1 /* Copyright 2017 Mathias Andersson <wraul@dbox.se>
3 * This program is free software: you can redistribute it and/or modify
4 * it under the terms of the GNU General Public License as published by
5 * the Free Software Foundation, either version 2 of the License, or
6 * (at your option) any later version.
8 * This program is distributed in the hope that it will be useful,
9 * but WITHOUT ANY WARRANTY; without even the implied warranty of
10 * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
11 * GNU General Public License for more details.
13 * You should have received a copy of the GNU General Public License
14 * along with this program. If not, see <http://www.gnu.org/licenses/>.
26 KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D, \
27 KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D, \
28 KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, \
29 KA6, KA7, K30, K31, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, K3D, \
30 KA8, KA9, K40, K41, K42, K44, K46, K47, K49, K4A, K4B, K4C, K4D \
32 { KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D }, \
33 { KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D }, \
34 { KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, ___ }, \
35 { KA6, KA7, K30, K31, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, K3D }, \
36 { KA8, KA9, K40, K41, K42, ___, K44, ___, K46, K47, ___, K49, K4A, K4B, K4C, K4D } \
39 #define LAYOUT_ansi( \
40 KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D, \
41 KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D, \
42 KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, \
43 KA6, KA7, K30, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, \
44 KA8, KA9, K40, K41, K42, K46, K49, K4A, K4C, K4D \
46 { KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D }, \
47 { KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D }, \
48 { KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, ___ }, \
49 { KA6, KA7, K30, ___, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, ___ }, \
50 { KA8, KA9, K40, K41, K42, ___, ___, ___, K46, ___, ___, K49, K4A, ___, K4C, K4D } \
53 #define LAYOUT_ansi_arrows( \
54 KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D, \
55 KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D, \
56 KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, \
57 KA6, KA7, K30, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, K3D, \
58 KA8, KA9, K40, K41, K42, K46, K49, K4A, K4B, K4C, K4D \
60 { KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D }, \
61 { KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D }, \
62 { KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, ___ }, \
63 { KA6, KA7, K30, ___, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, K3D }, \
64 { KA8, KA9, K40, K41, K42, ___, ___, ___, K46, ___, ___, K49, K4A, K4B, K4C, K4D } \
67 #define LAYOUT_ansi_split( \
68 KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D, \
69 KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D, \
70 KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, \
71 KA6, KA7, K30, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, \
72 KA8, KA9, K40, K41, K42, K44, K46, K47, K49, K4A, K4C, K4D \
74 { KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D }, \
75 { KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D }, \
76 { KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, ___ }, \
77 { KA6, KA7, K30, ___, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, ___ }, \
78 { KA8, KA9, K40, K41, K42, ___, K44, ___, K46, K47, ___, K49, K4A, ___, K4C, K4D } \
81 #define LAYOUT_ansi_split_arrows( \
82 KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D, \
83 KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D, \
84 KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, \
85 KA6, KA7, K30, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, K3D, \
86 KA8, KA9, K40, K41, K42, K44, K46, K47, K49, K4A, K4B, K4C, K4D \
88 { KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D }, \
89 { KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D }, \
90 { KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, ___ }, \
91 { KA6, KA7, K30, ___, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, K3D }, \
92 { KA8, KA9, K40, K41, K42, ___, K44, ___, K46, K47, ___, K49, K4A, K4B, K4C, K4D } \
96 KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D, \
97 KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D, \
98 KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, \
99 KA6, KA7, K30, K31, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, \
100 KA8, KA9, K40, K41, K42, K46, K49, K4A, K4C, K4D \
102 { KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D }, \
103 { KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D }, \
104 { KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, ___ }, \
105 { KA6, KA7, K30, K31, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, ___ }, \
106 { KA8, KA9, K40, K41, K42, ___, ___, ___, K46, ___, ___, K49, K4A, ___, K4C, K4D } \
109 #define LAYOUT_iso_arrows( \
110 KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D, \
111 KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D, \
112 KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, \
113 KA6, KA7, K30, K31, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, K3D, \
114 KA8, KA9, K40, K41, K42, K46, K49, K4A, K4B, K4C, K4D \
116 { KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D }, \
117 { KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D }, \
118 { KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, ___ }, \
119 { KA6, KA7, K30, K31, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, K3D }, \
120 { KA8, KA9, K40, K41, K42, ___, ___, ___, K46, ___, ___, K49, K4A, K4B, K4C, K4D } \
123 #define LAYOUT_iso_split( \
124 KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D, \
125 KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D, \
126 KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, \
127 KA6, KA7, K30, K31, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, \
128 KA8, KA9, K40, K41, K42, K44, K46, K47, K49, K4A, K4C, K4D \
130 { KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D }, \
131 { KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D }, \
132 { KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, ___ }, \
133 { KA6, KA7, K30, K31, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, ___ }, \
134 { KA8, KA9, K40, K41, K42, ___, K44, ___, K46, K47, ___, K49, K4A, ___, K4C, K4D } \
137 #define LAYOUT_iso_split_arrows( \
138 KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D, \
139 KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D, \
140 KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, \
141 KA6, KA7, K30, K31, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, K3D, \
142 KA8, KA9, K40, K41, K42, K44, K46, K47, K49, K4A, K4B, K4C, K4D \
144 { KA0, KA1, K00, K01, K02, K03, K04, K05, K06, K07, K08, K09, K0A, K0B, K0C, K0D }, \
145 { KA2, KA3, K10, K11, K12, K13, K14, K15, K16, K17, K18, K19, K1A, K1B, K1C, K1D }, \
146 { KA4, KA5, K20, K21, K22, K23, K24, K25, K26, K27, K28, K29, K2A, K2B, K2C, ___ }, \
147 { KA6, KA7, K30, K31, K32, K33, K34, K35, K36, K37, K38, K39, K3A, K3B, K3C, K3D }, \
148 { KA8, KA9, K40, K41, K42, ___, K44, ___, K46, K47, ___, K49, K4A, K4B, K4C, K4D } \