Add to ORKGHardness magnification reduces major complexity separations (such as EXP ⊈ NC^1) to proving lower bounds for some natural problem Q against weak circuit models. Several recent works [Igor Carboni Oliveira and Rahul Santhanam, 2018; Dylan M. McKay et al., 2019; Lijie Chen and Roei Tell, 2019; Igor Carboni Oliveira et al., 2019; Lijie Chen et al., 2019; Igor Carboni Oliveira, 2019; Lijie Chen et al., 2019] have established results of this form. In the most intriguing cases, the required lower bound is known for problems that appear to be significantly easier than Q, while Q itself is susceptible to lower bounds but these are not yet sufficient for magnification. In this work, we provide more examples of this phenomenon, and investigate the pr...
The Minimum Circuit Size Problem (MCSP) asks whether a given Boolean function has a circuit of at mo...
This electronic version was submitted by the student author. The certified thesis is available in th...
We formalize and study the question of whether there are inherent difficulties to showing lower boun...
Hardness magnification reduces major complexity separations (such as EXP ⊈ NC1) to proving lower bou...
We show that for several natural problems of interest, complexity lower bounds that are barely non-t...
This thesis focuses on problems which themselves encode questions about circuits or algorithms, also...
This article continues the development of hardness magnification, an emerging area that proposes a n...
© 2019 IEEE. In the Minimum Circuit Size Problem (MCSP[s(m)]), we ask if there is a circuit of size ...
This work continues the development of hardness magnification. The latter proposes a new strategy fo...
We consider a general approach to the hoary problem of (im)proving circuit lower bounds. We define n...
We show that proving mildly super-linear lower bounds on non-commutative arithmetic circuits implies...
We study the power of randomized complexity classes that are given oracle access to a natural proper...
Hardness amplification is the fundamental task of converting a δ-hard function f: {0, 1}n → {0, 1} i...
We formalize and study the question of whether there are inherent difficulties to showing lower boun...
We study the task of transforming a hard function f, with which any small circuit disagrees on (1 − ...
The Minimum Circuit Size Problem (MCSP) asks whether a given Boolean function has a circuit of at mo...
This electronic version was submitted by the student author. The certified thesis is available in th...
We formalize and study the question of whether there are inherent difficulties to showing lower boun...
Hardness magnification reduces major complexity separations (such as EXP ⊈ NC1) to proving lower bou...
We show that for several natural problems of interest, complexity lower bounds that are barely non-t...
This thesis focuses on problems which themselves encode questions about circuits or algorithms, also...
This article continues the development of hardness magnification, an emerging area that proposes a n...
© 2019 IEEE. In the Minimum Circuit Size Problem (MCSP[s(m)]), we ask if there is a circuit of size ...
This work continues the development of hardness magnification. The latter proposes a new strategy fo...
We consider a general approach to the hoary problem of (im)proving circuit lower bounds. We define n...
We show that proving mildly super-linear lower bounds on non-commutative arithmetic circuits implies...
We study the power of randomized complexity classes that are given oracle access to a natural proper...
Hardness amplification is the fundamental task of converting a δ-hard function f: {0, 1}n → {0, 1} i...
We formalize and study the question of whether there are inherent difficulties to showing lower boun...
We study the task of transforming a hard function f, with which any small circuit disagrees on (1 − ...
The Minimum Circuit Size Problem (MCSP) asks whether a given Boolean function has a circuit of at mo...
This electronic version was submitted by the student author. The certified thesis is available in th...
We formalize and study the question of whether there are inherent difficulties to showing lower boun...