- Main
Connections Between Complexity Lower Bounds and Meta-Computational Upper Bounds
- Carmosino, Marco Leandro
- Advisor(s): Impagliazzo, Russell
Abstract
This dissertation presents several results at the intersection of
complexity theory and algorithm design. Complexity theory aims to
lower-bound the amount of computational resources (such as time and
space) required to solve interesting problems. Algorithm design aims
to upper-bound the amount of computational resources required to solve
interesting problems. These pursuits appear opposed. However, some
algorithm design and complexity lower bound problems are inextricably
connected.
This dissertation explores several such connections. From "natural"
proofs of circuit-size lower bounds, we create learning
algorithms. From the exact hardness of problems in polynomial time, we
create algorithms of estimating the acceptance probability of
circuits. Finally, from algorithms for testing the identity of
airthmetic circuits over finite fields, we create arithmetic
circuit-complexity lower bounds.
Main Content
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