Add to ORKGdissertationWith the spread of internet and mobile devices, transferring information safely and securely has become more important than ever. Finite fields have widespread applications in such domains, such as in cryptography, error correction codes, among many others. In most finite field applications, the field size - and therefore the bit-width of the operands - can be very large. The high complexity of arithmetic operations over such large fields requires circuits to be (semi-) custom designed. This raises the potential for errors/bugs in the implementation, which can be maliciously exploited and can compromise the security of such systems. Formal verification of finite field arithmetic circuits has therefore become an imperative. This ...
thesisFormal verification of arithmetic circuits checks whether or not a gate-level circuit correctl...
With the rise of computing devices, the security robustness of the devices has become of utmost impo...
Finite fields have important applications in number theory, algebraic geometry, Galois theory, crypt...
This dissertation investigates the problems of two distinctive formal verification techniques for ve...
Despite a considerable progress in verification and abstraction of random and control logic, advance...
The paper presents an algebraic approach to functional verification of gate-level, integer arithmeti...
dissertationAbstraction plays an important role in digital design, analysis, and verification, as it...
In this thesis we describe some computer algebra techniques for the formal verification of logic or ...
AbstractWe investigate the computational power of finite-field arithmetic operations as compared to ...
Finite fields is considered as backbone of many branches in number theory, coding theory, cryptograp...
International audienceWhen formal verification of arithmetic circuits identifies the presence of a b...
Despite a considerable progress in verification of random and control logic, advances in formal veri...
Abstract—Galois field arithmetic is a critical component in communication and security-related hardw...
The groundbreaking idea of public key cryptography and the rapid expansion of the internetin the 80s...
Cryptographic schemes, such as authentication, confidentiality, and integrity, rely on computations ...
thesisFormal verification of arithmetic circuits checks whether or not a gate-level circuit correctl...
With the rise of computing devices, the security robustness of the devices has become of utmost impo...
Finite fields have important applications in number theory, algebraic geometry, Galois theory, crypt...
This dissertation investigates the problems of two distinctive formal verification techniques for ve...
Despite a considerable progress in verification and abstraction of random and control logic, advance...
The paper presents an algebraic approach to functional verification of gate-level, integer arithmeti...
dissertationAbstraction plays an important role in digital design, analysis, and verification, as it...
In this thesis we describe some computer algebra techniques for the formal verification of logic or ...
AbstractWe investigate the computational power of finite-field arithmetic operations as compared to ...
Finite fields is considered as backbone of many branches in number theory, coding theory, cryptograp...
International audienceWhen formal verification of arithmetic circuits identifies the presence of a b...
Despite a considerable progress in verification of random and control logic, advances in formal veri...
Abstract—Galois field arithmetic is a critical component in communication and security-related hardw...
The groundbreaking idea of public key cryptography and the rapid expansion of the internetin the 80s...
Cryptographic schemes, such as authentication, confidentiality, and integrity, rely on computations ...
thesisFormal verification of arithmetic circuits checks whether or not a gate-level circuit correctl...
With the rise of computing devices, the security robustness of the devices has become of utmost impo...
Finite fields have important applications in number theory, algebraic geometry, Galois theory, crypt...