1 /*
2  * Copyright 2015 Advanced Micro Devices, Inc.
3  *
4  * Permission is hereby granted, free of charge, to any person obtaining a
5  * copy of this software and associated documentation files (the "Software"),
6  * to deal in the Software without restriction, including without limitation
7  * the rights to use, copy, modify, merge, publish, distribute, sublicense,
8  * and/or sell copies of the Software, and to permit persons to whom the
9  * Software is furnished to do so, subject to the following conditions:
10  *
11  * The above copyright notice and this permission notice shall be included in
12  * all copies or substantial portions of the Software.
13  *
14  * THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR
15  * IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY,
16  * FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT.  IN NO EVENT SHALL
17  * THE COPYRIGHT HOLDER(S) OR AUTHOR(S) BE LIABLE FOR ANY CLAIM, DAMAGES OR
18  * OTHER LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE,
19  * ARISING FROM, OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR
20  * OTHER DEALINGS IN THE SOFTWARE.
21  *
22  */
23 #include <asm/div64.h>
24 
25 #define SHIFT_AMOUNT 16 /* We multiply all original integers with 2^SHIFT_AMOUNT to get the fInt representation */
26 
27 #define PRECISION 5 /* Change this value to change the number of decimal places in the final output - 5 is a good default */
28 
29 #define SHIFTED_2 (2 << SHIFT_AMOUNT)
30 #define MAX (1 << (SHIFT_AMOUNT - 1)) - 1 /* 32767 - Might change in the future */
31 
32 /* -------------------------------------------------------------------------------
33  * NEW TYPE - fINT
34  * -------------------------------------------------------------------------------
35  * A variable of type fInt can be accessed in 3 ways using the dot (.) operator
36  * fInt A;
37  * A.full => The full number as it is. Generally not easy to read
38  * A.partial.real => Only the integer portion
39  * A.partial.decimal => Only the fractional portion
40  */
41 typedef union _fInt {
42     int full;
43     struct _partial {
44         unsigned int decimal: SHIFT_AMOUNT; /*Needs to always be unsigned*/
45         int real: 32 - SHIFT_AMOUNT;
46     } partial;
47 } fInt;
48 
49 /* -------------------------------------------------------------------------------
50  * Function Declarations
51  *  -------------------------------------------------------------------------------
52  */
53 static fInt ConvertToFraction(int);                       /* Use this to convert an INT to a FINT */
54 static fInt Convert_ULONG_ToFraction(uint32_t);           /* Use this to convert an uint32_t to a FINT */
55 static fInt GetScaledFraction(int, int);                  /* Use this to convert an INT to a FINT after scaling it by a factor */
56 static int ConvertBackToInteger(fInt);                    /* Convert a FINT back to an INT that is scaled by 1000 (i.e. last 3 digits are the decimal digits) */
57 
58 static fInt fNegate(fInt);                                /* Returns -1 * input fInt value */
59 static fInt fAdd (fInt, fInt);                            /* Returns the sum of two fInt numbers */
60 static fInt fSubtract (fInt A, fInt B);                   /* Returns A-B - Sometimes easier than Adding negative numbers */
61 static fInt fMultiply (fInt, fInt);                       /* Returns the product of two fInt numbers */
62 static fInt fDivide (fInt A, fInt B);                     /* Returns A/B */
63 static fInt fGetSquare(fInt);                             /* Returns the square of a fInt number */
64 static fInt fSqrt(fInt);                                  /* Returns the Square Root of a fInt number */
65 
66 static int uAbs(int);                                     /* Returns the Absolute value of the Int */
67 static int uPow(int base, int exponent);                  /* Returns base^exponent an INT */
68 
69 static void SolveQuadracticEqn(fInt, fInt, fInt, fInt[]); /* Returns the 2 roots via the array */
70 static bool Equal(fInt, fInt);                            /* Returns true if two fInts are equal to each other */
71 static bool GreaterThan(fInt A, fInt B);                  /* Returns true if A > B */
72 
73 static fInt fExponential(fInt exponent);                  /* Can be used to calculate e^exponent */
74 static fInt fNaturalLog(fInt value);                      /* Can be used to calculate ln(value) */
75 
76 /* Fuse decoding functions
77  * -------------------------------------------------------------------------------------
78  */
79 static fInt fDecodeLinearFuse(uint32_t fuse_value, fInt f_min, fInt f_range, uint32_t bitlength);
80 static fInt fDecodeLogisticFuse(uint32_t fuse_value, fInt f_average, fInt f_range, uint32_t bitlength);
81 static fInt fDecodeLeakageID (uint32_t leakageID_fuse, fInt ln_max_div_min, fInt f_min, uint32_t bitlength);
82 
83 /* Internal Support Functions - Use these ONLY for testing or adding to internal functions
84  * -------------------------------------------------------------------------------------
85  * Some of the following functions take two INTs as their input - This is unsafe for a variety of reasons.
86  */
87 static fInt Divide (int, int);                            /* Divide two INTs and return result as FINT */
88 static fInt fNegate(fInt);
89 
90 static int uGetScaledDecimal (fInt);                      /* Internal function */
91 static int GetReal (fInt A);                              /* Internal function */
92 
93 /* -------------------------------------------------------------------------------------
94  * TROUBLESHOOTING INFORMATION
95  * -------------------------------------------------------------------------------------
96  * 1) ConvertToFraction - InputOutOfRangeException: Only accepts numbers smaller than MAX (default: 32767)
97  * 2) fAdd - OutputOutOfRangeException: Output bigger than MAX (default: 32767)
98  * 3) fMultiply - OutputOutOfRangeException:
99  * 4) fGetSquare - OutputOutOfRangeException:
100  * 5) fDivide - DivideByZeroException
101  * 6) fSqrt - NegativeSquareRootException: Input cannot be a negative number
102  */
103 
104 /* -------------------------------------------------------------------------------------
105  * START OF CODE
106  * -------------------------------------------------------------------------------------
107  */
108 static fInt fExponential(fInt exponent)        /*Can be used to calculate e^exponent*/
109 {
110 	uint32_t i;
111 	bool bNegated = false;
112 
113 	fInt fPositiveOne = ConvertToFraction(1);
114 	fInt fZERO = ConvertToFraction(0);
115 
116 	fInt lower_bound = Divide(78, 10000);
117 	fInt solution = fPositiveOne; /*Starting off with baseline of 1 */
118 	fInt error_term;
119 
120 	static const uint32_t k_array[11] = {55452, 27726, 13863, 6931, 4055, 2231, 1178, 606, 308, 155, 78};
121 	static const uint32_t expk_array[11] = {2560000, 160000, 40000, 20000, 15000, 12500, 11250, 10625, 10313, 10156, 10078};
122 
123 	if (GreaterThan(fZERO, exponent)) {
124 		exponent = fNegate(exponent);
125 		bNegated = true;
126 	}
127 
128 	while (GreaterThan(exponent, lower_bound)) {
129 		for (i = 0; i < 11; i++) {
130 			if (GreaterThan(exponent, GetScaledFraction(k_array[i], 10000))) {
131 				exponent = fSubtract(exponent, GetScaledFraction(k_array[i], 10000));
132 				solution = fMultiply(solution, GetScaledFraction(expk_array[i], 10000));
133 			}
134 		}
135 	}
136 
137 	error_term = fAdd(fPositiveOne, exponent);
138 
139 	solution = fMultiply(solution, error_term);
140 
141 	if (bNegated)
142 		solution = fDivide(fPositiveOne, solution);
143 
144 	return solution;
145 }
146 
147 static fInt fNaturalLog(fInt value)
148 {
149 	uint32_t i;
150 	fInt upper_bound = Divide(8, 1000);
151 	fInt fNegativeOne = ConvertToFraction(-1);
152 	fInt solution = ConvertToFraction(0); /*Starting off with baseline of 0 */
153 	fInt error_term;
154 
155 	static const uint32_t k_array[10] = {160000, 40000, 20000, 15000, 12500, 11250, 10625, 10313, 10156, 10078};
156 	static const uint32_t logk_array[10] = {27726, 13863, 6931, 4055, 2231, 1178, 606, 308, 155, 78};
157 
158 	while (GreaterThan(fAdd(value, fNegativeOne), upper_bound)) {
159 		for (i = 0; i < 10; i++) {
160 			if (GreaterThan(value, GetScaledFraction(k_array[i], 10000))) {
161 				value = fDivide(value, GetScaledFraction(k_array[i], 10000));
162 				solution = fAdd(solution, GetScaledFraction(logk_array[i], 10000));
163 			}
164 		}
165 	}
166 
167 	error_term = fAdd(fNegativeOne, value);
168 
169 	return (fAdd(solution, error_term));
170 }
171 
172 static fInt fDecodeLinearFuse(uint32_t fuse_value, fInt f_min, fInt f_range, uint32_t bitlength)
173 {
174 	fInt f_fuse_value = Convert_ULONG_ToFraction(fuse_value);
175 	fInt f_bit_max_value = Convert_ULONG_ToFraction((uPow(2, bitlength)) - 1);
176 
177 	fInt f_decoded_value;
178 
179 	f_decoded_value = fDivide(f_fuse_value, f_bit_max_value);
180 	f_decoded_value = fMultiply(f_decoded_value, f_range);
181 	f_decoded_value = fAdd(f_decoded_value, f_min);
182 
183 	return f_decoded_value;
184 }
185 
186 
187 static fInt fDecodeLogisticFuse(uint32_t fuse_value, fInt f_average, fInt f_range, uint32_t bitlength)
188 {
189 	fInt f_fuse_value = Convert_ULONG_ToFraction(fuse_value);
190 	fInt f_bit_max_value = Convert_ULONG_ToFraction((uPow(2, bitlength)) - 1);
191 
192 	fInt f_CONSTANT_NEG13 = ConvertToFraction(-13);
193 	fInt f_CONSTANT1 = ConvertToFraction(1);
194 
195 	fInt f_decoded_value;
196 
197 	f_decoded_value = fSubtract(fDivide(f_bit_max_value, f_fuse_value), f_CONSTANT1);
198 	f_decoded_value = fNaturalLog(f_decoded_value);
199 	f_decoded_value = fMultiply(f_decoded_value, fDivide(f_range, f_CONSTANT_NEG13));
200 	f_decoded_value = fAdd(f_decoded_value, f_average);
201 
202 	return f_decoded_value;
203 }
204 
205 static fInt fDecodeLeakageID (uint32_t leakageID_fuse, fInt ln_max_div_min, fInt f_min, uint32_t bitlength)
206 {
207 	fInt fLeakage;
208 	fInt f_bit_max_value = Convert_ULONG_ToFraction((uPow(2, bitlength)) - 1);
209 
210 	fLeakage = fMultiply(ln_max_div_min, Convert_ULONG_ToFraction(leakageID_fuse));
211 	fLeakage = fDivide(fLeakage, f_bit_max_value);
212 	fLeakage = fExponential(fLeakage);
213 	fLeakage = fMultiply(fLeakage, f_min);
214 
215 	return fLeakage;
216 }
217 
218 static fInt ConvertToFraction(int X) /*Add all range checking here. Is it possible to make fInt a private declaration? */
219 {
220 	fInt temp;
221 
222 	if (X <= MAX)
223 		temp.full = (X << SHIFT_AMOUNT);
224 	else
225 		temp.full = 0;
226 
227 	return temp;
228 }
229 
230 static fInt fNegate(fInt X)
231 {
232 	fInt CONSTANT_NEGONE = ConvertToFraction(-1);
233 	return (fMultiply(X, CONSTANT_NEGONE));
234 }
235 
236 static fInt Convert_ULONG_ToFraction(uint32_t X)
237 {
238 	fInt temp;
239 
240 	if (X <= MAX)
241 		temp.full = (X << SHIFT_AMOUNT);
242 	else
243 		temp.full = 0;
244 
245 	return temp;
246 }
247 
248 static fInt GetScaledFraction(int X, int factor)
249 {
250 	int times_shifted, factor_shifted;
251 	bool bNEGATED;
252 	fInt fValue;
253 
254 	times_shifted = 0;
255 	factor_shifted = 0;
256 	bNEGATED = false;
257 
258 	if (X < 0) {
259 		X = -1*X;
260 		bNEGATED = true;
261 	}
262 
263 	if (factor < 0) {
264 		factor = -1*factor;
265 		bNEGATED = !bNEGATED; /*If bNEGATED = true due to X < 0, this will cover the case of negative cancelling negative */
266 	}
267 
268 	if ((X > MAX) || factor > MAX) {
269 		if ((X/factor) <= MAX) {
270 			while (X > MAX) {
271 				X = X >> 1;
272 				times_shifted++;
273 			}
274 
275 			while (factor > MAX) {
276 				factor = factor >> 1;
277 				factor_shifted++;
278 			}
279 		} else {
280 			fValue.full = 0;
281 			return fValue;
282 		}
283 	}
284 
285 	if (factor == 1)
286 		return ConvertToFraction(X);
287 
288 	fValue = fDivide(ConvertToFraction(X * uPow(-1, bNEGATED)), ConvertToFraction(factor));
289 
290 	fValue.full = fValue.full << times_shifted;
291 	fValue.full = fValue.full >> factor_shifted;
292 
293 	return fValue;
294 }
295 
296 /* Addition using two fInts */
297 static fInt fAdd (fInt X, fInt Y)
298 {
299 	fInt Sum;
300 
301 	Sum.full = X.full + Y.full;
302 
303 	return Sum;
304 }
305 
306 /* Addition using two fInts */
307 static fInt fSubtract (fInt X, fInt Y)
308 {
309 	fInt Difference;
310 
311 	Difference.full = X.full - Y.full;
312 
313 	return Difference;
314 }
315 
316 static bool Equal(fInt A, fInt B)
317 {
318 	if (A.full == B.full)
319 		return true;
320 	else
321 		return false;
322 }
323 
324 static bool GreaterThan(fInt A, fInt B)
325 {
326 	if (A.full > B.full)
327 		return true;
328 	else
329 		return false;
330 }
331 
332 static fInt fMultiply (fInt X, fInt Y) /* Uses 64-bit integers (int64_t) */
333 {
334 	fInt Product;
335 	int64_t tempProduct;
336 	bool X_LessThanOne, Y_LessThanOne;
337 
338 	X_LessThanOne = (X.partial.real == 0 && X.partial.decimal != 0 && X.full >= 0);
339 	Y_LessThanOne = (Y.partial.real == 0 && Y.partial.decimal != 0 && Y.full >= 0);
340 
341 	/*The following is for a very specific common case: Non-zero number with ONLY fractional portion*/
342 	/* TEMPORARILY DISABLED - CAN BE USED TO IMPROVE PRECISION
343 
344 	if (X_LessThanOne && Y_LessThanOne) {
345 		Product.full = X.full * Y.full;
346 		return Product
347 	}*/
348 
349 	tempProduct = ((int64_t)X.full) * ((int64_t)Y.full); /*Q(16,16)*Q(16,16) = Q(32, 32) - Might become a negative number! */
350 	tempProduct = tempProduct >> 16; /*Remove lagging 16 bits - Will lose some precision from decimal; */
351 	Product.full = (int)tempProduct; /*The int64_t will lose the leading 16 bits that were part of the integer portion */
352 
353 	return Product;
354 }
355 
356 static fInt fDivide (fInt X, fInt Y)
357 {
358 	fInt fZERO, fQuotient;
359 	int64_t longlongX, longlongY;
360 
361 	fZERO = ConvertToFraction(0);
362 
363 	if (Equal(Y, fZERO))
364 		return fZERO;
365 
366 	longlongX = (int64_t)X.full;
367 	longlongY = (int64_t)Y.full;
368 
369 	longlongX = longlongX << 16; /*Q(16,16) -> Q(32,32) */
370 
371 	div64_s64(longlongX, longlongY); /*Q(32,32) divided by Q(16,16) = Q(16,16) Back to original format */
372 
373 	fQuotient.full = (int)longlongX;
374 	return fQuotient;
375 }
376 
377 static int ConvertBackToInteger (fInt A) /*THIS is the function that will be used to check with the Golden settings table*/
378 {
379 	fInt fullNumber, scaledDecimal, scaledReal;
380 
381 	scaledReal.full = GetReal(A) * uPow(10, PRECISION-1); /* DOUBLE CHECK THISSSS!!! */
382 
383 	scaledDecimal.full = uGetScaledDecimal(A);
384 
385 	fullNumber = fAdd(scaledDecimal,scaledReal);
386 
387 	return fullNumber.full;
388 }
389 
390 static fInt fGetSquare(fInt A)
391 {
392 	return fMultiply(A,A);
393 }
394 
395 /* x_new = x_old - (x_old^2 - C) / (2 * x_old) */
396 static fInt fSqrt(fInt num)
397 {
398 	fInt F_divide_Fprime, Fprime;
399 	fInt test;
400 	fInt twoShifted;
401 	int seed, counter, error;
402 	fInt x_new, x_old, C, y;
403 
404 	fInt fZERO = ConvertToFraction(0);
405 
406 	/* (0 > num) is the same as (num < 0), i.e., num is negative */
407 
408 	if (GreaterThan(fZERO, num) || Equal(fZERO, num))
409 		return fZERO;
410 
411 	C = num;
412 
413 	if (num.partial.real > 3000)
414 		seed = 60;
415 	else if (num.partial.real > 1000)
416 		seed = 30;
417 	else if (num.partial.real > 100)
418 		seed = 10;
419 	else
420 		seed = 2;
421 
422 	counter = 0;
423 
424 	if (Equal(num, fZERO)) /*Square Root of Zero is zero */
425 		return fZERO;
426 
427 	twoShifted = ConvertToFraction(2);
428 	x_new = ConvertToFraction(seed);
429 
430 	do {
431 		counter++;
432 
433 		x_old.full = x_new.full;
434 
435 		test = fGetSquare(x_old); /*1.75*1.75 is reverting back to 1 when shifted down */
436 		y = fSubtract(test, C); /*y = f(x) = x^2 - C; */
437 
438 		Fprime = fMultiply(twoShifted, x_old);
439 		F_divide_Fprime = fDivide(y, Fprime);
440 
441 		x_new = fSubtract(x_old, F_divide_Fprime);
442 
443 		error = ConvertBackToInteger(x_new) - ConvertBackToInteger(x_old);
444 
445 		if (counter > 20) /*20 is already way too many iterations. If we dont have an answer by then, we never will*/
446 			return x_new;
447 
448 	} while (uAbs(error) > 0);
449 
450 	return (x_new);
451 }
452 
453 static void SolveQuadracticEqn(fInt A, fInt B, fInt C, fInt Roots[])
454 {
455 	fInt *pRoots = &Roots[0];
456 	fInt temp, root_first, root_second;
457 	fInt f_CONSTANT10, f_CONSTANT100;
458 
459 	f_CONSTANT100 = ConvertToFraction(100);
460 	f_CONSTANT10 = ConvertToFraction(10);
461 
462 	while(GreaterThan(A, f_CONSTANT100) || GreaterThan(B, f_CONSTANT100) || GreaterThan(C, f_CONSTANT100)) {
463 		A = fDivide(A, f_CONSTANT10);
464 		B = fDivide(B, f_CONSTANT10);
465 		C = fDivide(C, f_CONSTANT10);
466 	}
467 
468 	temp = fMultiply(ConvertToFraction(4), A); /* root = 4*A */
469 	temp = fMultiply(temp, C); /* root = 4*A*C */
470 	temp = fSubtract(fGetSquare(B), temp); /* root = b^2 - 4AC */
471 	temp = fSqrt(temp); /*root = Sqrt (b^2 - 4AC); */
472 
473 	root_first = fSubtract(fNegate(B), temp); /* b - Sqrt(b^2 - 4AC) */
474 	root_second = fAdd(fNegate(B), temp); /* b + Sqrt(b^2 - 4AC) */
475 
476 	root_first = fDivide(root_first, ConvertToFraction(2)); /* [b +- Sqrt(b^2 - 4AC)]/[2] */
477 	root_first = fDivide(root_first, A); /*[b +- Sqrt(b^2 - 4AC)]/[2*A] */
478 
479 	root_second = fDivide(root_second, ConvertToFraction(2)); /* [b +- Sqrt(b^2 - 4AC)]/[2] */
480 	root_second = fDivide(root_second, A); /*[b +- Sqrt(b^2 - 4AC)]/[2*A] */
481 
482 	*(pRoots + 0) = root_first;
483 	*(pRoots + 1) = root_second;
484 }
485 
486 /* -----------------------------------------------------------------------------
487  * SUPPORT FUNCTIONS
488  * -----------------------------------------------------------------------------
489  */
490 
491 /* Conversion Functions */
492 static int GetReal (fInt A)
493 {
494 	return (A.full >> SHIFT_AMOUNT);
495 }
496 
497 static fInt Divide (int X, int Y)
498 {
499 	fInt A, B, Quotient;
500 
501 	A.full = X << SHIFT_AMOUNT;
502 	B.full = Y << SHIFT_AMOUNT;
503 
504 	Quotient = fDivide(A, B);
505 
506 	return Quotient;
507 }
508 
509 static int uGetScaledDecimal (fInt A) /*Converts the fractional portion to whole integers - Costly function */
510 {
511 	int dec[PRECISION];
512 	int i, scaledDecimal = 0, tmp = A.partial.decimal;
513 
514 	for (i = 0; i < PRECISION; i++) {
515 		dec[i] = tmp / (1 << SHIFT_AMOUNT);
516 		tmp = tmp - ((1 << SHIFT_AMOUNT)*dec[i]);
517 		tmp *= 10;
518 		scaledDecimal = scaledDecimal + dec[i]*uPow(10, PRECISION - 1 -i);
519 	}
520 
521 	return scaledDecimal;
522 }
523 
524 static int uPow(int base, int power)
525 {
526 	if (power == 0)
527 		return 1;
528 	else
529 		return (base)*uPow(base, power - 1);
530 }
531 
532 static int uAbs(int X)
533 {
534 	if (X < 0)
535 		return (X * -1);
536 	else
537 		return X;
538 }
539 
540 static fInt fRoundUpByStepSize(fInt A, fInt fStepSize, bool error_term)
541 {
542 	fInt solution;
543 
544 	solution = fDivide(A, fStepSize);
545 	solution.partial.decimal = 0; /*All fractional digits changes to 0 */
546 
547 	if (error_term)
548 		solution.partial.real += 1; /*Error term of 1 added */
549 
550 	solution = fMultiply(solution, fStepSize);
551 	solution = fAdd(solution, fStepSize);
552 
553 	return solution;
554 }
555 
556