Thesis: S.M., Massachusetts Institute of Technology, Department of Electrical Engineering and Computer Science, 2019Cataloged from PDF version of thesis.Includes bibliographical references (pages 215-229).Fine-grained complexity aims to understand the exact exponent of the running time of fundamental problems in P. Basing on several important conjectures such as Strong Exponential Time Hypothesis (SETH), All-Pair Shortest Path Conjecture, and the 3-Sum Conjecture, tight conditional lower bounds are proved for numerous exact problems from all fields of computer science, showing that many text-book algorithms are in fact optimal. For many natural problems, a fast approximation algorithm would be as important as fast exact algorithms. So it wo...
We present functions that can be computed in some fixed polynomial time but are hard on average for ...
The goal of this thesis is to prove lower bounds in communication complexity by exploiting new conne...
We prove several results which, together with prior work, provide a nearly-complete picture of the r...
In recent years, the polynomial method from circuit complexity has been applied to several fundament...
A central goal of algorithmic research is to determine how fast computational problems can be solved...
This electronic version was submitted by the student author. The certified thesis is available in th...
© 2017 IEEE. We present a new distributed} model of probabilistically checkable proofs (PCP). A sati...
A central goal of algorithmic research is to determine how fast computational problems can be solved...
Since we have few techniques for proving strong lowerbounds on Turing machine computations, an inter...
Proving hardness of approximation is a major challenge in the field of fine-grained complexity and c...
We investigate the relation between $\delta$ and $\epsilon$ required for obtaining a $(1+\delta)$-ap...
Suppose the fastest algorithm that we can design for some problem runs in time O(n^2). However, we w...
This dissertation presents several results in fine-grained complexity. Fine-grained complexity aims ...
Algorithmic research strives to develop fast algorithms for fundamental problems. Despite its many s...
Thesis (S.M.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer S...
We present functions that can be computed in some fixed polynomial time but are hard on average for ...
The goal of this thesis is to prove lower bounds in communication complexity by exploiting new conne...
We prove several results which, together with prior work, provide a nearly-complete picture of the r...
In recent years, the polynomial method from circuit complexity has been applied to several fundament...
A central goal of algorithmic research is to determine how fast computational problems can be solved...
This electronic version was submitted by the student author. The certified thesis is available in th...
© 2017 IEEE. We present a new distributed} model of probabilistically checkable proofs (PCP). A sati...
A central goal of algorithmic research is to determine how fast computational problems can be solved...
Since we have few techniques for proving strong lowerbounds on Turing machine computations, an inter...
Proving hardness of approximation is a major challenge in the field of fine-grained complexity and c...
We investigate the relation between $\delta$ and $\epsilon$ required for obtaining a $(1+\delta)$-ap...
Suppose the fastest algorithm that we can design for some problem runs in time O(n^2). However, we w...
This dissertation presents several results in fine-grained complexity. Fine-grained complexity aims ...
Algorithmic research strives to develop fast algorithms for fundamental problems. Despite its many s...
Thesis (S.M.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer S...
We present functions that can be computed in some fixed polynomial time but are hard on average for ...
The goal of this thesis is to prove lower bounds in communication complexity by exploiting new conne...
We prove several results which, together with prior work, provide a nearly-complete picture of the r...