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-rw-r--r--lib/inets/test/erl_make_certs.erl107
1 files changed, 80 insertions, 27 deletions
diff --git a/lib/inets/test/erl_make_certs.erl b/lib/inets/test/erl_make_certs.erl
index 5b92e551a5..22dc951ac1 100644
--- a/lib/inets/test/erl_make_certs.erl
+++ b/lib/inets/test/erl_make_certs.erl
@@ -45,7 +45,7 @@
%% {dnQualifer, DnQ}
%% issuer = {Issuer, IssuerKey} true (i.e. a ca cert is created)
%% (obs IssuerKey migth be {Key, Password}
-%% key = KeyFile|KeyBin|rsa|dsa Subject PublicKey rsa or dsa generates key
+%% key = KeyFile|KeyBin|rsa|dsa|ec Subject PublicKey rsa, dsa or ec generates key
%%
%%
%% (OBS: The generated keys are for testing only)
@@ -91,6 +91,16 @@ gen_dsa(LSize,NSize) when is_integer(LSize), is_integer(NSize) ->
{Key, encode_key(Key)}.
%%--------------------------------------------------------------------
+%% @doc Creates a ec key (OBS: for testing only)
+%% the sizes are in bytes
+%% @spec (::integer()) -> {::atom(), ::binary(), ::opaque()}
+%% @end
+%%--------------------------------------------------------------------
+gen_ec(Curve) when is_atom(Curve) ->
+ Key = gen_ec2(Curve),
+ {Key, encode_key(Key)}.
+
+%%--------------------------------------------------------------------
%% @doc Verifies cert signatures
%% @spec (::binary(), ::tuple()) -> ::boolean()
%% @end
@@ -102,7 +112,10 @@ verify_signature(DerEncodedCert, DerKey, _KeyParams) ->
public_key:pkix_verify(DerEncodedCert,
#'RSAPublicKey'{modulus=Mod, publicExponent=Exp});
#'DSAPrivateKey'{p=P, q=Q, g=G, y=Y} ->
- public_key:pkix_verify(DerEncodedCert, {Y, #'Dss-Parms'{p=P, q=Q, g=G}})
+ public_key:pkix_verify(DerEncodedCert, {Y, #'Dss-Parms'{p=P, q=Q, g=G}});
+ #'ECPrivateKey'{version = _Version, privateKey = _PrivKey,
+ parameters = Params, publicKey = {0, PubKey}} ->
+ public_key:pkix_verify(DerEncodedCert, {#'ECPoint'{point = PubKey}, Params})
end.
%%%%%%%%%%%%%%%%%%%%%%%%% Implementation %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
@@ -112,6 +125,7 @@ get_key(Opts) ->
undefined -> make_key(rsa, Opts);
rsa -> make_key(rsa, Opts);
dsa -> make_key(dsa, Opts);
+ ec -> make_key(ec, Opts);
Key ->
Password = proplists:get_value(password, Opts, no_passwd),
decode_key(Key, Password)
@@ -129,6 +143,8 @@ decode_key(#'RSAPrivateKey'{} = Key,_) ->
Key;
decode_key(#'DSAPrivateKey'{} = Key,_) ->
Key;
+decode_key(#'ECPrivateKey'{} = Key,_) ->
+ Key;
decode_key(PemEntry = {_,_,_}, Pw) ->
public_key:pem_entry_decode(PemEntry, Pw);
decode_key(PemBin, Pw) ->
@@ -140,7 +156,10 @@ encode_key(Key = #'RSAPrivateKey'{}) ->
{'RSAPrivateKey', Der, not_encrypted};
encode_key(Key = #'DSAPrivateKey'{}) ->
{ok, Der} = 'OTP-PUB-KEY':encode('DSAPrivateKey', Key),
- {'DSAPrivateKey', Der, not_encrypted}.
+ {'DSAPrivateKey', Der, not_encrypted};
+encode_key(Key = #'ECPrivateKey'{}) ->
+ {ok, Der} = 'OTP-PUB-KEY':encode('ECPrivateKey', Key),
+ {'ECPrivateKey', Der, not_encrypted}.
make_tbs(SubjectKey, Opts) ->
Version = list_to_atom("v"++integer_to_list(proplists:get_value(version, Opts, 3))),
@@ -277,7 +296,14 @@ publickey(#'RSAPrivateKey'{modulus=N, publicExponent=E}) ->
publickey(#'DSAPrivateKey'{p=P, q=Q, g=G, y=Y}) ->
Algo = #'PublicKeyAlgorithm'{algorithm= ?'id-dsa',
parameters={params, #'Dss-Parms'{p=P, q=Q, g=G}}},
- #'OTPSubjectPublicKeyInfo'{algorithm = Algo, subjectPublicKey = Y}.
+ #'OTPSubjectPublicKeyInfo'{algorithm = Algo, subjectPublicKey = Y};
+publickey(#'ECPrivateKey'{version = _Version,
+ privateKey = _PrivKey,
+ parameters = Params,
+ publicKey = {0, PubKey}}) ->
+ Algo = #'PublicKeyAlgorithm'{algorithm= ?'id-ecPublicKey', parameters=Params},
+ #'OTPSubjectPublicKeyInfo'{algorithm = Algo,
+ subjectPublicKey = #'ECPoint'{point = PubKey}}.
validity(Opts) ->
DefFrom0 = calendar:gregorian_days_to_date(calendar:date_to_gregorian_days(date())-1),
@@ -298,13 +324,24 @@ sign_algorithm(#'RSAPrivateKey'{}, Opts) ->
end,
{Type, 'NULL'};
sign_algorithm(#'DSAPrivateKey'{p=P, q=Q, g=G}, _Opts) ->
- {?'id-dsa-with-sha1', {params,#'Dss-Parms'{p=P, q=Q, g=G}}}.
+ {?'id-dsa-with-sha1', {params,#'Dss-Parms'{p=P, q=Q, g=G}}};
+sign_algorithm(#'ECPrivateKey'{}, Opts) ->
+ Type = case proplists:get_value(digest, Opts, sha1) of
+ sha1 -> ?'ecdsa-with-SHA1';
+ sha512 -> ?'ecdsa-with-SHA512';
+ sha384 -> ?'ecdsa-with-SHA384';
+ sha256 -> ?'ecdsa-with-SHA256'
+ end,
+ {Type, 'NULL'}.
make_key(rsa, _Opts) ->
%% (OBS: for testing only)
gen_rsa2(64);
make_key(dsa, _Opts) ->
- gen_dsa2(128, 20). %% Bytes i.e. {1024, 160}
+ gen_dsa2(128, 20); %% Bytes i.e. {1024, 160}
+make_key(ec, _Opts) ->
+ %% (OBS: for testing only)
+ gen_ec2(secp256k1).
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
%% RSA key generation (OBS: for testing only)
@@ -349,24 +386,37 @@ gen_dsa2(LSize, NSize) ->
X0 = prime(LSize),
P0 = prime((LSize div 2) +1),
- %% Choose L-bit prime modulus P such that p–1 is a multiple of q.
+ %% Choose L-bit prime modulus P such that p-1 is a multiple of q.
case dsa_search(X0 div (2*Q*P0), P0, Q, 1000) of
error ->
gen_dsa2(LSize, NSize);
P ->
- G = crypto:mod_exp(2, (P-1) div Q, P), % Choose G a number whose multiplicative order modulo p is q.
- %% such that This may be done by setting g = h^(p–1)/q mod p, commonly h=2 is used.
+ G = crypto:mod_pow(2, (P-1) div Q, P), % Choose G a number whose multiplicative order modulo p is q.
+ %% such that This may be done by setting g = h^(p-1)/q mod p, commonly h=2 is used.
X = prime(20), %% Choose x by some random method, where 0 < x < q.
- Y = crypto:mod_exp(G, X, P), %% Calculate y = g^x mod p.
+ Y = crypto:mod_pow(G, X, P), %% Calculate y = g^x mod p.
- #'DSAPrivateKey'{version=0, p=P, q=Q, g=G, y=Y, x=X}
+ #'DSAPrivateKey'{version=0, p = P, q = Q,
+ g = crypto:bytes_to_integer(G), y = crypto:bytes_to_integer(Y), x = X}
end.
+%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
+%% EC key generation (OBS: for testing only)
+%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
+
+gen_ec2(CurveId) ->
+ {PubKey, PrivKey} = crypto:generate_key(ecdh, CurveId),
+
+ #'ECPrivateKey'{version = 1,
+ privateKey = binary_to_list(PrivKey),
+ parameters = {namedCurve, pubkey_cert_records:namedCurves(CurveId)},
+ publicKey = {0, PubKey}}.
+
%% See fips_186-3.pdf
dsa_search(T, P0, Q, Iter) when Iter > 0 ->
P = 2*T*Q*P0 + 1,
- case is_prime(crypto:mpint(P), 50) of
+ case is_prime(P, 50) of
true -> P;
false -> dsa_search(T+1, P0, Q, Iter-1)
end;
@@ -377,38 +427,40 @@ dsa_search(_,_,_,_) ->
%%%%%%% Crypto Math %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
prime(ByteSize) ->
Rand = odd_rand(ByteSize),
- crypto:erlint(prime_odd(Rand, 0)).
+ prime_odd(Rand, 0).
prime_odd(Rand, N) ->
case is_prime(Rand, 50) of
true ->
Rand;
false ->
- NotPrime = crypto:erlint(Rand),
- prime_odd(crypto:mpint(NotPrime+2), N+1)
+ prime_odd(Rand+2, N+1)
end.
%% see http://en.wikipedia.org/wiki/Fermat_primality_test
is_prime(_, 0) -> true;
is_prime(Candidate, Test) ->
- CoPrime = odd_rand(<<0,0,0,4, 10000:32>>, Candidate),
- case crypto:mod_exp(CoPrime, Candidate, Candidate) of
- CoPrime -> is_prime(Candidate, Test-1);
- _ -> false
- end.
+ CoPrime = odd_rand(10000, Candidate),
+ Result = crypto:mod_pow(CoPrime, Candidate, Candidate) ,
+ is_prime(CoPrime, crypto:bytes_to_integer(Result), Candidate, Test).
+
+is_prime(CoPrime, CoPrime, Candidate, Test) ->
+ is_prime(Candidate, Test-1);
+is_prime(_,_,_,_) ->
+ false.
odd_rand(Size) ->
Min = 1 bsl (Size*8-1),
Max = (1 bsl (Size*8))-1,
- odd_rand(crypto:mpint(Min), crypto:mpint(Max)).
+ odd_rand(Min, Max).
odd_rand(Min,Max) ->
- Rand = <<Sz:32, _/binary>> = crypto:rand_uniform(Min,Max),
- BitSkip = (Sz+4)*8-1,
- case Rand of
- Odd = <<_:BitSkip, 1:1>> -> Odd;
- Even = <<_:BitSkip, 0:1>> ->
- crypto:mpint(crypto:erlint(Even)+1)
+ Rand = crypto:rand_uniform(Min,Max),
+ case Rand rem 2 of
+ 0 ->
+ Rand + 1;
+ _ ->
+ Rand
end.
extended_gcd(A, B) ->
@@ -427,3 +479,4 @@ pem_to_der(File) ->
der_to_pem(File, Entries) ->
PemBin = public_key:pem_encode(Entries),
file:write_file(File, PemBin).
+