The modular squaring operation has attracted significant attention due to its potential in constructing cryptographic time-lock puzzles and verifiable delay functions. In such applications, it is important to understand precisely how quickly a modular squaring operation can be computed, even in parallel on dedicated hardware. We use tools from circuit complexity and number theory to prove concrete numerical lower bounds for squaring on a parallel machine, yielding nontrivial results for practical input bitlengths. For example, for $n = 2048$, we prove that every logic circuit (over AND, OR, NAND, NOR gates of fan-in two) computing modular squaring on all $n$-bit inputs (and any modulus that is at least $2^{n−1}$) requires depth (critical pa...
The lirst result presented in this paper is a lower bound of Q(log n) for the computation time of co...
AbstractExponential size lower bounds are obtained for some depth three circuits computing conjuncti...
Fix pairwise coprime positive integers . We propose representing integers modulo , where is any posi...
The modular squaring operation has attracted significant attention due to its potential in construct...
. A modular exponentiation is one of the most important operations in public-key cryptography. Howev...
This study is an attempt in quest of the fastest hardware algorithms for the computation of the eval...
Abstract. We consider constant depth circuits augmented with few modular, or more generally, arbitra...
We investigate the complexity of circuits consisting solely of modulo gates and obtain results whic...
The Minimum Circuit Size Problem (MCSP) asks for the size of the smallest boolean circuit that compu...
One of the long-standing open questions in the theory of parallel computation is the parallel comple...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
AbstractThe computation of large modular multi-exponentiation is a time-consuming arithmetic operati...
This dissertation presents some circuit complexity results and techniques. Circuit complexity is a b...
AbstractOne of the main operations for the public key cryptosystem is the modular exponentiation. In...
Abstract. Fix pairwise coprime positive integers p1,p2,...,ps. Wepropose representing integers u mod...
The lirst result presented in this paper is a lower bound of Q(log n) for the computation time of co...
AbstractExponential size lower bounds are obtained for some depth three circuits computing conjuncti...
Fix pairwise coprime positive integers . We propose representing integers modulo , where is any posi...
The modular squaring operation has attracted significant attention due to its potential in construct...
. A modular exponentiation is one of the most important operations in public-key cryptography. Howev...
This study is an attempt in quest of the fastest hardware algorithms for the computation of the eval...
Abstract. We consider constant depth circuits augmented with few modular, or more generally, arbitra...
We investigate the complexity of circuits consisting solely of modulo gates and obtain results whic...
The Minimum Circuit Size Problem (MCSP) asks for the size of the smallest boolean circuit that compu...
One of the long-standing open questions in the theory of parallel computation is the parallel comple...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
AbstractThe computation of large modular multi-exponentiation is a time-consuming arithmetic operati...
This dissertation presents some circuit complexity results and techniques. Circuit complexity is a b...
AbstractOne of the main operations for the public key cryptosystem is the modular exponentiation. In...
Abstract. Fix pairwise coprime positive integers p1,p2,...,ps. Wepropose representing integers u mod...
The lirst result presented in this paper is a lower bound of Q(log n) for the computation time of co...
AbstractExponential size lower bounds are obtained for some depth three circuits computing conjuncti...
Fix pairwise coprime positive integers . We propose representing integers modulo , where is any posi...