# BFV-multiply In HomomorphicEncryption: BFV, BGV, CKKS Schema for Fully Homomorphic Encryption

```knitr::opts_chunk\$set(
collapse = TRUE,
comment = "#>"
)
```

Load libraries that will be used.

```library(polynom)
library(HomomorphicEncryption)
```

Set some parameters.

```d  =      4
n  =      2^d
p  =     (n/2)-1
q  = 424242
pm = GenPolyMod(n)
```

Set a working seed for random numbers

```set.seed(123)
```

Create the secret key and the polynomials a and e, which will go into the public key

```# generate a secret key
s = GenSecretKey(n)

# generate a
a = GenA(n, q)

# generate the error
e = GenError(n)
```

Generate the public key.

```# generate the public key
pk0 = GenPubKey0(a, s, e, pm, q)
pk1 = GenPubKey1(a)
```

Create polynomials for the encryption

```# polynomials for encryption
e1 = GenError(n)
e2 = GenError(n)
u  = GenU(n)
```

Now create to messages to multiply.

```m1 = polynomial(c(3, 2, 2))
m2 = polynomial(c(0, 2   ))
```

Encrypt the two messages (i.e. genete the ct0 and ct1 part for each m1 and m2).

```m1_ct0 = EncryptPoly0(m1, pk0, u, e1, p, pm, q)
m1_ct1 = EncryptPoly1(    pk1, u, e2,    pm, q)
m2_ct0 = EncryptPoly0(m2, pk0, u, e1, p, pm, q)
m2_ct1 = EncryptPoly1(    pk1, u, e2,    pm, q)
```

Multiply the encrypted messages.

```multi_ct0 = m1_ct0 * m2_ct0 * (p/q)
multi_ct0 = multi_ct0 %% pm
multi_ct0 = CoefMod(multi_ct0, q)
multi_ct0 = round(multi_ct0)

multi_ct1 = (m1_ct0 * m2_ct1 + m1_ct1 * m2_ct0) * (p/q)
multi_ct1 = multi_ct1 %% pm
multi_ct1 = CoefMod(multi_ct1, q)
multi_ct1 = round(multi_ct1)

multi_ct2 = (m1_ct1 * m2_ct1) * (p/q)
multi_ct2 = multi_ct2 %% pm
multi_ct2 = CoefMod(multi_ct2, q)
multi_ct2 = round(multi_ct2)
```

Decrypt the multiple

```decrypt = (multi_ct2 * s^2) + (multi_ct1 * s) + multi_ct0
decrypt = decrypt %% pm
decrypt = CoefMod(decrypt, q)

# rescale
decrypt = decrypt * p/q

# round then mod p
decrypt = CoefMod(round(decrypt), p)
print(decrypt)
```

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HomomorphicEncryption documentation built on May 29, 2024, 9:59 a.m.