, curve
	) WHERE plot_set IS_A set OF symbol_constant
	WITH_VALUE ('triangle','profile');
    plot IS_A
	plt_plot_symbol(plot_set,
	plots);

METHODS
METHOD default_self;
    x_points[0,2,3] := 0;
    x_points[1] := 1;
    y_points[0,1,3] := 0;
    y_points[2] := 1;

    plot.title := Title;
    plot.YLabel := y_comp;
    plot.XLabel := x_comp;
    plot.Ylow := 0;
    plot.Yhigh := 1;
    plot.Xlow := 0;
    plot.Xhigh := 1;
    plots['profile'].legend := 'profile';
    plots['triangle'].legend := 'triangle';
END default_self;
METHOD default_all;
    RUN default_self;
END default_all;
METHOD scale_self;
END scale_self;
METHOD scale_all;
    RUN scale_self;
END scale_all;
METHOD bound_self;
END bound_self;
METHOD bound_all;
    RUN bound_self;
END bound_all;
METHOD check_self;
END check_self;
METHOD check_all;
    RUN check_self;
END check_all;
END ternary_plot_right;

MODEL ternary_plot_equilateral(
    Title IS_A symbol_constant;
    components WILL_BE set OF symbol_constant;
    left_comp IS_A symbol_constant;
    right_comp IS_A symbol_constant;
    npnts IS_A set OF integer_constant;
    comp_data[components][npnts] WILL_BE fraction;
    ) WHERE (
	CARD[components] = 3;
        left_comp IN components == TRUE;
	right_comp IN components == TRUE;
    );
    (* make triangle *)

    tcomp1[0..60] IS_A fraction;
    tcomp2[0..60] IS_A fraction;

    nt_points IS_A set OF integer_constant;
    nt_points :== [0..60];
    x_points[nt_points] IS_A fraction;
    y_points[nt_points] IS_A fraction;
    triangle IS_A plt_curve(nt_points,y_points,x_points);

    x_comp_eq[npnts] IS_A fraction;
    y_comp_eq[npnts] IS_A fraction;

    FOR i IN npnts CREATE
	x_comp_eq[i] = (comp_data[right_comp][i] -
	    comp_data[left_comp][i] + 1)/2;
	y_comp_eq[i] = 2 * abs(comp_data[right_comp][i] - x_comp_eq[i]);
    END FOR;

    curve IS_A
	plt_curve(npnts,y_comp_eq,x_comp_eq);

    plots[plot_set] ALIASES (
	triangle, curve
	) WHERE plot_set IS_A set OF symbol_constant
	WITH_VALUE ('triangle','profile');

    plot IS_A
	plt_plot_symbol(plot_set,
	plots);

METHODS
METHOD default_self;
    FIX tcomp1[0..58];
    FIX tcomp2[0..58];


    tcomp1[0] := 1;
    tcomp2[0] := 0;
    FOR i IN [1..5] DO
	tcomp1[4*i-3] := 0;
	tcomp1[4*i-3+1] := 0;
	tcomp2[4*i-3] := tcomp1[4*i-3-1];
	tcomp2[4*i-3+1] := tcomp2[4*i-3] - 0.1;
	tcomp1[4*i-3+2] := tcomp2[4*i-3+1];
	tcomp1[4*i-3+3] := tcomp1[4*i-3+2] - 0.1;
	tcomp2[4*i-3+2] := 0;
	tcomp2[4*i-3+3] := 0;
    END FOR;

    FOR i IN [6..10] DO
	tcomp2[4*i-3] := tcomp2[4*i-4] + 0.1;
	tcomp2[4*i-3+1] := tcomp2[4*i-3];
	tcomp2[4*i-3+2] := tcomp2[4*i-3+1] + 0.1;
	tcomp2[4*i-3+3] := tcomp2[4*i-3+2];

	tcomp1[4*i-3] := 0;
	tcomp1[4*i-3+1] := 1 - tcomp2[4*i-3+1];
	tcomp1[4*i-3+2] := 1 - tcomp2[4*i-3+2];
	tcomp1[4*i-3+3] := 0;
    END FOR;
    tcomp1[40] := 0.1;
    tcomp2[40] := 0.9;
    FOR i IN [10..14] DO
	tcomp1[4*i+1] := tcomp1[4*i+1-1];
	tcomp1[4*i+1+1] := tcomp1[4*i+1] + 0.1;
	tcomp1[4*i+1+2] := tcomp1[4*i+1+1];
	tcomp1[4*i+1+3] := tcomp1[4*i+1+2] + 0.1;
	tcomp2[4*i+1] := 0;
	tcomp2[4*i+1+1] := 0;
	tcomp2[4*i+1+2] := 1 - tcomp1[4*i+1+2];
	tcomp2[4*i+1+3] := 1 - tcomp1[4*i+1+3];
    END FOR;
    tcomp1[59..60] := 1;
    tcomp2[59..60] := 0;
    FOR i IN nt_points DO
	x_points[i] := (tcomp2[i] - tcomp1[i] + 1)/2;
	y_points[i] := 2 * abs(tcomp2[i] - x_points[i]);
    END FOR;
    plot.title := Title;
    FOR i IN [components - [left_comp] - [right_comp]] DO
	plot.YLabel := i;
    END FOR;
    plot.XLabel := right_comp;
    plot.Ylow := 0;
    plot.Yhigh := 1;
    plot.Xlow := 0;
    plot.Xhigh := 1;
    plots['profile'].legend := 'profile';
    plots['triangle'].legend := 'triangle';
END default_self;
METHOD default_all;
    RUN default_self;
END default_all;
METHOD scale_self;
END scale_self;
METHOD scale_all;
    RUN scale_self;
END scale_all;
METHOD bound_self;
END bound_self;
METHOD bound_all;
    RUN bound_self;
END bound_all;
METHOD check_self;
END check_self;
METHOD check_all;
    RUN check_self;
END check_all;
METHOD seqmod;
    FIX tcomp1[0..60];
    FIX tcomp2[0..60];
END seqmod;
METHOD reset;
    RUN seqmod;
    FIX comp_data[components][npnts];
END reset;
END ternary_plot_equilateral;

MODEL ternary_plot_equilateral2(
    Title IS_A symbol_constant;
    components WILL_BE set OF symbol_constant;
    left_comp IS_A symbol_constant;
    right_comp IS_A symbol_constant;
    curves IS_A set OF symbol_constant;
    curve[curves] WILL_BE plt_curve;
    ) WHERE (
	CARD[components] = 3;
        left_comp IN components == TRUE;
	right_comp IN components == TRUE;
    );
    (* make triangle *)

    tcomp1[0..60] IS_A fraction;
    tcomp2[0..60] IS_A fraction;

    nt_points IS_A set OF integer_constant;
    nt_points :== [0..60];
    x_points[nt_points] IS_A fraction;
    y_points[nt_points] IS_A fraction;
    triangle IS_A plt_curve(nt_points,y_points,x_points);

    plots[plot_set] ALIASES (
	triangle, curve[curves]
	) WHERE plot_set IS_A set OF symbol_constant
	WITH_VALUE ('triangle',curves);

    plot IS_A
	plt_plot_symbol(plot_set,
	plots);

METHODS
METHOD default_self;
    FIX tcomp1[0..58];
    FIX tcomp2[0..58];


    tcomp1[0] := 1;
    tcomp2[0] := 0;
    FOR i IN [1..5] DO
	tcomp1[4*i-3] := 0;
	tcomp1[4*i-3+1] := 0;
	tcomp2[4*i-3] := tcomp1[4*i-3-1];
	tcomp2[4*i-3+1] := tcomp2[4*i-3] - 0.1;
	tcomp1[4*i-3+2] := tcomp2[4*i-3+1];
	tcomp1[4*i-3+3] := tcomp1[4*i-3+2] - 0.1;
	tcomp2[4*i-3+2] := 0;
	tcomp2[4*i-3+3] := 0;
    END FOR;

    FOR i IN [6..10] DO
	tcomp2[4*i-3] := tcomp2[4*i-4] + 0.1;
	tcomp2[4*i-3+1] := tcomp2[4*i-3];
	tcomp2[4*i-3+2] := tcomp2[4*i-3+1] + 0.1;
	tcomp2[4*i-3+3] := tcomp2[4*i-3+2];

	tcomp1[4*i-3] := 0;
	tcomp1[4*i-3+1] := 1 - tcomp2[4*i-3+1];
	tcomp1[4*i-3+2] := 1 - tcomp2[4*i-3+2];
	tcomp1[4*i-3+3] := 0;
    END FOR;
    tcomp1[40] := 0.1;
    tcomp2[40] := 0.9;
    FOR i IN [10..14] DO
	tcomp1[4*i+1] := tcomp1[4*i+1-1];
	tcomp1[4*i+1+1] := tcomp1[4*i+1] + 0.1;
	tcomp1[4*i+1+2] := tcomp1[4*i+1+1];
	tcomp1[4*i+1+3] := tcomp1[4*i+1+2] + 0.1;
	tcomp2[4*i+1] := 0;
	tcomp2[4*i+1+1] := 0;
	tcomp2[4*i+1+2] := 1 - tcomp1[4*i+1+2];
	tcomp2[4*i+1+3] := 1 - tcomp1[4*i+1+3];
    END FOR;
    tcomp1[59..60] := 1;
    tcomp2[59..60] := 0;
    FOR i IN nt_points DO
	x_points[i] := (tcomp2[i] - tcomp1[i] + 1)/2;
	y_points[i] := 2 * abs(tcomp2[i] - x_points[i]);
    END FOR;
    plot.title := Title;
    FOR i IN [components - [left_comp] - [right_comp]] DO
	plot.YLabel := i;
    END FOR;
    plot.XLabel := right_comp;
    plot.Ylow := 0;
    plot.Yhigh := 1;
    plot.Xlow := 0;
    plot.Xhigh := 1;
    FOR j IN curves DO
	plots[j].legend := j;
    END FOR;
    plots['triangle'].legend := 'triangle';

END default_self;
METHOD default_all;
    RUN default_self;
END default_all;
METHOD scale_self;
END scale_self;
METHOD scale_all;
    RUN scale_self;
END scale_all;
METHOD bound_self;
END bound_self;
METHOD bound_all;
    RUN bound_self;
END bound_all;
METHOD check_self;
END check_self;
METHOD check_all;
    RUN check_self;
END check_all;
METHOD values;
END values;
METHOD seqmod;
    FIX tcomp1[0..60];
    FIX tcomp2[0..60];
END seqmod;
END ternary_plot_equilateral2;