networking/tls_fe.c - busybox - Git at Google

 /*
  * Copyright (C) 2018 Denys Vlasenko
  *
  * Licensed under GPLv2, see file LICENSE in this source tree.
  */
 #include "tls.h"

 typedef uint8_t  byte;
 typedef uint16_t word16;
 typedef uint32_t word32;
 #define XMEMSET  memset

 #define F25519_SIZE CURVE25519_KEYSIZE

 /* The code below is taken from wolfssl-3.15.3/wolfcrypt/src/fe_low_mem.c
  * Header comment is kept intact:
  */

 /* fe_low_mem.c
  *
  * Copyright (C) 2006-2017 wolfSSL Inc.
  *
  * This file is part of wolfSSL.
  *
  * wolfSSL is free software; you can redistribute it and/or modify
  * it under the terms of the GNU General Public License as published by
  * the Free Software Foundation; either version 2 of the License, or
  * (at your option) any later version.
  *
  * wolfSSL is distributed in the hope that it will be useful,
  * but WITHOUT ANY WARRANTY; without even the implied warranty of
  * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
  * GNU General Public License for more details.
  *
  * You should have received a copy of the GNU General Public License
  * along with this program; if not, write to the Free Software
  * Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1335, USA
  */


 /* Based from Daniel Beer's public domain work. */

 #if 0 //UNUSED
 static void fprime_copy(byte *x, const byte *a)
 {
 	memcpy(x, a, F25519_SIZE);
 }
 #endif

 static void lm_copy(byte* x, const byte* a)
 {
 	memcpy(x, a, F25519_SIZE);
 }

 #if 0 //UNUSED
 static void fprime_select(byte *dst, const byte *zero, const byte *one, byte condition)
 {
 	const byte mask = -condition;
 	int i;

 	for (i = 0; i < F25519_SIZE; i++)
 		dst[i] = zero[i] ^ (mask & (one[i] ^ zero[i]));
 }
 #endif

 static void fe_select(byte *dst,
 		   const byte *zero, const byte *one,
 		   byte condition)
 {
 	const byte mask = -condition;
 	int i;

 	for (i = 0; i < F25519_SIZE; i++)
 		dst[i] = zero[i] ^ (mask & (one[i] ^ zero[i]));
 }

 #if 0 //UNUSED
 static void raw_add(byte *x, const byte *p)
 {
 	word16 c = 0;
 	int i;

 	for (i = 0; i < F25519_SIZE; i++) {
 		c += ((word16)x[i]) + ((word16)p[i]);
 		x[i] = (byte)c;
 		c >>= 8;
 	}
 }
 #endif

 #if 0 //UNUSED
 static void raw_try_sub(byte *x, const byte *p)
 {
 	byte minusp[F25519_SIZE];
 	word16 c = 0;
 	int i;

 	for (i = 0; i < F25519_SIZE; i++) {
 		c = ((word16)x[i]) - ((word16)p[i]) - c;
 		minusp[i] = (byte)c;
 		c = (c >> 8) & 1;
 	}

 	fprime_select(x, minusp, x, (byte)c);
 }
 #endif

 #if 0 //UNUSED
 static int prime_msb(const byte *p)
 {
     int i;
     byte x;
     int shift = 1;
     int z     = F25519_SIZE - 1;

    /*
        Test for any hot bits.
        As soon as one instance is encountered set shift to 0.
     */
 	for (i = F25519_SIZE - 1; i >= 0; i--) {
         shift &= ((shift ^ ((-p[i] | p[i]) >> 7)) & 1);
         z -= shift;
     }
 	x = p[z];
 	z <<= 3;
     shift = 1;
     for (i = 0; i < 8; i++) {
         shift &= ((-(x >> i) | (x >> i)) >> (7 - i) & 1);
         z += shift;
     }

 	return z - 1;
 }
 #endif

 #if 0 //UNUSED
 static void fprime_add(byte *r, const byte *a, const byte *modulus)
 {
 	raw_add(r, a);
 	raw_try_sub(r, modulus);
 }
 #endif

 #if 0 //UNUSED
 static void fprime_sub(byte *r, const byte *a, const byte *modulus)
 {
 	raw_add(r, modulus);
 	raw_try_sub(r, a);
 	raw_try_sub(r, modulus);
 }
 #endif

 #if 0 //UNUSED
 static void fprime_mul(byte *r, const byte *a, const byte *b,
 		const byte *modulus)
 {
 	word16 c = 0;
 	int i,j;

 	XMEMSET(r, 0, F25519_SIZE);

 	for (i = prime_msb(modulus); i >= 0; i--) {
 		const byte bit = (b[i >> 3] >> (i & 7)) & 1;
 		byte plusa[F25519_SIZE];

 	    for (j = 0; j < F25519_SIZE; j++) {
 		    c |= ((word16)r[j]) << 1;
 		    r[j] = (byte)c;
 		    c >>= 8;
 	    }
 		raw_try_sub(r, modulus);

 		fprime_copy(plusa, r);
 		fprime_add(plusa, a, modulus);

 		fprime_select(r, r, plusa, bit);
 	}
 }
 #endif

 #if 0 //UNUSED
 static void fe_load(byte *x, word32 c)
 {
 	word32 i;

 	for (i = 0; i < sizeof(c); i++) {
 		x[i] = c;
 		c >>= 8;
 	}

 	for (; i < F25519_SIZE; i++)
 		x[i] = 0;
 }
 #endif

 static void fe_normalize(byte *x)
 {
 	byte minusp[F25519_SIZE];
 	unsigned c;
 	int i;

 	/* Reduce using 2^255 = 19 mod p */
 	c = (x[31] >> 7) * 19;
 	x[31] &= 127;

 	for (i = 0; i < F25519_SIZE; i++) {
 		c += x[i];
 		x[i] = (byte)c;
 		c >>= 8;
 	}

 	/* The number is now less than 2^255 + 18, and therefore less than
 	 * 2p. Try subtracting p, and conditionally load the subtracted
 	 * value if underflow did not occur.
 	 */
 	c = 19;

 	for (i = 0; i < F25519_SIZE - 1; i++) {
 		c += x[i];
 		minusp[i] = (byte)c;
 		c >>= 8;
 	}

 	c += ((unsigned)x[i]) - 128;
 	minusp[31] = (byte)c;

 	/* Load x-p if no underflow */
 	fe_select(x, minusp, x, (c >> 15) & 1);
 }

 static void lm_add(byte* r, const byte* a, const byte* b)
 {
 	unsigned c = 0;
 	int i;

 	/* Add */
 	for (i = 0; i < F25519_SIZE; i++) {
 		c >>= 8;
 		c += ((unsigned)a[i]) + ((unsigned)b[i]);
 		r[i] = (byte)c;
 	}

 	/* Reduce with 2^255 = 19 mod p */
 	r[31] &= 127;
 	c = (c >> 7) * 19;

 	for (i = 0; i < F25519_SIZE; i++) {
 		c += r[i];
 		r[i] = (byte)c;
 		c >>= 8;
 	}
 }

 static void lm_sub(byte* r, const byte* a, const byte* b)
 {
 	word32 c = 0;
 	int i;

 	/* Calculate a + 2p - b, to avoid underflow */
 	c = 218;
 	for (i = 0; i + 1 < F25519_SIZE; i++) {
 		c += 65280 + ((word32)a[i]) - ((word32)b[i]);
 		r[i] = c;
 		c >>= 8;
 	}

 	c += ((word32)a[31]) - ((word32)b[31]);
 	r[31] = c & 127;
 	c = (c >> 7) * 19;

 	for (i = 0; i < F25519_SIZE; i++) {
 		c += r[i];
 		r[i] = c;
 		c >>= 8;
 	}
 }

 #if 0 //UNUSED
 static void lm_neg(byte* r, const byte* a)
 {
 	word32 c = 0;
 	int i;

 	/* Calculate 2p - a, to avoid underflow */
 	c = 218;
 	for (i = 0; i + 1 < F25519_SIZE; i++) {
 		c += 65280 - ((word32)a[i]);
 		r[i] = c;
 		c >>= 8;
 	}

 	c -= ((word32)a[31]);
 	r[31] = c & 127;
 	c = (c >> 7) * 19;

 	for (i = 0; i < F25519_SIZE; i++) {
 		c += r[i];
 		r[i] = c;
 		c >>= 8;
 	}
 }
 #endif

 static void fe_mul__distinct(byte *r, const byte *a, const byte *b)
 {
 	word32 c = 0;
 	int i;

 	for (i = 0; i < F25519_SIZE; i++) {
 		int j;

 		c >>= 8;
 		for (j = 0; j <= i; j++)
 			c += ((word32)a[j]) * ((word32)b[i - j]);

 		for (; j < F25519_SIZE; j++)
 			c += ((word32)a[j]) *
 			     ((word32)b[i + F25519_SIZE - j]) * 38;

 		r[i] = c;
 	}

 	r[31] &= 127;
 	c = (c >> 7) * 19;

 	for (i = 0; i < F25519_SIZE; i++) {
 		c += r[i];
 		r[i] = c;
 		c >>= 8;
 	}
 }

 #if 0 //UNUSED
 static void lm_mul(byte *r, const byte* a, const byte *b)
 {
 	byte tmp[F25519_SIZE];

 	fe_mul__distinct(tmp, a, b);
 	lm_copy(r, tmp);
 }
 #endif

 static void fe_mul_c(byte *r, const byte *a, word32 b)
 {
 	word32 c = 0;
 	int i;

 	for (i = 0; i < F25519_SIZE; i++) {
 		c >>= 8;
 		c += b * ((word32)a[i]);
 		r[i] = c;
 	}

 	r[31] &= 127;
 	c >>= 7;
 	c *= 19;

 	for (i = 0; i < F25519_SIZE; i++) {
 		c += r[i];
 		r[i] = c;
 		c >>= 8;
 	}
 }

 static void fe_inv__distinct(byte *r, const byte *x)
 {
 	byte s[F25519_SIZE];
 	int i;

 	/* This is a prime field, so by Fermat's little theorem:
 	 *
 	 *     x^(p-1) = 1 mod p
 	 *
 	 * Therefore, raise to (p-2) = 2^255-21 to get a multiplicative
 	 * inverse.
 	 *
 	 * This is a 255-bit binary number with the digits:
 	 *
 	 *     11111111... 01011
 	 *
 	 * We compute the result by the usual binary chain, but
 	 * alternate between keeping the accumulator in r and s, so as
 	 * to avoid copying temporaries.
 	 */

 	/* 1 1 */
 	fe_mul__distinct(s, x, x);
 	fe_mul__distinct(r, s, x);

 	/* 1 x 248 */
 	for (i = 0; i < 248; i++) {
 		fe_mul__distinct(s, r, r);
 		fe_mul__distinct(r, s, x);
 	}

 	/* 0 */
 	fe_mul__distinct(s, r, r);

 	/* 1 */
 	fe_mul__distinct(r, s, s);
 	fe_mul__distinct(s, r, x);

 	/* 0 */
 	fe_mul__distinct(r, s, s);

 	/* 1 */
 	fe_mul__distinct(s, r, r);
 	fe_mul__distinct(r, s, x);

 	/* 1 */
 	fe_mul__distinct(s, r, r);
 	fe_mul__distinct(r, s, x);
 }

 #if 0 //UNUSED
 static void lm_invert(byte *r, const byte *x)
 {
 	byte tmp[F25519_SIZE];

 	fe_inv__distinct(tmp, x);
 	lm_copy(r, tmp);
 }
 #endif

 #if 0 //UNUSED
 /* Raise x to the power of (p-5)/8 = 2^252-3, using s for temporary
  * storage.
  */
 static void exp2523(byte *r, const byte *x, byte *s)
 {
 	int i;

 	/* This number is a 252-bit number with the binary expansion:
 	 *
 	 *     111111... 01
 	 */

 	/* 1 1 */
 	fe_mul__distinct(r, x, x);
 	fe_mul__distinct(s, r, x);

 	/* 1 x 248 */
 	for (i = 0; i < 248; i++) {
 		fe_mul__distinct(r, s, s);
 		fe_mul__distinct(s, r, x);
 	}

 	/* 0 */
 	fe_mul__distinct(r, s, s);

 	/* 1 */
 	fe_mul__distinct(s, r, r);
 	fe_mul__distinct(r, s, x);
 }
 #endif

 #if 0 //UNUSED
 static void fe_sqrt(byte *r, const byte *a)
 {
 	byte v[F25519_SIZE];
 	byte i[F25519_SIZE];
 	byte x[F25519_SIZE];
 	byte y[F25519_SIZE];

 	/* v = (2a)^((p-5)/8) [x = 2a] */
 	fe_mul_c(x, a, 2);
 	exp2523(v, x, y);

 	/* i = 2av^2 - 1 */
 	fe_mul__distinct(y, v, v);
 	fe_mul__distinct(i, x, y);
 	fe_load(y, 1);
 	lm_sub(i, i, y);

 	/* r = avi */
 	fe_mul__distinct(x, v, a);
 	fe_mul__distinct(r, x, i);
 }
 #endif

 /* Differential addition */
 static void xc_diffadd(byte *x5, byte *z5,
 		       const byte *x1, const byte *z1,
 		       const byte *x2, const byte *z2,
 		       const byte *x3, const byte *z3)
 {
 	/* Explicit formulas database: dbl-1987-m3
 	 *
 	 * source 1987 Montgomery "Speeding the Pollard and elliptic curve
 	 *   methods of factorization", page 261, fifth display, plus
 	 *   common-subexpression elimination
 	 * compute A = X2+Z2
 	 * compute B = X2-Z2
 	 * compute C = X3+Z3
 	 * compute D = X3-Z3
 	 * compute DA = D A
 	 * compute CB = C B
 	 * compute X5 = Z1(DA+CB)^2
 	 * compute Z5 = X1(DA-CB)^2
 	 */
 	byte da[F25519_SIZE];
 	byte cb[F25519_SIZE];
 	byte a[F25519_SIZE];
 	byte b[F25519_SIZE];

 	lm_add(a, x2, z2);
 	lm_sub(b, x3, z3); /* D */
 	fe_mul__distinct(da, a, b);

 	lm_sub(b, x2, z2);
 	lm_add(a, x3, z3); /* C */
 	fe_mul__distinct(cb, a, b);

 	lm_add(a, da, cb);
 	fe_mul__distinct(b, a, a);
 	fe_mul__distinct(x5, z1, b);

 	lm_sub(a, da, cb);
 	fe_mul__distinct(b, a, a);
 	fe_mul__distinct(z5, x1, b);
 }

 /* Double an X-coordinate */
 static void xc_double(byte *x3, byte *z3,
 		      const byte *x1, const byte *z1)
 {
 	/* Explicit formulas database: dbl-1987-m
 	 *
 	 * source 1987 Montgomery "Speeding the Pollard and elliptic
 	 *   curve methods of factorization", page 261, fourth display
 	 * compute X3 = (X1^2-Z1^2)^2
 	 * compute Z3 = 4 X1 Z1 (X1^2 + a X1 Z1 + Z1^2)
 	 */
 	byte x1sq[F25519_SIZE];
 	byte z1sq[F25519_SIZE];
 	byte x1z1[F25519_SIZE];
 	byte a[F25519_SIZE];

 	fe_mul__distinct(x1sq, x1, x1);
 	fe_mul__distinct(z1sq, z1, z1);
 	fe_mul__distinct(x1z1, x1, z1);

 	lm_sub(a, x1sq, z1sq);
 	fe_mul__distinct(x3, a, a);

 	fe_mul_c(a, x1z1, 486662);
 	lm_add(a, x1sq, a);
 	lm_add(a, z1sq, a);
 	fe_mul__distinct(x1sq, x1z1, a);
 	fe_mul_c(z3, x1sq, 4);
 }

 void FAST_FUNC curve25519(byte *result, const byte *e, const byte *q)
 {
 	int i;

 	struct {
 		/* from wolfssl-3.15.3/wolfssl/wolfcrypt/fe_operations.h */
 		/*static const*/ byte f25519_one[F25519_SIZE]; // = {1};

 		/* Current point: P_m */
 		byte xm[F25519_SIZE];
 		byte zm[F25519_SIZE]; // = {1};
 		/* Predecessor: P_(m-1) */
 		byte xm1[F25519_SIZE]; // = {1};
 		byte zm1[F25519_SIZE]; // = {0};
 	} z;
 #define f25519_one z.f25519_one
 #define xm         z.xm
 #define zm         z.zm
 #define xm1        z.xm1
 #define zm1        z.zm1
 	memset(&z, 0, sizeof(z));
 	f25519_one[0] = 1;
 	zm[0] = 1;
 	xm1[0] = 1;

 	/* Note: bit 254 is assumed to be 1 */
 	lm_copy(xm, q);

 	for (i = 253; i >= 0; i--) {
 		const int bit = (e[i >> 3] >> (i & 7)) & 1;
 		byte xms[F25519_SIZE];
 		byte zms[F25519_SIZE];

 		/* From P_m and P_(m-1), compute P_(2m) and P_(2m-1) */
 		xc_diffadd(xm1, zm1, q, f25519_one, xm, zm, xm1, zm1);
 		xc_double(xm, zm, xm, zm);

 		/* Compute P_(2m+1) */
 		xc_diffadd(xms, zms, xm1, zm1, xm, zm, q, f25519_one);

 		/* Select:
 		 *   bit = 1 --> (P_(2m+1), P_(2m))
 		 *   bit = 0 --> (P_(2m), P_(2m-1))
 		 */
 		fe_select(xm1, xm1, xm, bit);
 		fe_select(zm1, zm1, zm, bit);
 		fe_select(xm, xm, xms, bit);
 		fe_select(zm, zm, zms, bit);
 	}

 	/* Freeze out of projective coordinates */
 	fe_inv__distinct(zm1, zm);
 	fe_mul__distinct(result, zm1, xm);
 	fe_normalize(result);
 }
	/*
	* Copyright (C) 2018 Denys Vlasenko
	*
	* Licensed under GPLv2, see file LICENSE in this source tree.
	*/
	#include "tls.h"

	typedef uint8_t byte;
	typedef uint16_t word16;
	typedef uint32_t word32;
	#define XMEMSET memset

	#define F25519_SIZE CURVE25519_KEYSIZE

	/* The code below is taken from wolfssl-3.15.3/wolfcrypt/src/fe_low_mem.c
	* Header comment is kept intact:
	*/

	/* fe_low_mem.c
	*
	* Copyright (C) 2006-2017 wolfSSL Inc.
	*
	* This file is part of wolfSSL.
	*
	* wolfSSL is free software; you can redistribute it and/or modify
	* it under the terms of the GNU General Public License as published by
	* the Free Software Foundation; either version 2 of the License, or
	* (at your option) any later version.
	*
	* wolfSSL is distributed in the hope that it will be useful,
	* but WITHOUT ANY WARRANTY; without even the implied warranty of
	* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
	* GNU General Public License for more details.
	*
	* You should have received a copy of the GNU General Public License
	* along with this program; if not, write to the Free Software
	* Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1335, USA
	*/


	/* Based from Daniel Beer's public domain work. */

	#if 0 //UNUSED
	static void fprime_copy(byte x, const byte a)
	{
	memcpy(x, a, F25519_SIZE);
	}
	#endif

	static void lm_copy(byte* x, const byte* a)
	{
	memcpy(x, a, F25519_SIZE);
	}

	#if 0 //UNUSED
	static void fprime_select(byte dst, const byte zero, const byte *one, byte condition)
	{
	const byte mask = -condition;
	int i;

	for (i = 0; i < F25519_SIZE; i++)
	dst[i] = zero[i] ^ (mask & (one[i] ^ zero[i]));
	}
	#endif

	static void fe_select(byte *dst,
	const byte zero, const byte one,
	byte condition)
	{
	const byte mask = -condition;
	int i;

	for (i = 0; i < F25519_SIZE; i++)
	dst[i] = zero[i] ^ (mask & (one[i] ^ zero[i]));
	}

	#if 0 //UNUSED
	static void raw_add(byte x, const byte p)
	{
	word16 c = 0;
	int i;

	for (i = 0; i < F25519_SIZE; i++) {
	c += ((word16)x[i]) + ((word16)p[i]);
	x[i] = (byte)c;
	c >>= 8;
	}
	}
	#endif

	#if 0 //UNUSED
	static void raw_try_sub(byte x, const byte p)
	{
	byte minusp[F25519_SIZE];
	word16 c = 0;
	int i;

	for (i = 0; i < F25519_SIZE; i++) {
	c = ((word16)x[i]) - ((word16)p[i]) - c;
	minusp[i] = (byte)c;
	c = (c >> 8) & 1;
	}

	fprime_select(x, minusp, x, (byte)c);
	}
	#endif

	#if 0 //UNUSED
	static int prime_msb(const byte *p)
	{
	int i;
	byte x;
	int shift = 1;
	int z = F25519_SIZE - 1;

	/*
	Test for any hot bits.
	As soon as one instance is encountered set shift to 0.
	*/
	for (i = F25519_SIZE - 1; i >= 0; i--) {
	shift &= ((shift ^ ((-p[i] \| p[i]) >> 7)) & 1);
	z -= shift;
	}
	x = p[z];
	z <<= 3;
	shift = 1;
	for (i = 0; i < 8; i++) {
	shift &= ((-(x >> i) \| (x >> i)) >> (7 - i) & 1);
	z += shift;
	}

	return z - 1;
	}
	#endif

	#if 0 //UNUSED
	static void fprime_add(byte r, const byte a, const byte *modulus)
	{
	raw_add(r, a);
	raw_try_sub(r, modulus);
	}
	#endif

	#if 0 //UNUSED
	static void fprime_sub(byte r, const byte a, const byte *modulus)
	{
	raw_add(r, modulus);
	raw_try_sub(r, a);
	raw_try_sub(r, modulus);
	}
	#endif

	#if 0 //UNUSED
	static void fprime_mul(byte r, const byte a, const byte *b,
	const byte *modulus)
	{
	word16 c = 0;
	int i,j;

	XMEMSET(r, 0, F25519_SIZE);

	for (i = prime_msb(modulus); i >= 0; i--) {
	const byte bit = (b[i >> 3] >> (i & 7)) & 1;
	byte plusa[F25519_SIZE];

	for (j = 0; j < F25519_SIZE; j++) {
	c \|= ((word16)r[j]) << 1;
	r[j] = (byte)c;
	c >>= 8;
	}
	raw_try_sub(r, modulus);

	fprime_copy(plusa, r);
	fprime_add(plusa, a, modulus);

	fprime_select(r, r, plusa, bit);
	}
	}
	#endif

	#if 0 //UNUSED
	static void fe_load(byte *x, word32 c)
	{
	word32 i;

	for (i = 0; i < sizeof(c); i++) {
	x[i] = c;
	c >>= 8;
	}

	for (; i < F25519_SIZE; i++)
	x[i] = 0;
	}
	#endif

	static void fe_normalize(byte *x)
	{
	byte minusp[F25519_SIZE];
	unsigned c;
	int i;

	/* Reduce using 2^255 = 19 mod p */
	c = (x[31] >> 7) * 19;
	x[31] &= 127;

	for (i = 0; i < F25519_SIZE; i++) {
	c += x[i];
	x[i] = (byte)c;
	c >>= 8;
	}

	/* The number is now less than 2^255 + 18, and therefore less than
	* 2p. Try subtracting p, and conditionally load the subtracted
	* value if underflow did not occur.
	*/
	c = 19;

	for (i = 0; i < F25519_SIZE - 1; i++) {
	c += x[i];
	minusp[i] = (byte)c;
	c >>= 8;
	}

	c += ((unsigned)x[i]) - 128;
	minusp[31] = (byte)c;

	/* Load x-p if no underflow */
	fe_select(x, minusp, x, (c >> 15) & 1);
	}

	static void lm_add(byte* r, const byte* a, const byte* b)
	{
	unsigned c = 0;
	int i;

	/* Add */
	for (i = 0; i < F25519_SIZE; i++) {
	c >>= 8;
	c += ((unsigned)a[i]) + ((unsigned)b[i]);
	r[i] = (byte)c;
	}

	/* Reduce with 2^255 = 19 mod p */
	r[31] &= 127;
	c = (c >> 7) * 19;

	for (i = 0; i < F25519_SIZE; i++) {
	c += r[i];
	r[i] = (byte)c;
	c >>= 8;
	}
	}

	static void lm_sub(byte* r, const byte* a, const byte* b)
	{
	word32 c = 0;
	int i;

	/* Calculate a + 2p - b, to avoid underflow */
	c = 218;
	for (i = 0; i + 1 < F25519_SIZE; i++) {
	c += 65280 + ((word32)a[i]) - ((word32)b[i]);
	r[i] = c;
	c >>= 8;
	}

	c += ((word32)a[31]) - ((word32)b[31]);
	r[31] = c & 127;
	c = (c >> 7) * 19;

	for (i = 0; i < F25519_SIZE; i++) {
	c += r[i];
	r[i] = c;
	c >>= 8;
	}
	}

	#if 0 //UNUSED
	static void lm_neg(byte* r, const byte* a)
	{
	word32 c = 0;
	int i;

	/* Calculate 2p - a, to avoid underflow */
	c = 218;
	for (i = 0; i + 1 < F25519_SIZE; i++) {
	c += 65280 - ((word32)a[i]);
	r[i] = c;
	c >>= 8;
	}

	c -= ((word32)a[31]);
	r[31] = c & 127;
	c = (c >> 7) * 19;

	for (i = 0; i < F25519_SIZE; i++) {
	c += r[i];
	r[i] = c;
	c >>= 8;
	}
	}
	#endif

	static void fe_mul__distinct(byte r, const byte a, const byte *b)
	{
	word32 c = 0;
	int i;

	for (i = 0; i < F25519_SIZE; i++) {
	int j;

	c >>= 8;
	for (j = 0; j <= i; j++)
	c += ((word32)a[j]) * ((word32)b[i - j]);

	for (; j < F25519_SIZE; j++)
	c += ((word32)a[j]) *
	((word32)b[i + F25519_SIZE - j]) * 38;

	r[i] = c;
	}

	r[31] &= 127;
	c = (c >> 7) * 19;

	for (i = 0; i < F25519_SIZE; i++) {
	c += r[i];
	r[i] = c;
	c >>= 8;
	}
	}

	#if 0 //UNUSED
	static void lm_mul(byte r, const byte a, const byte *b)
	{
	byte tmp[F25519_SIZE];

	fe_mul__distinct(tmp, a, b);
	lm_copy(r, tmp);
	}
	#endif

	static void fe_mul_c(byte r, const byte a, word32 b)
	{
	word32 c = 0;
	int i;

	for (i = 0; i < F25519_SIZE; i++) {
	c >>= 8;
	c += b * ((word32)a[i]);
	r[i] = c;
	}

	r[31] &= 127;
	c >>= 7;
	c *= 19;

	for (i = 0; i < F25519_SIZE; i++) {
	c += r[i];
	r[i] = c;
	c >>= 8;
	}
	}

	static void fe_inv__distinct(byte r, const byte x)
	{
	byte s[F25519_SIZE];
	int i;

	/* This is a prime field, so by Fermat's little theorem:
	*
	* x^(p-1) = 1 mod p
	*
	* Therefore, raise to (p-2) = 2^255-21 to get a multiplicative
	* inverse.
	*
	* This is a 255-bit binary number with the digits:
	*
	* 11111111... 01011
	*
	* We compute the result by the usual binary chain, but
	* alternate between keeping the accumulator in r and s, so as
	* to avoid copying temporaries.
	*/

	/* 1 1 */
	fe_mul__distinct(s, x, x);
	fe_mul__distinct(r, s, x);

	/* 1 x 248 */
	for (i = 0; i < 248; i++) {
	fe_mul__distinct(s, r, r);
	fe_mul__distinct(r, s, x);
	}

	/* 0 */
	fe_mul__distinct(s, r, r);

	/* 1 */
	fe_mul__distinct(r, s, s);
	fe_mul__distinct(s, r, x);

	/* 0 */
	fe_mul__distinct(r, s, s);

	/* 1 */
	fe_mul__distinct(s, r, r);
	fe_mul__distinct(r, s, x);

	/* 1 */
	fe_mul__distinct(s, r, r);
	fe_mul__distinct(r, s, x);
	}

	#if 0 //UNUSED
	static void lm_invert(byte r, const byte x)
	{
	byte tmp[F25519_SIZE];

	fe_inv__distinct(tmp, x);
	lm_copy(r, tmp);
	}
	#endif

	#if 0 //UNUSED
	/* Raise x to the power of (p-5)/8 = 2^252-3, using s for temporary
	* storage.
	*/
	static void exp2523(byte r, const byte x, byte *s)
	{
	int i;

	/* This number is a 252-bit number with the binary expansion:
	*
	* 111111... 01
	*/

	/* 1 1 */
	fe_mul__distinct(r, x, x);
	fe_mul__distinct(s, r, x);

	/* 1 x 248 */
	for (i = 0; i < 248; i++) {
	fe_mul__distinct(r, s, s);
	fe_mul__distinct(s, r, x);
	}

	/* 0 */
	fe_mul__distinct(r, s, s);

	/* 1 */
	fe_mul__distinct(s, r, r);
	fe_mul__distinct(r, s, x);
	}
	#endif

	#if 0 //UNUSED
	static void fe_sqrt(byte r, const byte a)
	{
	byte v[F25519_SIZE];
	byte i[F25519_SIZE];
	byte x[F25519_SIZE];
	byte y[F25519_SIZE];

	/* v = (2a)^((p-5)/8) [x = 2a] */
	fe_mul_c(x, a, 2);
	exp2523(v, x, y);

	/* i = 2av^2 - 1 */
	fe_mul__distinct(y, v, v);
	fe_mul__distinct(i, x, y);
	fe_load(y, 1);
	lm_sub(i, i, y);

	/* r = avi */
	fe_mul__distinct(x, v, a);
	fe_mul__distinct(r, x, i);
	}
	#endif

	/* Differential addition */
	static void xc_diffadd(byte x5, byte z5,
	const byte x1, const byte z1,
	const byte x2, const byte z2,
	const byte x3, const byte z3)
	{
	/* Explicit formulas database: dbl-1987-m3
	*
	* source 1987 Montgomery "Speeding the Pollard and elliptic curve
	* methods of factorization", page 261, fifth display, plus
	* common-subexpression elimination
	* compute A = X2+Z2
	* compute B = X2-Z2
	* compute C = X3+Z3
	* compute D = X3-Z3
	* compute DA = D A
	* compute CB = C B
	* compute X5 = Z1(DA+CB)^2
	* compute Z5 = X1(DA-CB)^2
	*/
	byte da[F25519_SIZE];
	byte cb[F25519_SIZE];
	byte a[F25519_SIZE];
	byte b[F25519_SIZE];

	lm_add(a, x2, z2);
	lm_sub(b, x3, z3); /* D */
	fe_mul__distinct(da, a, b);

	lm_sub(b, x2, z2);
	lm_add(a, x3, z3); /* C */
	fe_mul__distinct(cb, a, b);

	lm_add(a, da, cb);
	fe_mul__distinct(b, a, a);
	fe_mul__distinct(x5, z1, b);

	lm_sub(a, da, cb);
	fe_mul__distinct(b, a, a);
	fe_mul__distinct(z5, x1, b);
	}

	/* Double an X-coordinate */
	static void xc_double(byte x3, byte z3,
	const byte x1, const byte z1)
	{
	/* Explicit formulas database: dbl-1987-m
	*
	* source 1987 Montgomery "Speeding the Pollard and elliptic
	* curve methods of factorization", page 261, fourth display
	* compute X3 = (X1^2-Z1^2)^2
	* compute Z3 = 4 X1 Z1 (X1^2 + a X1 Z1 + Z1^2)
	*/
	byte x1sq[F25519_SIZE];
	byte z1sq[F25519_SIZE];
	byte x1z1[F25519_SIZE];
	byte a[F25519_SIZE];

	fe_mul__distinct(x1sq, x1, x1);
	fe_mul__distinct(z1sq, z1, z1);
	fe_mul__distinct(x1z1, x1, z1);

	lm_sub(a, x1sq, z1sq);
	fe_mul__distinct(x3, a, a);

	fe_mul_c(a, x1z1, 486662);
	lm_add(a, x1sq, a);
	lm_add(a, z1sq, a);
	fe_mul__distinct(x1sq, x1z1, a);
	fe_mul_c(z3, x1sq, 4);
	}

	void FAST_FUNC curve25519(byte result, const byte e, const byte *q)
	{
	int i;

	struct {
	/* from wolfssl-3.15.3/wolfssl/wolfcrypt/fe_operations.h */
	/static const/ byte f25519_one[F25519_SIZE]; // = {1};

	/* Current point: P_m */
	byte xm[F25519_SIZE];
	byte zm[F25519_SIZE]; // = {1};
	/* Predecessor: P_(m-1) */
	byte xm1[F25519_SIZE]; // = {1};
	byte zm1[F25519_SIZE]; // = {0};
	} z;
	#define f25519_one z.f25519_one
	#define xm z.xm
	#define zm z.zm
	#define xm1 z.xm1
	#define zm1 z.zm1
	memset(&z, 0, sizeof(z));
	f25519_one[0] = 1;
	zm[0] = 1;
	xm1[0] = 1;

	/* Note: bit 254 is assumed to be 1 */
	lm_copy(xm, q);

	for (i = 253; i >= 0; i--) {
	const int bit = (e[i >> 3] >> (i & 7)) & 1;
	byte xms[F25519_SIZE];
	byte zms[F25519_SIZE];

	/* From P_m and P_(m-1), compute P_(2m) and P_(2m-1) */
	xc_diffadd(xm1, zm1, q, f25519_one, xm, zm, xm1, zm1);
	xc_double(xm, zm, xm, zm);

	/* Compute P_(2m+1) */
	xc_diffadd(xms, zms, xm1, zm1, xm, zm, q, f25519_one);

	/* Select:
	* bit = 1 --> (P_(2m+1), P_(2m))
	* bit = 0 --> (P_(2m), P_(2m-1))
	*/
	fe_select(xm1, xm1, xm, bit);
	fe_select(zm1, zm1, zm, bit);
	fe_select(xm, xm, xms, bit);
	fe_select(zm, zm, zms, bit);
	}

	/* Freeze out of projective coordinates */
	fe_inv__distinct(zm1, zm);
	fe_mul__distinct(result, zm1, xm);
	fe_normalize(result);
	}