There are two representations for an RSA private key (cf PKCS#1).
The first representation consists of the pair (n, d), the second representation consists of a quintuple (p, q, dP, dQ, qInv). The public key is represented as (n, e).
- n is the public modulus
- p and q are the two primes
- d is the private exponent
- e is the public exponent
- dP is p's Chinese Remainder Theorem coefficient ( e · dP ≡ 1 (mod (p – 1)) )
- dQ is q's CRT coefficient ( e · dQ ≡ 1 (mod (q – 1)) )
- qInv is a CRT coefficient, a positive integer less than p such that
q · qInv ≡ 1 (mod p)
Each of the two private key representation is "complete", i.e. you only need one of them to be able to perform RSA computations. Since you are in possession of everything that is necessary for the first representation, it suffices to only set these parameters (i.e. n, p, q, e, d) on your
RSAParameters instance and omit the rest.