Importance

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Abstract

A cryptographic calculation includes obtaining a point P(X,Y) from a parameter t on an elliptical curve Y²=f(X) and from polynomials satisfying: −f(X₁(t)).f(X₂(t))=U(t)² in the finite body F_q, irrespective of the parameter t, q=3 mod 4. A value of the parameter t is obtained and the point P is determined by: (i) calculating X₁=X₁(t), X₂=X₂(t) and U=U(t); (ii) testing whether the term f(X₋₁) is a squared term in the finite body F_q and, if so, calculating the square root of the term f(X₁), the point P having X₁ as abscissa and Y₁, the square root of the term f(X₁), as ordinate; (iii) otherwise, calculating the square root of the term f(X₂), the point P having X₂, as abscissa and Y₂, the square root of the term f(X₂), as ordinate. The point P is useful in encryption, scrambling, signature, authentication or identification cryptographic applications.

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First Claim