-
Notifications
You must be signed in to change notification settings - Fork 1
/
arrow55.mp
112 lines (81 loc) · 2.83 KB
/
arrow55.mp
1
2
3
4
5
6
7
8
9
10
11
12
13
14
15
16
17
18
19
20
21
22
23
24
25
26
27
28
29
30
31
32
33
34
35
36
37
38
39
40
41
42
43
44
45
46
47
48
49
50
51
52
53
54
55
56
57
58
59
60
61
62
63
64
65
66
67
68
69
70
71
72
73
74
75
76
77
78
79
80
81
82
83
84
85
86
87
88
89
90
91
92
93
94
95
96
97
98
99
100
101
102
103
104
105
106
107
108
109
110
111
112
% tex/conc/mp/arrow55.mp 2013-9-10 Alan U. Kennington.
% $Id: tex/conc/mp/arrow55.mp 47edb0f945 2013-09-09 15:29:41Z Alan U. Kennington $
% Duality and isomorphism relations between antisymmetric tensor spaces.
input mapmax.mp
verbatimtex
\input akmath
\input dgmpmax
etex
beginfig(1);
pair w[];
a := 3.0cm;
b := 2.0cm;
q := 0.36cm;
qq := 0.4cm;
qqx := 0.45cm;
qqq := 0.58cm;
qqqq := 1.04cm;
qqqqq := 0.8cm;
penLN := 0.5bp;
w0 := (0,0);
w1 := (0,b);
w2 := (a,0);
w3 := (a,b);
w4 := (2a,0);
w5 := (2a,b);
w6 := (3a,0);
w7 := (3a,b);
w10 := w0 + (-0.5a,0);
w20 := 0.5[w2,w4]+(0,-0.7b);
w21 := 0.5[w3,w5]+(0,0.7b);
% The labels for the spaces.
label(btex \strut$V$ etex, w0);
label(btex \strut$V^*$ etex, w1);
label(btex \strut$V^{**}$ etex, w10);
label(btex \strut$\Lamb mV^*$ etex, w2);
label(btex \strut$\Lamb mV$ etex, w3);
label(btex \strut$\Wedg m V$ etex, w4);
label(btex \strut$\Wedg m V^*$ etex, w5);
label(btex \strut$\bigl(\Wedg m V^*\bigr)^*$ etex, w6);
label(btex \strut$\bigl(\Wedg m V\bigr)^*$ etex, w7);
label(btex \strut$\botimesr^mV/\perpsp{(\Lamb m V)}$ etex, w20);
label(btex \strut$\botimesr^mV^*/\perpsp{(\Lamb m V^*)}$ etex, w21);
% The arrows.
pickup pencircle scaled penLN;
S_arrowspaces(w0,w1,q,q,1,black);
S_arrowspaces(w1,w10,q,q,1,black);
S_arrowspaces(w0,w10,q,q,3,black);
S_arrowspaces(w0,w3,qq,qqq,1,black);
S_arrowspaces(w1,w2,qq,qqq,1,black);
S_arrowspaces(w2,w5,qqq,qqq,1,black);
S_arrowspaces(w3,w4,qqq,qqq,1,black);
S_arrowspaces(w4,w7,qqq,qqq,1,black);
S_arrowspaces(w5,w6,qqq,qqq,1,black);
S_arrowspaces(w2,w4,qqq,qqq,3,black);
S_arrowspaces(w3,w5,qqq,qqq,3,black);
S_arrowspaces(w4,w6,qqq,qqqqq,3,black);
S_arrowspaces(w5,w7,qqq,qqqqq,3,black);
S_arrowspaces(w20,w4,qqx,qqx,3,black);
S_arrowspacesstyle(w2,w20,qqx,qqx,3)(dashed evenly withcolor black);
S_arrowspaces(w21,w5,qqx,qqx,3,black);
S_arrowspacesstyle(w3,w21,qqx,qqx,3)(dashed evenly withcolor black);
% The arrow labels.
label.rt(btex dual etex, 0.5[w0,w1]+(-1.5pt,0));
label.ulft(btex dual etex, 0.5[w1,w10]);
label.bot(btex iso etex, 0.5[w0,w10]);
S_tiltlabel(btex $m$-dual etex, 0.28[w1,w2], angle(w2-w1));
S_tiltlabel_bot(btex $m$-dual etex, 0.28[w0,w3], angle(w3-w0));
S_tiltlabel(btex dual etex, 0.35[w3,w4], angle(w4-w3));
S_tiltlabel_bot(btex dual etex, 0.35[w2,w5], angle(w5-w2));
S_tiltlabel(btex dual etex, 0.35[w5,w6], angle(w6-w5));
S_tiltlabel_bot(btex dual etex, 0.35[w4,w7], angle(w7-w4));
label.bot(btex iso etex, 0.5[w2,w4]+((qqq-qqq)/2,0));
label.top(btex iso etex, 0.5[w3,w5]+((qqq-qqq)/2,0));
label.bot(btex iso etex, 0.5[w4,w6]+((qqq-qqqqq)/2,0));
label.top(btex iso etex, 0.5[w5,w7]+((qqq-qqqqq)/2,0));
S_tiltlabel(btex iso etex, 0.5[w20,w4], angle(w4-w20));
S_tiltlabel(btex iso etex, 0.5[w2,w20], angle(w20-w2));
S_tiltlabel(btex iso etex, 0.5[w3,w21], angle(w21-w3));
S_tiltlabel(btex iso etex, 0.5[w21,w5], angle(w5-w21));
endfig;
end