/usr/share/texmf-texlive/metapost/cmarrows/sgbx0021.mp is in texlive-metapost 2009-15.
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%% Copyright 2006 Tommy Ekola <tek@kth.se>
%
% This work may be distributed and/or modified under the conditions of
% the LaTeX Project Public License, either version 1.3 of this license
% or (at your option) any later version. The latest version of this
% license is in http://www.latex-project.org/lppl.txt
%
% This work has the LPPL maintenance status `maintained'. The Current
% Maintainer of this work is Tommy Ekola. The Base Interpreter is
% MetaPost.
vardef setup_shortaxisarrow(expr source_file, cmdname) =
scantokens ("input tgbx0000");
scantokens ("input " & source_file);
expandafter def scantokens cmdname expr p =
scantokens (cmdname & "__sgbxww")(p)
enddef;
expandafter vardef scantokens (cmdname & "__sgbxww " & "(expr apth) " &
"text text_ = " &
"save math_spread, x_height, u, rule_thickness, bar, math_axis," &
" asc_height, eps, monospace;" &
"boolean monospace;" &
"math_spread :=" & decimal math_spread & ";" &
"x_height# :=" & decimal x_height# & ";" &
"u# :=" & decimal u# & ";" &
"rule_thickness# :=" & decimal rule_thickness# & ";" &
"bar# :=" & decimal bar# & ";" &
"math_axis# :=" & decimal math_axis# & ";" &
"asc_height# :=" & decimal asc_height# & ";" &
"eps :=" & decimal eps & ";" &
"monospace :=" & if monospace: "true" else: "false" fi & ";")
save prevpen;
prevpen:=savepen;
save x,y;
numeric x[], x[]', x[]l, x[]'l, x[]r, x[]'r,
y[], y[]', y[]l, y[]'l, y[]r, y[]'r;
save spread, w;
numeric spread, w;
pickup pencircle scaled rule_thickness#;
spread = math_spread[.45x_height#, .55x_height#];
w = 9u#;
penpos1(.25rule_thickness#, 90); penpos2(.25rule_thickness#, 90);
penpos3(bar#, 0); penpos4(bar#, 0);
y0=y1=y2=math_axis#;
x1=1.5u#-eps;
rt x0=w-x1;
y3-y0=y0-y4=.24asc_height#+eps; x3=x4=x0-3u#-eps;
penpos5(bar#, angle(z4-z0)); z5l=z0; penpos6(bar#, angle(z3-z0)); z6l=z0;
z9=.381966[.5[z3,z4],z0];
save pp; path pp; pp=z4l{z9-z4}..z6r;
save t; numeric t;
t=xpart(pp intersectiontimes ((0,y2l)--(w,y2l))); x2=xpart point t of pp;
save mapto, n;
vardef mapto(text t) =
hide(numeric n; n:=0;
numeric x,x_[],y,y_[];
for z=t: z_[incr n]:=z; endfor;
transform T;
z_2 = z_1 transformed T;
z_4 = z_3 transformed T;
z_6 = z_5 transformed T;)
T
enddef;
save T; transform T;
save tt; numeric tt; tt = arctime(arclength apth - (x5l-x2)) of apth;
save ttt; numeric ttt; ttt = arctime(arclength apth - (x5l-x3)) of apth;
% Draw the right half of the arrow head
save right_arrowhead, pa;
vardef right_arrowhead(expr T,s) =
(subpath(0, xpart ((z0..{z4-z9}z4r) intersectiontimes
(point s of pp -- point s of pp + (2rule_thickness#,0))))
of (z0..{z4-z9}z4r)--subpath(s,t) of pp--z2l) transformed T
enddef;
if arclength apth = 0:
T:=identity shifted (point (length apth) of apth - z0);
elseif arclength apth < x0-x3l:
T:=identity rotatedaround(z0,angle (direction (length apth) of apth))
shifted (point (length apth) of apth - z0);
else:
T:=mapto(z0,
point (length apth) of apth,
z2,
point tt of apth,
(x3,y9)-(0,3rule_thickness#),
point ttt of apth -
3rule_thickness#*(unitvector (direction tt of apth)
rotated 90));
fi
save f,s;
vardef f(expr s) =
length(point s of (pp transformed T) - point tt of apth)
< length(point 0 of pp - z2)
enddef;
if f(0) or (arclength apth < x0-x3l): s := 0;
else: s := solve f(length pp, 0);
fi
path pa;
pa := right_arrowhead(T,s);
% Draw the left part of the arrow head
pp := (z3l{z9-z3}..z5r);
save pq; path pq; pq := (z3r{z9-z3}..z0);
save left_texarrowhead, pb;
vardef left_texarrowhead(expr T, s) =
(z2r--subpath(t,s) of pp
--subpath(xpart ( pq intersectiontimes
(point s of pp -- point s of pp + (2rule_thickness#,0)))
,length pq) of pq) transformed T
enddef;
if arclength apth = 0:
T:=identity shifted (point (length apth) of apth - z0);
elseif arclength apth < x0-x3l:
T:=identity rotatedaround(z0,angle (direction (length apth) of apth))
shifted (point (length apth) of apth - z0);
else:
T:=mapto(z0,
point (length apth) of apth,
z2,
point tt of apth,
(x3,y9)+(0,3rule_thickness#),
point ttt of apth +
3rule_thickness#*(unitvector (direction tt of apth)
rotated 90));
fi
vardef f(expr s) =
length(point s of (pp transformed T) - point tt of apth)
< length(point 0 of pp - z2)
enddef;
if f(0) or (arclength apth < x0-x3l): s := 0;
else: s := solve f(length pp, 0);
fi
path pb;
pb := left_texarrowhead(T,s);
filldraw pa--pb--cycle text_;
% Draw the path
if arclength apth > x0-x2:
draw subpath(0,tt) of apth withpen pencircle scaled 1.25rule_thickness#
text_;
fi
pickup prevpen;
enddef;
enddef;
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