If using an **external library** is an option then have a look at this question. You can use TTMath which is a very simple header for big precision math. On 32-bit architectures `ttmath:UInt<4>`

will create a 128-bit `int`

type with four 32-bit limbs.

If you must **write it your own** then there are already a lot of solutions on SO and I'll summarize them here

For **addition and subtraction**, it's very easy and straightforward, simply add/subtract the words (which big int libraries often called *limbs*) from the lowest significant to higher significant, with carry of course.

```
typedef struct INT128 {
uint64_t H, L;
} my_uint128_t;
inline my_uint128_t add(my_uint128_t a, my_uint128_t b)
{
my_uint128_t c;
c.L = a.L + b.L;
c.H = a.H + b.H + (c.L < a.L); // c = a + b
return c;
}
```

The assembly output can be checked with Compiler Explorer

The compilers can already generate efficient code for double-word operations, but many aren't smart enough to use "add with carry" when compiling multi-word operations from high level languages as you can see in the question efficient 128-bit addition using carry flag. Therefore using 2 `long long`

s like above will make it not only more readable but also easier for the compiler to emit a little more efficient code.

If that still doesn't suit your performance requirement, you must use intrinsic or write it in assembly. To add the 128-bit value stored in `bignum`

to the 128-bit value in {eax, ebx, ecx, edx} you can use the following code

```
add edx, [bignum]
adc ecx, [bignum+4]
adc ebx, [bignum+8]
adc eax, [bignum+12]
```

The equivalent intrinsic will be like this for Clang

```
unsigned *x, *y, *z, carryin=0, carryout;
z[0] = __builtin_addc(x[0], y[0], carryin, &carryout);
carryin = carryout;
z[1] = __builtin_addc(x[1], y[1], carryin, &carryout);
carryin = carryout;
z[2] = __builtin_addc(x[2], y[2], carryin, &carryout);
carryin = carryout;
z[3] = __builtin_addc(x[3], y[3], carryin, &carryout);
```

You need to change the intrinsic to the one supported by your compiler, for example `__builtin_uadd_overflow`

in gcc, or `_addcarry_u32`

for MSVC and ICC

For more information read these

For **bit shifts** you can find the C solution in the question Bitwise shift operation on a 128-bit number. This is a simple left shift but you can unroll the recursive call for more performance

```
void shiftl128 (
unsigned int& a,
unsigned int& b,
unsigned int& c,
unsigned int& d,
size_t k)
{
assert (k <= 128);
if (k >= 32) // shifting a 32-bit integer by more than 31 bits is "undefined"
{
a=b;
b=c;
c=d;
d=0;
shiftl128(a,b,c,d,k-32);
}
else
{
a = (a << k) | (b >> (32-k));
b = (b << k) | (c >> (32-k));
c = (c << k) | (d >> (32-k));
d = (d << k);
}
}
```

The assembly for less-than-32-bit shifts can be found in the question 128-bit shifts using assembly language?

```
shld edx, ecx, cl
shld ecx, ebx, cl
shld ebx, eax, cl
shl eax, cl
```

Right shifts can be implemented similarly, or just copy from the above linked question

**Multiplication and divisions** are a lot more complex and you can reference the solution in the question Efficient Multiply/Divide of two 128-bit Integers on x86 (no 64-bit):

```
class int128_t
{
uint32_t dw3, dw2, dw1, dw0;
// Various constrctors, operators, etc...
int128_t& operator*=(const int128_t& rhs) __attribute__((always_inline))
{
int128_t Urhs(rhs);
uint32_t lhs_xor_mask = (int32_t(dw3) >> 31);
uint32_t rhs_xor_mask = (int32_t(Urhs.dw3) >> 31);
uint32_t result_xor_mask = (lhs_xor_mask ^ rhs_xor_mask);
dw0 ^= lhs_xor_mask;
dw1 ^= lhs_xor_mask;
dw2 ^= lhs_xor_mask;
dw3 ^= lhs_xor_mask;
Urhs.dw0 ^= rhs_xor_mask;
Urhs.dw1 ^= rhs_xor_mask;
Urhs.dw2 ^= rhs_xor_mask;
Urhs.dw3 ^= rhs_xor_mask;
*this += (lhs_xor_mask & 1);
Urhs += (rhs_xor_mask & 1);
struct mul128_t
{
int128_t dqw1, dqw0;
mul128_t(const int128_t& dqw1, const int128_t& dqw0): dqw1(dqw1), dqw0(dqw0){}
};
mul128_t data(Urhs,*this);
asm volatile(
"push %%ebp \n\
movl %%eax, %%ebp \n\
movl $0x00, %%ebx \n\
movl $0x00, %%ecx \n\
movl $0x00, %%esi \n\
movl $0x00, %%edi \n\
movl 28(%%ebp), %%eax #Calc: (dw0*dw0) \n\
mull 12(%%ebp) \n\
addl %%eax, %%ebx \n\
adcl %%edx, %%ecx \n\
adcl $0x00, %%esi \n\
adcl $0x00, %%edi \n\
movl 24(%%ebp), %%eax #Calc: (dw1*dw0) \n\
mull 12(%%ebp) \n\
addl %%eax, %%ecx \n\
adcl %%edx, %%esi \n\
adcl $0x00, %%edi \n\
movl 20(%%ebp), %%eax #Calc: (dw2*dw0) \n\
mull 12(%%ebp) \n\
addl %%eax, %%esi \n\
adcl %%edx, %%edi \n\
movl 16(%%ebp), %%eax #Calc: (dw3*dw0) \n\
mull 12(%%ebp) \n\
addl %%eax, %%edi \n\
movl 28(%%ebp), %%eax #Calc: (dw0*dw1) \n\
mull 8(%%ebp) \n\
addl %%eax, %%ecx \n\
adcl %%edx, %%esi \n\
adcl $0x00, %%edi \n\
movl 24(%%ebp), %%eax #Calc: (dw1*dw1) \n\
mull 8(%%ebp) \n\
addl %%eax, %%esi \n\
adcl %%edx, %%edi \n\
movl 20(%%ebp), %%eax #Calc: (dw2*dw1) \n\
mull 8(%%ebp) \n\
addl %%eax, %%edi \n\
movl 28(%%ebp), %%eax #Calc: (dw0*dw2) \n\
mull 4(%%ebp) \n\
addl %%eax, %%esi \n\
adcl %%edx, %%edi \n\
movl 24(%%ebp), %%eax #Calc: (dw1*dw2) \n\
mull 4(%%ebp) \n\
addl %%eax, %%edi \n\
movl 28(%%ebp), %%eax #Calc: (dw0*dw3) \n\
mull (%%ebp) \n\
addl %%eax, %%edi \n\
pop %%ebp \n"
:"=b"(this->dw0),"=c"(this->dw1),"=S"(this->dw2),"=D"(this->dw3)
:"a"(&data):"%ebp");
dw0 ^= result_xor_mask;
dw1 ^= result_xor_mask;
dw2 ^= result_xor_mask;
dw3 ^= result_xor_mask;
return (*this += (result_xor_mask & 1));
}
};
```

You can also find a lot of related questions with the 128bit tag

check:"8 Low-level Functions": gmplib.org/manual/Low_002dlevel-Functions.html – Galik Dec 3 '14 at 0:07