1 | /* SPDX-License-Identifier: GPL-2.0-or-later */ |
2 | /* |
3 | * Calculate a CRC T10DIF with vpmsum acceleration |
4 | * |
5 | * Constants generated by crc32-vpmsum, available at |
6 | * https://github.com/antonblanchard/crc32-vpmsum |
7 | * |
8 | * crc32-vpmsum is |
9 | * Copyright (C) 2015 Anton Blanchard <anton@au.ibm.com>, IBM |
10 | */ |
11 | .section .rodata |
12 | .balign 16 |
13 | |
14 | .byteswap_constant: |
15 | /* byte reverse permute constant */ |
16 | .octa 0x0F0E0D0C0B0A09080706050403020100 |
17 | |
18 | .constants: |
19 | |
20 | /* Reduce 262144 kbits to 1024 bits */ |
21 | /* x^261184 mod p(x), x^261120 mod p(x) */ |
22 | .octa 0x0000000056d300000000000052550000 |
23 | |
24 | /* x^260160 mod p(x), x^260096 mod p(x) */ |
25 | .octa 0x00000000ee67000000000000a1e40000 |
26 | |
27 | /* x^259136 mod p(x), x^259072 mod p(x) */ |
28 | .octa 0x0000000060830000000000004ad10000 |
29 | |
30 | /* x^258112 mod p(x), x^258048 mod p(x) */ |
31 | .octa 0x000000008cfe0000000000009ab40000 |
32 | |
33 | /* x^257088 mod p(x), x^257024 mod p(x) */ |
34 | .octa 0x000000003e93000000000000fdb50000 |
35 | |
36 | /* x^256064 mod p(x), x^256000 mod p(x) */ |
37 | .octa 0x000000003c2000000000000045480000 |
38 | |
39 | /* x^255040 mod p(x), x^254976 mod p(x) */ |
40 | .octa 0x00000000b1fc0000000000008d690000 |
41 | |
42 | /* x^254016 mod p(x), x^253952 mod p(x) */ |
43 | .octa 0x00000000f82b00000000000024ad0000 |
44 | |
45 | /* x^252992 mod p(x), x^252928 mod p(x) */ |
46 | .octa 0x0000000044420000000000009f1a0000 |
47 | |
48 | /* x^251968 mod p(x), x^251904 mod p(x) */ |
49 | .octa 0x00000000e88c00000000000066ec0000 |
50 | |
51 | /* x^250944 mod p(x), x^250880 mod p(x) */ |
52 | .octa 0x00000000385c000000000000c87d0000 |
53 | |
54 | /* x^249920 mod p(x), x^249856 mod p(x) */ |
55 | .octa 0x000000003227000000000000c8ff0000 |
56 | |
57 | /* x^248896 mod p(x), x^248832 mod p(x) */ |
58 | .octa 0x00000000a9a900000000000033440000 |
59 | |
60 | /* x^247872 mod p(x), x^247808 mod p(x) */ |
61 | .octa 0x00000000abaa00000000000066eb0000 |
62 | |
63 | /* x^246848 mod p(x), x^246784 mod p(x) */ |
64 | .octa 0x000000001ac3000000000000c4ef0000 |
65 | |
66 | /* x^245824 mod p(x), x^245760 mod p(x) */ |
67 | .octa 0x0000000063f000000000000056f30000 |
68 | |
69 | /* x^244800 mod p(x), x^244736 mod p(x) */ |
70 | .octa 0x0000000032cc00000000000002050000 |
71 | |
72 | /* x^243776 mod p(x), x^243712 mod p(x) */ |
73 | .octa 0x00000000f8b5000000000000568e0000 |
74 | |
75 | /* x^242752 mod p(x), x^242688 mod p(x) */ |
76 | .octa 0x000000008db100000000000064290000 |
77 | |
78 | /* x^241728 mod p(x), x^241664 mod p(x) */ |
79 | .octa 0x0000000059ca0000000000006b660000 |
80 | |
81 | /* x^240704 mod p(x), x^240640 mod p(x) */ |
82 | .octa 0x000000005f5c00000000000018f80000 |
83 | |
84 | /* x^239680 mod p(x), x^239616 mod p(x) */ |
85 | .octa 0x0000000061af000000000000b6090000 |
86 | |
87 | /* x^238656 mod p(x), x^238592 mod p(x) */ |
88 | .octa 0x00000000e29e000000000000099a0000 |
89 | |
90 | /* x^237632 mod p(x), x^237568 mod p(x) */ |
91 | .octa 0x000000000975000000000000a8360000 |
92 | |
93 | /* x^236608 mod p(x), x^236544 mod p(x) */ |
94 | .octa 0x0000000043900000000000004f570000 |
95 | |
96 | /* x^235584 mod p(x), x^235520 mod p(x) */ |
97 | .octa 0x00000000f9cd000000000000134c0000 |
98 | |
99 | /* x^234560 mod p(x), x^234496 mod p(x) */ |
100 | .octa 0x000000007c29000000000000ec380000 |
101 | |
102 | /* x^233536 mod p(x), x^233472 mod p(x) */ |
103 | .octa 0x000000004c6a000000000000b0d10000 |
104 | |
105 | /* x^232512 mod p(x), x^232448 mod p(x) */ |
106 | .octa 0x00000000e7290000000000007d3e0000 |
107 | |
108 | /* x^231488 mod p(x), x^231424 mod p(x) */ |
109 | .octa 0x00000000f1ab000000000000f0b20000 |
110 | |
111 | /* x^230464 mod p(x), x^230400 mod p(x) */ |
112 | .octa 0x0000000039db0000000000009c270000 |
113 | |
114 | /* x^229440 mod p(x), x^229376 mod p(x) */ |
115 | .octa 0x000000005e2800000000000092890000 |
116 | |
117 | /* x^228416 mod p(x), x^228352 mod p(x) */ |
118 | .octa 0x00000000d44e000000000000d5ee0000 |
119 | |
120 | /* x^227392 mod p(x), x^227328 mod p(x) */ |
121 | .octa 0x00000000cd0a00000000000041f50000 |
122 | |
123 | /* x^226368 mod p(x), x^226304 mod p(x) */ |
124 | .octa 0x00000000c5b400000000000010520000 |
125 | |
126 | /* x^225344 mod p(x), x^225280 mod p(x) */ |
127 | .octa 0x00000000fd2100000000000042170000 |
128 | |
129 | /* x^224320 mod p(x), x^224256 mod p(x) */ |
130 | .octa 0x000000002f2500000000000095c20000 |
131 | |
132 | /* x^223296 mod p(x), x^223232 mod p(x) */ |
133 | .octa 0x000000001b0100000000000001ce0000 |
134 | |
135 | /* x^222272 mod p(x), x^222208 mod p(x) */ |
136 | .octa 0x000000000d430000000000002aca0000 |
137 | |
138 | /* x^221248 mod p(x), x^221184 mod p(x) */ |
139 | .octa 0x0000000030a6000000000000385e0000 |
140 | |
141 | /* x^220224 mod p(x), x^220160 mod p(x) */ |
142 | .octa 0x00000000e37b0000000000006f7a0000 |
143 | |
144 | /* x^219200 mod p(x), x^219136 mod p(x) */ |
145 | .octa 0x00000000873600000000000024320000 |
146 | |
147 | /* x^218176 mod p(x), x^218112 mod p(x) */ |
148 | .octa 0x00000000e9fb000000000000bd9c0000 |
149 | |
150 | /* x^217152 mod p(x), x^217088 mod p(x) */ |
151 | .octa 0x000000003b9500000000000054bc0000 |
152 | |
153 | /* x^216128 mod p(x), x^216064 mod p(x) */ |
154 | .octa 0x00000000133e000000000000a4660000 |
155 | |
156 | /* x^215104 mod p(x), x^215040 mod p(x) */ |
157 | .octa 0x00000000784500000000000079930000 |
158 | |
159 | /* x^214080 mod p(x), x^214016 mod p(x) */ |
160 | .octa 0x00000000b9800000000000001bb80000 |
161 | |
162 | /* x^213056 mod p(x), x^212992 mod p(x) */ |
163 | .octa 0x00000000687600000000000024400000 |
164 | |
165 | /* x^212032 mod p(x), x^211968 mod p(x) */ |
166 | .octa 0x00000000aff300000000000029e10000 |
167 | |
168 | /* x^211008 mod p(x), x^210944 mod p(x) */ |
169 | .octa 0x0000000024b50000000000005ded0000 |
170 | |
171 | /* x^209984 mod p(x), x^209920 mod p(x) */ |
172 | .octa 0x0000000017e8000000000000b12e0000 |
173 | |
174 | /* x^208960 mod p(x), x^208896 mod p(x) */ |
175 | .octa 0x00000000128400000000000026d20000 |
176 | |
177 | /* x^207936 mod p(x), x^207872 mod p(x) */ |
178 | .octa 0x000000002115000000000000a32a0000 |
179 | |
180 | /* x^206912 mod p(x), x^206848 mod p(x) */ |
181 | .octa 0x000000009595000000000000a1210000 |
182 | |
183 | /* x^205888 mod p(x), x^205824 mod p(x) */ |
184 | .octa 0x00000000281e000000000000ee8b0000 |
185 | |
186 | /* x^204864 mod p(x), x^204800 mod p(x) */ |
187 | .octa 0x0000000006010000000000003d0d0000 |
188 | |
189 | /* x^203840 mod p(x), x^203776 mod p(x) */ |
190 | .octa 0x00000000e2b600000000000034e90000 |
191 | |
192 | /* x^202816 mod p(x), x^202752 mod p(x) */ |
193 | .octa 0x000000001bd40000000000004cdb0000 |
194 | |
195 | /* x^201792 mod p(x), x^201728 mod p(x) */ |
196 | .octa 0x00000000df2800000000000030e90000 |
197 | |
198 | /* x^200768 mod p(x), x^200704 mod p(x) */ |
199 | .octa 0x0000000049c200000000000042590000 |
200 | |
201 | /* x^199744 mod p(x), x^199680 mod p(x) */ |
202 | .octa 0x000000009b97000000000000df950000 |
203 | |
204 | /* x^198720 mod p(x), x^198656 mod p(x) */ |
205 | .octa 0x000000006184000000000000da7b0000 |
206 | |
207 | /* x^197696 mod p(x), x^197632 mod p(x) */ |
208 | .octa 0x00000000461700000000000012510000 |
209 | |
210 | /* x^196672 mod p(x), x^196608 mod p(x) */ |
211 | .octa 0x000000009b40000000000000f37e0000 |
212 | |
213 | /* x^195648 mod p(x), x^195584 mod p(x) */ |
214 | .octa 0x00000000eeb2000000000000ecf10000 |
215 | |
216 | /* x^194624 mod p(x), x^194560 mod p(x) */ |
217 | .octa 0x00000000b2e800000000000050f20000 |
218 | |
219 | /* x^193600 mod p(x), x^193536 mod p(x) */ |
220 | .octa 0x00000000f59a000000000000e0b30000 |
221 | |
222 | /* x^192576 mod p(x), x^192512 mod p(x) */ |
223 | .octa 0x00000000467f0000000000004d5a0000 |
224 | |
225 | /* x^191552 mod p(x), x^191488 mod p(x) */ |
226 | .octa 0x00000000da92000000000000bb010000 |
227 | |
228 | /* x^190528 mod p(x), x^190464 mod p(x) */ |
229 | .octa 0x000000001e1000000000000022a40000 |
230 | |
231 | /* x^189504 mod p(x), x^189440 mod p(x) */ |
232 | .octa 0x0000000058fe000000000000836f0000 |
233 | |
234 | /* x^188480 mod p(x), x^188416 mod p(x) */ |
235 | .octa 0x00000000b9ce000000000000d78d0000 |
236 | |
237 | /* x^187456 mod p(x), x^187392 mod p(x) */ |
238 | .octa 0x0000000022210000000000004f8d0000 |
239 | |
240 | /* x^186432 mod p(x), x^186368 mod p(x) */ |
241 | .octa 0x00000000744600000000000033760000 |
242 | |
243 | /* x^185408 mod p(x), x^185344 mod p(x) */ |
244 | .octa 0x000000001c2e000000000000a1e50000 |
245 | |
246 | /* x^184384 mod p(x), x^184320 mod p(x) */ |
247 | .octa 0x00000000dcc8000000000000a1a40000 |
248 | |
249 | /* x^183360 mod p(x), x^183296 mod p(x) */ |
250 | .octa 0x00000000910f00000000000019a20000 |
251 | |
252 | /* x^182336 mod p(x), x^182272 mod p(x) */ |
253 | .octa 0x0000000055d5000000000000f6ae0000 |
254 | |
255 | /* x^181312 mod p(x), x^181248 mod p(x) */ |
256 | .octa 0x00000000c8ba000000000000a7ac0000 |
257 | |
258 | /* x^180288 mod p(x), x^180224 mod p(x) */ |
259 | .octa 0x0000000031f8000000000000eea20000 |
260 | |
261 | /* x^179264 mod p(x), x^179200 mod p(x) */ |
262 | .octa 0x000000001966000000000000c4d90000 |
263 | |
264 | /* x^178240 mod p(x), x^178176 mod p(x) */ |
265 | .octa 0x00000000b9810000000000002b470000 |
266 | |
267 | /* x^177216 mod p(x), x^177152 mod p(x) */ |
268 | .octa 0x000000008303000000000000f7cf0000 |
269 | |
270 | /* x^176192 mod p(x), x^176128 mod p(x) */ |
271 | .octa 0x000000002ce500000000000035b30000 |
272 | |
273 | /* x^175168 mod p(x), x^175104 mod p(x) */ |
274 | .octa 0x000000002fae0000000000000c7c0000 |
275 | |
276 | /* x^174144 mod p(x), x^174080 mod p(x) */ |
277 | .octa 0x00000000f50c0000000000009edf0000 |
278 | |
279 | /* x^173120 mod p(x), x^173056 mod p(x) */ |
280 | .octa 0x00000000714f00000000000004cd0000 |
281 | |
282 | /* x^172096 mod p(x), x^172032 mod p(x) */ |
283 | .octa 0x00000000c161000000000000541b0000 |
284 | |
285 | /* x^171072 mod p(x), x^171008 mod p(x) */ |
286 | .octa 0x0000000021c8000000000000e2700000 |
287 | |
288 | /* x^170048 mod p(x), x^169984 mod p(x) */ |
289 | .octa 0x00000000b93d00000000000009a60000 |
290 | |
291 | /* x^169024 mod p(x), x^168960 mod p(x) */ |
292 | .octa 0x00000000fbcf000000000000761c0000 |
293 | |
294 | /* x^168000 mod p(x), x^167936 mod p(x) */ |
295 | .octa 0x0000000026350000000000009db30000 |
296 | |
297 | /* x^166976 mod p(x), x^166912 mod p(x) */ |
298 | .octa 0x00000000b64f0000000000003e9f0000 |
299 | |
300 | /* x^165952 mod p(x), x^165888 mod p(x) */ |
301 | .octa 0x00000000bd0e00000000000078590000 |
302 | |
303 | /* x^164928 mod p(x), x^164864 mod p(x) */ |
304 | .octa 0x00000000d9360000000000008bc80000 |
305 | |
306 | /* x^163904 mod p(x), x^163840 mod p(x) */ |
307 | .octa 0x000000002f140000000000008c9f0000 |
308 | |
309 | /* x^162880 mod p(x), x^162816 mod p(x) */ |
310 | .octa 0x000000006a270000000000006af70000 |
311 | |
312 | /* x^161856 mod p(x), x^161792 mod p(x) */ |
313 | .octa 0x000000006685000000000000e5210000 |
314 | |
315 | /* x^160832 mod p(x), x^160768 mod p(x) */ |
316 | .octa 0x0000000062da00000000000008290000 |
317 | |
318 | /* x^159808 mod p(x), x^159744 mod p(x) */ |
319 | .octa 0x00000000bb4b000000000000e4d00000 |
320 | |
321 | /* x^158784 mod p(x), x^158720 mod p(x) */ |
322 | .octa 0x00000000d2490000000000004ae10000 |
323 | |
324 | /* x^157760 mod p(x), x^157696 mod p(x) */ |
325 | .octa 0x00000000c85b00000000000000e70000 |
326 | |
327 | /* x^156736 mod p(x), x^156672 mod p(x) */ |
328 | .octa 0x00000000c37a00000000000015650000 |
329 | |
330 | /* x^155712 mod p(x), x^155648 mod p(x) */ |
331 | .octa 0x0000000018530000000000001c2f0000 |
332 | |
333 | /* x^154688 mod p(x), x^154624 mod p(x) */ |
334 | .octa 0x00000000b46600000000000037bd0000 |
335 | |
336 | /* x^153664 mod p(x), x^153600 mod p(x) */ |
337 | .octa 0x00000000439b00000000000012190000 |
338 | |
339 | /* x^152640 mod p(x), x^152576 mod p(x) */ |
340 | .octa 0x00000000b1260000000000005ece0000 |
341 | |
342 | /* x^151616 mod p(x), x^151552 mod p(x) */ |
343 | .octa 0x00000000d8110000000000002a5e0000 |
344 | |
345 | /* x^150592 mod p(x), x^150528 mod p(x) */ |
346 | .octa 0x00000000099f00000000000052330000 |
347 | |
348 | /* x^149568 mod p(x), x^149504 mod p(x) */ |
349 | .octa 0x00000000f9f9000000000000f9120000 |
350 | |
351 | /* x^148544 mod p(x), x^148480 mod p(x) */ |
352 | .octa 0x000000005cc00000000000000ddc0000 |
353 | |
354 | /* x^147520 mod p(x), x^147456 mod p(x) */ |
355 | .octa 0x00000000343b00000000000012200000 |
356 | |
357 | /* x^146496 mod p(x), x^146432 mod p(x) */ |
358 | .octa 0x000000009222000000000000d12b0000 |
359 | |
360 | /* x^145472 mod p(x), x^145408 mod p(x) */ |
361 | .octa 0x00000000d781000000000000eb2d0000 |
362 | |
363 | /* x^144448 mod p(x), x^144384 mod p(x) */ |
364 | .octa 0x000000000bf400000000000058970000 |
365 | |
366 | /* x^143424 mod p(x), x^143360 mod p(x) */ |
367 | .octa 0x00000000094200000000000013690000 |
368 | |
369 | /* x^142400 mod p(x), x^142336 mod p(x) */ |
370 | .octa 0x00000000d55100000000000051950000 |
371 | |
372 | /* x^141376 mod p(x), x^141312 mod p(x) */ |
373 | .octa 0x000000008f11000000000000954b0000 |
374 | |
375 | /* x^140352 mod p(x), x^140288 mod p(x) */ |
376 | .octa 0x00000000140f000000000000b29e0000 |
377 | |
378 | /* x^139328 mod p(x), x^139264 mod p(x) */ |
379 | .octa 0x00000000c6db000000000000db5d0000 |
380 | |
381 | /* x^138304 mod p(x), x^138240 mod p(x) */ |
382 | .octa 0x00000000715b000000000000dfaf0000 |
383 | |
384 | /* x^137280 mod p(x), x^137216 mod p(x) */ |
385 | .octa 0x000000000dea000000000000e3b60000 |
386 | |
387 | /* x^136256 mod p(x), x^136192 mod p(x) */ |
388 | .octa 0x000000006f94000000000000ddaf0000 |
389 | |
390 | /* x^135232 mod p(x), x^135168 mod p(x) */ |
391 | .octa 0x0000000024e1000000000000e4f70000 |
392 | |
393 | /* x^134208 mod p(x), x^134144 mod p(x) */ |
394 | .octa 0x000000008810000000000000aa110000 |
395 | |
396 | /* x^133184 mod p(x), x^133120 mod p(x) */ |
397 | .octa 0x0000000030c2000000000000a8e60000 |
398 | |
399 | /* x^132160 mod p(x), x^132096 mod p(x) */ |
400 | .octa 0x00000000e6d0000000000000ccf30000 |
401 | |
402 | /* x^131136 mod p(x), x^131072 mod p(x) */ |
403 | .octa 0x000000004da000000000000079bf0000 |
404 | |
405 | /* x^130112 mod p(x), x^130048 mod p(x) */ |
406 | .octa 0x000000007759000000000000b3a30000 |
407 | |
408 | /* x^129088 mod p(x), x^129024 mod p(x) */ |
409 | .octa 0x00000000597400000000000028790000 |
410 | |
411 | /* x^128064 mod p(x), x^128000 mod p(x) */ |
412 | .octa 0x000000007acd000000000000b5820000 |
413 | |
414 | /* x^127040 mod p(x), x^126976 mod p(x) */ |
415 | .octa 0x00000000e6e400000000000026ad0000 |
416 | |
417 | /* x^126016 mod p(x), x^125952 mod p(x) */ |
418 | .octa 0x000000006d49000000000000985b0000 |
419 | |
420 | /* x^124992 mod p(x), x^124928 mod p(x) */ |
421 | .octa 0x000000000f0800000000000011520000 |
422 | |
423 | /* x^123968 mod p(x), x^123904 mod p(x) */ |
424 | .octa 0x000000002c7f000000000000846c0000 |
425 | |
426 | /* x^122944 mod p(x), x^122880 mod p(x) */ |
427 | .octa 0x000000005ce7000000000000ae1d0000 |
428 | |
429 | /* x^121920 mod p(x), x^121856 mod p(x) */ |
430 | .octa 0x00000000d4cb000000000000e21d0000 |
431 | |
432 | /* x^120896 mod p(x), x^120832 mod p(x) */ |
433 | .octa 0x000000003a2300000000000019bb0000 |
434 | |
435 | /* x^119872 mod p(x), x^119808 mod p(x) */ |
436 | .octa 0x000000000e1700000000000095290000 |
437 | |
438 | /* x^118848 mod p(x), x^118784 mod p(x) */ |
439 | .octa 0x000000006e6400000000000050d20000 |
440 | |
441 | /* x^117824 mod p(x), x^117760 mod p(x) */ |
442 | .octa 0x000000008d5c0000000000000cd10000 |
443 | |
444 | /* x^116800 mod p(x), x^116736 mod p(x) */ |
445 | .octa 0x00000000ef310000000000007b570000 |
446 | |
447 | /* x^115776 mod p(x), x^115712 mod p(x) */ |
448 | .octa 0x00000000645d00000000000053d60000 |
449 | |
450 | /* x^114752 mod p(x), x^114688 mod p(x) */ |
451 | .octa 0x0000000018fc00000000000077510000 |
452 | |
453 | /* x^113728 mod p(x), x^113664 mod p(x) */ |
454 | .octa 0x000000000cb3000000000000a7b70000 |
455 | |
456 | /* x^112704 mod p(x), x^112640 mod p(x) */ |
457 | .octa 0x00000000991b000000000000d0780000 |
458 | |
459 | /* x^111680 mod p(x), x^111616 mod p(x) */ |
460 | .octa 0x00000000845a000000000000be3c0000 |
461 | |
462 | /* x^110656 mod p(x), x^110592 mod p(x) */ |
463 | .octa 0x00000000d3a9000000000000df020000 |
464 | |
465 | /* x^109632 mod p(x), x^109568 mod p(x) */ |
466 | .octa 0x0000000017d7000000000000063e0000 |
467 | |
468 | /* x^108608 mod p(x), x^108544 mod p(x) */ |
469 | .octa 0x000000007a860000000000008ab40000 |
470 | |
471 | /* x^107584 mod p(x), x^107520 mod p(x) */ |
472 | .octa 0x00000000fd7c000000000000c7bd0000 |
473 | |
474 | /* x^106560 mod p(x), x^106496 mod p(x) */ |
475 | .octa 0x00000000a56b000000000000efd60000 |
476 | |
477 | /* x^105536 mod p(x), x^105472 mod p(x) */ |
478 | .octa 0x0000000010e400000000000071380000 |
479 | |
480 | /* x^104512 mod p(x), x^104448 mod p(x) */ |
481 | .octa 0x00000000994500000000000004d30000 |
482 | |
483 | /* x^103488 mod p(x), x^103424 mod p(x) */ |
484 | .octa 0x00000000b83c0000000000003b0e0000 |
485 | |
486 | /* x^102464 mod p(x), x^102400 mod p(x) */ |
487 | .octa 0x00000000d6c10000000000008b020000 |
488 | |
489 | /* x^101440 mod p(x), x^101376 mod p(x) */ |
490 | .octa 0x000000009efc000000000000da940000 |
491 | |
492 | /* x^100416 mod p(x), x^100352 mod p(x) */ |
493 | .octa 0x000000005e87000000000000f9f70000 |
494 | |
495 | /* x^99392 mod p(x), x^99328 mod p(x) */ |
496 | .octa 0x000000006c9b00000000000045e40000 |
497 | |
498 | /* x^98368 mod p(x), x^98304 mod p(x) */ |
499 | .octa 0x00000000178a00000000000083940000 |
500 | |
501 | /* x^97344 mod p(x), x^97280 mod p(x) */ |
502 | .octa 0x00000000f0c8000000000000f0a00000 |
503 | |
504 | /* x^96320 mod p(x), x^96256 mod p(x) */ |
505 | .octa 0x00000000f699000000000000b74b0000 |
506 | |
507 | /* x^95296 mod p(x), x^95232 mod p(x) */ |
508 | .octa 0x00000000316d000000000000c1cf0000 |
509 | |
510 | /* x^94272 mod p(x), x^94208 mod p(x) */ |
511 | .octa 0x00000000987e00000000000072680000 |
512 | |
513 | /* x^93248 mod p(x), x^93184 mod p(x) */ |
514 | .octa 0x00000000acff000000000000e0ab0000 |
515 | |
516 | /* x^92224 mod p(x), x^92160 mod p(x) */ |
517 | .octa 0x00000000a1f6000000000000c5a80000 |
518 | |
519 | /* x^91200 mod p(x), x^91136 mod p(x) */ |
520 | .octa 0x0000000061bd000000000000cf690000 |
521 | |
522 | /* x^90176 mod p(x), x^90112 mod p(x) */ |
523 | .octa 0x00000000c9f2000000000000cbcc0000 |
524 | |
525 | /* x^89152 mod p(x), x^89088 mod p(x) */ |
526 | .octa 0x000000005a33000000000000de050000 |
527 | |
528 | /* x^88128 mod p(x), x^88064 mod p(x) */ |
529 | .octa 0x00000000e416000000000000ccd70000 |
530 | |
531 | /* x^87104 mod p(x), x^87040 mod p(x) */ |
532 | .octa 0x0000000058930000000000002f670000 |
533 | |
534 | /* x^86080 mod p(x), x^86016 mod p(x) */ |
535 | .octa 0x00000000a9d3000000000000152f0000 |
536 | |
537 | /* x^85056 mod p(x), x^84992 mod p(x) */ |
538 | .octa 0x00000000c114000000000000ecc20000 |
539 | |
540 | /* x^84032 mod p(x), x^83968 mod p(x) */ |
541 | .octa 0x00000000b9270000000000007c890000 |
542 | |
543 | /* x^83008 mod p(x), x^82944 mod p(x) */ |
544 | .octa 0x000000002e6000000000000006ee0000 |
545 | |
546 | /* x^81984 mod p(x), x^81920 mod p(x) */ |
547 | .octa 0x00000000dfc600000000000009100000 |
548 | |
549 | /* x^80960 mod p(x), x^80896 mod p(x) */ |
550 | .octa 0x000000004911000000000000ad4e0000 |
551 | |
552 | /* x^79936 mod p(x), x^79872 mod p(x) */ |
553 | .octa 0x00000000ae1b000000000000b04d0000 |
554 | |
555 | /* x^78912 mod p(x), x^78848 mod p(x) */ |
556 | .octa 0x0000000005fa000000000000e9900000 |
557 | |
558 | /* x^77888 mod p(x), x^77824 mod p(x) */ |
559 | .octa 0x0000000004a1000000000000cc6f0000 |
560 | |
561 | /* x^76864 mod p(x), x^76800 mod p(x) */ |
562 | .octa 0x00000000af73000000000000ed110000 |
563 | |
564 | /* x^75840 mod p(x), x^75776 mod p(x) */ |
565 | .octa 0x0000000082530000000000008f7e0000 |
566 | |
567 | /* x^74816 mod p(x), x^74752 mod p(x) */ |
568 | .octa 0x00000000cfdc000000000000594f0000 |
569 | |
570 | /* x^73792 mod p(x), x^73728 mod p(x) */ |
571 | .octa 0x00000000a6b6000000000000a8750000 |
572 | |
573 | /* x^72768 mod p(x), x^72704 mod p(x) */ |
574 | .octa 0x00000000fd76000000000000aa0c0000 |
575 | |
576 | /* x^71744 mod p(x), x^71680 mod p(x) */ |
577 | .octa 0x0000000006f500000000000071db0000 |
578 | |
579 | /* x^70720 mod p(x), x^70656 mod p(x) */ |
580 | .octa 0x0000000037ca000000000000ab0c0000 |
581 | |
582 | /* x^69696 mod p(x), x^69632 mod p(x) */ |
583 | .octa 0x00000000d7ab000000000000b7a00000 |
584 | |
585 | /* x^68672 mod p(x), x^68608 mod p(x) */ |
586 | .octa 0x00000000440800000000000090d30000 |
587 | |
588 | /* x^67648 mod p(x), x^67584 mod p(x) */ |
589 | .octa 0x00000000186100000000000054730000 |
590 | |
591 | /* x^66624 mod p(x), x^66560 mod p(x) */ |
592 | .octa 0x000000007368000000000000a3a20000 |
593 | |
594 | /* x^65600 mod p(x), x^65536 mod p(x) */ |
595 | .octa 0x0000000026d0000000000000f9040000 |
596 | |
597 | /* x^64576 mod p(x), x^64512 mod p(x) */ |
598 | .octa 0x00000000fe770000000000009c0a0000 |
599 | |
600 | /* x^63552 mod p(x), x^63488 mod p(x) */ |
601 | .octa 0x000000002cba000000000000d1e70000 |
602 | |
603 | /* x^62528 mod p(x), x^62464 mod p(x) */ |
604 | .octa 0x00000000f8bd0000000000005ac10000 |
605 | |
606 | /* x^61504 mod p(x), x^61440 mod p(x) */ |
607 | .octa 0x000000007372000000000000d68d0000 |
608 | |
609 | /* x^60480 mod p(x), x^60416 mod p(x) */ |
610 | .octa 0x00000000f37f00000000000089f60000 |
611 | |
612 | /* x^59456 mod p(x), x^59392 mod p(x) */ |
613 | .octa 0x00000000078400000000000008a90000 |
614 | |
615 | /* x^58432 mod p(x), x^58368 mod p(x) */ |
616 | .octa 0x00000000d3e400000000000042360000 |
617 | |
618 | /* x^57408 mod p(x), x^57344 mod p(x) */ |
619 | .octa 0x00000000eba800000000000092d50000 |
620 | |
621 | /* x^56384 mod p(x), x^56320 mod p(x) */ |
622 | .octa 0x00000000afbe000000000000b4d50000 |
623 | |
624 | /* x^55360 mod p(x), x^55296 mod p(x) */ |
625 | .octa 0x00000000d8ca000000000000c9060000 |
626 | |
627 | /* x^54336 mod p(x), x^54272 mod p(x) */ |
628 | .octa 0x00000000c2d00000000000008f4f0000 |
629 | |
630 | /* x^53312 mod p(x), x^53248 mod p(x) */ |
631 | .octa 0x00000000373200000000000028690000 |
632 | |
633 | /* x^52288 mod p(x), x^52224 mod p(x) */ |
634 | .octa 0x0000000046ae000000000000c3b30000 |
635 | |
636 | /* x^51264 mod p(x), x^51200 mod p(x) */ |
637 | .octa 0x00000000b243000000000000f8700000 |
638 | |
639 | /* x^50240 mod p(x), x^50176 mod p(x) */ |
640 | .octa 0x00000000f7f500000000000029eb0000 |
641 | |
642 | /* x^49216 mod p(x), x^49152 mod p(x) */ |
643 | .octa 0x000000000c7e000000000000fe730000 |
644 | |
645 | /* x^48192 mod p(x), x^48128 mod p(x) */ |
646 | .octa 0x00000000c38200000000000096000000 |
647 | |
648 | /* x^47168 mod p(x), x^47104 mod p(x) */ |
649 | .octa 0x000000008956000000000000683c0000 |
650 | |
651 | /* x^46144 mod p(x), x^46080 mod p(x) */ |
652 | .octa 0x00000000422d0000000000005f1e0000 |
653 | |
654 | /* x^45120 mod p(x), x^45056 mod p(x) */ |
655 | .octa 0x00000000ac0f0000000000006f810000 |
656 | |
657 | /* x^44096 mod p(x), x^44032 mod p(x) */ |
658 | .octa 0x00000000ce30000000000000031f0000 |
659 | |
660 | /* x^43072 mod p(x), x^43008 mod p(x) */ |
661 | .octa 0x000000003d43000000000000455a0000 |
662 | |
663 | /* x^42048 mod p(x), x^41984 mod p(x) */ |
664 | .octa 0x000000007ebe000000000000a6050000 |
665 | |
666 | /* x^41024 mod p(x), x^40960 mod p(x) */ |
667 | .octa 0x00000000976e00000000000077eb0000 |
668 | |
669 | /* x^40000 mod p(x), x^39936 mod p(x) */ |
670 | .octa 0x000000000872000000000000389c0000 |
671 | |
672 | /* x^38976 mod p(x), x^38912 mod p(x) */ |
673 | .octa 0x000000008979000000000000c7b20000 |
674 | |
675 | /* x^37952 mod p(x), x^37888 mod p(x) */ |
676 | .octa 0x000000005c1e0000000000001d870000 |
677 | |
678 | /* x^36928 mod p(x), x^36864 mod p(x) */ |
679 | .octa 0x00000000aebb00000000000045810000 |
680 | |
681 | /* x^35904 mod p(x), x^35840 mod p(x) */ |
682 | .octa 0x000000004f7e0000000000006d4a0000 |
683 | |
684 | /* x^34880 mod p(x), x^34816 mod p(x) */ |
685 | .octa 0x00000000ea98000000000000b9200000 |
686 | |
687 | /* x^33856 mod p(x), x^33792 mod p(x) */ |
688 | .octa 0x00000000f39600000000000022f20000 |
689 | |
690 | /* x^32832 mod p(x), x^32768 mod p(x) */ |
691 | .octa 0x000000000bc500000000000041ca0000 |
692 | |
693 | /* x^31808 mod p(x), x^31744 mod p(x) */ |
694 | .octa 0x00000000786400000000000078500000 |
695 | |
696 | /* x^30784 mod p(x), x^30720 mod p(x) */ |
697 | .octa 0x00000000be970000000000009e7e0000 |
698 | |
699 | /* x^29760 mod p(x), x^29696 mod p(x) */ |
700 | .octa 0x00000000dd6d000000000000a53c0000 |
701 | |
702 | /* x^28736 mod p(x), x^28672 mod p(x) */ |
703 | .octa 0x000000004c3f00000000000039340000 |
704 | |
705 | /* x^27712 mod p(x), x^27648 mod p(x) */ |
706 | .octa 0x0000000093a4000000000000b58e0000 |
707 | |
708 | /* x^26688 mod p(x), x^26624 mod p(x) */ |
709 | .octa 0x0000000050fb00000000000062d40000 |
710 | |
711 | /* x^25664 mod p(x), x^25600 mod p(x) */ |
712 | .octa 0x00000000f505000000000000a26f0000 |
713 | |
714 | /* x^24640 mod p(x), x^24576 mod p(x) */ |
715 | .octa 0x0000000064f900000000000065e60000 |
716 | |
717 | /* x^23616 mod p(x), x^23552 mod p(x) */ |
718 | .octa 0x00000000e8c2000000000000aad90000 |
719 | |
720 | /* x^22592 mod p(x), x^22528 mod p(x) */ |
721 | .octa 0x00000000720b000000000000a3b00000 |
722 | |
723 | /* x^21568 mod p(x), x^21504 mod p(x) */ |
724 | .octa 0x00000000e992000000000000d2680000 |
725 | |
726 | /* x^20544 mod p(x), x^20480 mod p(x) */ |
727 | .octa 0x000000009132000000000000cf4c0000 |
728 | |
729 | /* x^19520 mod p(x), x^19456 mod p(x) */ |
730 | .octa 0x00000000608a00000000000076610000 |
731 | |
732 | /* x^18496 mod p(x), x^18432 mod p(x) */ |
733 | .octa 0x000000009948000000000000fb9f0000 |
734 | |
735 | /* x^17472 mod p(x), x^17408 mod p(x) */ |
736 | .octa 0x00000000173000000000000003770000 |
737 | |
738 | /* x^16448 mod p(x), x^16384 mod p(x) */ |
739 | .octa 0x000000006fe300000000000004880000 |
740 | |
741 | /* x^15424 mod p(x), x^15360 mod p(x) */ |
742 | .octa 0x00000000e15300000000000056a70000 |
743 | |
744 | /* x^14400 mod p(x), x^14336 mod p(x) */ |
745 | .octa 0x0000000092d60000000000009dfd0000 |
746 | |
747 | /* x^13376 mod p(x), x^13312 mod p(x) */ |
748 | .octa 0x0000000002fd00000000000074c80000 |
749 | |
750 | /* x^12352 mod p(x), x^12288 mod p(x) */ |
751 | .octa 0x00000000c78b000000000000a3ec0000 |
752 | |
753 | /* x^11328 mod p(x), x^11264 mod p(x) */ |
754 | .octa 0x000000009262000000000000b3530000 |
755 | |
756 | /* x^10304 mod p(x), x^10240 mod p(x) */ |
757 | .octa 0x0000000084f200000000000047bf0000 |
758 | |
759 | /* x^9280 mod p(x), x^9216 mod p(x) */ |
760 | .octa 0x0000000067ee000000000000e97c0000 |
761 | |
762 | /* x^8256 mod p(x), x^8192 mod p(x) */ |
763 | .octa 0x00000000535b00000000000091e10000 |
764 | |
765 | /* x^7232 mod p(x), x^7168 mod p(x) */ |
766 | .octa 0x000000007ebb00000000000055060000 |
767 | |
768 | /* x^6208 mod p(x), x^6144 mod p(x) */ |
769 | .octa 0x00000000c6a1000000000000fd360000 |
770 | |
771 | /* x^5184 mod p(x), x^5120 mod p(x) */ |
772 | .octa 0x000000001be500000000000055860000 |
773 | |
774 | /* x^4160 mod p(x), x^4096 mod p(x) */ |
775 | .octa 0x00000000ae0e0000000000005bd00000 |
776 | |
777 | /* x^3136 mod p(x), x^3072 mod p(x) */ |
778 | .octa 0x0000000022040000000000008db20000 |
779 | |
780 | /* x^2112 mod p(x), x^2048 mod p(x) */ |
781 | .octa 0x00000000c9eb000000000000efe20000 |
782 | |
783 | /* x^1088 mod p(x), x^1024 mod p(x) */ |
784 | .octa 0x0000000039b400000000000051d10000 |
785 | |
786 | .short_constants: |
787 | |
788 | /* Reduce final 1024-2048 bits to 64 bits, shifting 32 bits to include the trailing 32 bits of zeros */ |
789 | /* x^2048 mod p(x), x^2016 mod p(x), x^1984 mod p(x), x^1952 mod p(x) */ |
790 | .octa 0xefe20000dccf00009440000033590000 |
791 | |
792 | /* x^1920 mod p(x), x^1888 mod p(x), x^1856 mod p(x), x^1824 mod p(x) */ |
793 | .octa 0xee6300002f3f000062180000e0ed0000 |
794 | |
795 | /* x^1792 mod p(x), x^1760 mod p(x), x^1728 mod p(x), x^1696 mod p(x) */ |
796 | .octa 0xcf5f000017ef0000ccbe000023d30000 |
797 | |
798 | /* x^1664 mod p(x), x^1632 mod p(x), x^1600 mod p(x), x^1568 mod p(x) */ |
799 | .octa 0x6d0c0000a30e00000920000042630000 |
800 | |
801 | /* x^1536 mod p(x), x^1504 mod p(x), x^1472 mod p(x), x^1440 mod p(x) */ |
802 | .octa 0x21d30000932b0000a7a00000efcc0000 |
803 | |
804 | /* x^1408 mod p(x), x^1376 mod p(x), x^1344 mod p(x), x^1312 mod p(x) */ |
805 | .octa 0x10be00000b310000666f00000d1c0000 |
806 | |
807 | /* x^1280 mod p(x), x^1248 mod p(x), x^1216 mod p(x), x^1184 mod p(x) */ |
808 | .octa 0x1f240000ce9e0000caad0000589e0000 |
809 | |
810 | /* x^1152 mod p(x), x^1120 mod p(x), x^1088 mod p(x), x^1056 mod p(x) */ |
811 | .octa 0x29610000d02b000039b400007cf50000 |
812 | |
813 | /* x^1024 mod p(x), x^992 mod p(x), x^960 mod p(x), x^928 mod p(x) */ |
814 | .octa 0x51d100009d9d00003c0e0000bfd60000 |
815 | |
816 | /* x^896 mod p(x), x^864 mod p(x), x^832 mod p(x), x^800 mod p(x) */ |
817 | .octa 0xda390000ceae000013830000713c0000 |
818 | |
819 | /* x^768 mod p(x), x^736 mod p(x), x^704 mod p(x), x^672 mod p(x) */ |
820 | .octa 0xb67800001e16000085c0000080a60000 |
821 | |
822 | /* x^640 mod p(x), x^608 mod p(x), x^576 mod p(x), x^544 mod p(x) */ |
823 | .octa 0x0db40000f7f90000371d0000e6580000 |
824 | |
825 | /* x^512 mod p(x), x^480 mod p(x), x^448 mod p(x), x^416 mod p(x) */ |
826 | .octa 0x87e70000044c0000aadb0000a4970000 |
827 | |
828 | /* x^384 mod p(x), x^352 mod p(x), x^320 mod p(x), x^288 mod p(x) */ |
829 | .octa 0x1f990000ad180000d8b30000e7b50000 |
830 | |
831 | /* x^256 mod p(x), x^224 mod p(x), x^192 mod p(x), x^160 mod p(x) */ |
832 | .octa 0xbe6c00006ee300004c1a000006df0000 |
833 | |
834 | /* x^128 mod p(x), x^96 mod p(x), x^64 mod p(x), x^32 mod p(x) */ |
835 | .octa 0xfb0b00002d560000136800008bb70000 |
836 | |
837 | |
838 | .barrett_constants: |
839 | /* Barrett constant m - (4^32)/n */ |
840 | .octa 0x000000000000000000000001f65a57f8 /* x^64 div p(x) */ |
841 | /* Barrett constant n */ |
842 | .octa 0x0000000000000000000000018bb70000 |
843 | |
844 | #define CRC_FUNCTION_NAME __crct10dif_vpmsum |
845 | #include "crc32-vpmsum_core.S" |
846 | |