Blom's scheme

Blom's scheme is a symmetric threshold key exchange protocol in cryptography.

A trusted party gives each participant a secret key and a public identifier, which enables any two participants to independently create a shared key for communicating.

Every participant can create a shared key with any other participant, allowing secure communication to take place between any two members of the group. However, if an attacker can compromise the keys of at least k users, he can break the scheme and reconstruct every shared key. Blom's scheme is a form of threshold secret sharing. The scheme was proposed by the Swedish cryptographer Rolf Blom in a series of articles in the early 1980s.^[1][2]

Blom's scheme is currently used by the HDCP copy protection scheme to generate shared keys for high-definition content sources and receivers, such as HD DVD players and high-definition televisions.

The protocol

The key exchange protocol involves a trusted party (Trent) and a group of ${\displaystyle \scriptstyle n}$ users. Let Alice and Bob be two users of the group.

Protocol setup

Trent chooses a random and secret symmetric matrix ${\displaystyle \scriptstyle D_{k,k}}$ over the finite field ${\displaystyle \scriptstyle GF(p)}$, where p is a prime number. ${\displaystyle \scriptstyle D}$ is required when a new user is to be added to the key sharing group.

For example:

${\displaystyle \begin{align} p &= 17\\ D &= \begin{pmatrix} 1&6&2\\6&3&8\\2&8&2\end{pmatrix}\ \mathrm{mod}\ 17 \end{align}}$

Inserting a new participant

New users Alice and Bob want to join the key exchanging group. Trent chooses public identifiers for each of them; i.e., k-element vectors:

${\displaystyle I_{\mathrm{Alice}}, I_{\mathrm{Bob}} \in GF(p)}$.

For example:

${\displaystyle I_{\mathrm{Alice}} = \begin{pmatrix} 3 \\ 10 \\ 11 \end{pmatrix}, I_{\mathrm{Bob}} = \begin{pmatrix} 1 \\ 3 \\ 15 \end{pmatrix}}$

Trent then computes their private keys:

${\displaystyle \begin{align} g_{\mathrm{Alice}} &= DI_{\mathrm{Alice}}\\ g_{\mathrm{Bob}} &= DI_{\mathrm{Bob}} \end{align}}$

Each will use their private key to compute shared keys with other participants of the group. Trent will create Alice's and Bob's secret keys as follows:

${\displaystyle \begin{align} g_{\mathrm{Alice}} &= \begin{pmatrix} 1&6&2\\6&3&8\\2&8&2\end{pmatrix}\begin{pmatrix} 3 \\ 10 \\ 11 \end{pmatrix} = \begin{pmatrix} 0\\0\\6\end{pmatrix}\ \mathrm{mod}\ 17\\ g_{\mathrm{Bob}} &= \begin{pmatrix} 1&6&2\\6&3&8\\2&8&2\end{pmatrix}\begin{pmatrix} 1 \\ 3 \\ 15 \end{pmatrix} = \begin{pmatrix} 15\\16\\5\end{pmatrix}\ \mathrm{mod}\ 17 \end{align}}$

Computing a shared key between Alice and Bob

Now Alice and Bob wish to communicate with one another. Alice has Bob's identifier ${\displaystyle \scriptstyle I_{\mathrm{Bob}}}$ and her private key ${\displaystyle \scriptstyle g_{\mathrm{Alice}}}$.

She computes the shared key ${\displaystyle \scriptstyle k_{\mathrm{Alice / Bob}} = g_{\mathrm{Alice}}^t I_{\mathrm{Bob}}}$, where ${\displaystyle \scriptstyle t}$ denotes matrix transpose. Bob does the same, using his private key and her identifier, giving the same result:

${\displaystyle k_{\mathrm{Alice / Bob}} = k_{\mathrm{Alice / Bob}}^t = (g_{\mathrm{Alice}}^t I_{\mathrm{Bob}})^t = (I_{\mathrm{Alice}}^t D^t I_{\mathrm{Bob}})^t = I_{\mathrm{Bob}}^t D I_{\mathrm{Alice}} = k_{\mathrm{Bob / Alice}}}$

They will each generate their shared key as follows:

${\displaystyle \begin{align} k_{\mathrm{Alice / Bob}} &= \begin{pmatrix} 0\\0\\6 \end{pmatrix}^t \begin{pmatrix} 1\\3\\15 \end{pmatrix} = 0 \times 1 + 0 \times 3 + 6 \times 15 = 5\ \mathrm{mod}\ 17\\ k_{\mathrm{Bob / Alice}} &= \begin{pmatrix} 15\\16\\5 \end{pmatrix}^t \begin{pmatrix} 3\\10\\11 \end{pmatrix} = 15 \times 3 + 16 \times 10 + 5 \times 11 = 5\ \mathrm{mod}\ 17 \end{align}}$

Attack resistance

In order to ensure at least k keys must be compromised before every shared key can be computed by an attacker, identifiers must be k-linearly independent: all k-sets of randomly selected user identifiers must be linearly independent. Otherwise, a group of malicious users can compute the key of any other member whose identifier is linearly dependent to theirs. To ensure this property, the identifiers shall be preferably chosen from a MDS-Code matrix (maximum distance separable error correction code matrix). The rows of the MDS-Matrix would be the identifiers of the users. A MDS-Code matrix can be chosen in practice using the code-matrix of the Reed–Solomon error correction code (this error correction code requires only easily understandable mathematics and can be computed extremely quickly).

References

• R. Blom, "An optimal class of symmetric key generation systems". Abbreviated version of the original Blom's work

1. Rolf Blom. Non-public key distribution. In Proc. CRYPTO 82, pages 231–236, New York, 1983. Plenum Press
2. R. Blom, "An optimal class of symmetric key generation systems", Report LiTH-ISY-I-0641, Linköping University, 1984

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