Add to ORKGWe show that if a self-reducible set has polynomial-size circuits, then it is low for the probabilistic class ZPP(NP). As a consequence we get a deeper collapse of the polynomial-time hierarchy PH to ZPP(NP) under the assumption that NP has polynomial-size circuits. This improves on the well-known result of Karp, Lipton, and Sipser [KL80] stating a collapse of PH to its second level ΣP2 under the same assumption. As a further consequence, we derive new collapse consequences under the assumption that complexity classes like UP, FewP, and C=P have polynomial-size circuits. Finally, we investigate the circuit-size complexity of several language classes. In particular, we show that for every fixed polynomial s, there is a set in ZPP(NP) which d...
textabstract We study the consequences of NP having non-uniform polynomial size circuits of various...
AbstractWe show that the class AM∩coAM is low for ZPPNP. As a consequence, it follows that Graph Iso...
We extend previous collapsing results involving the exponential hierar-chy by using recent hardness-...
AbstractIt is shown that the assumption of NP having polynomial-size circuits implies (apart from a ...
AbstractVia competing provers, we show that if a language A is self-reducible and has polynomial-siz...
We extend previous collapsing results involving the exponential hierarchy by using recent hardness-r...
© Lijie Chen, Dylan M. McKay, Cody D. Murray, and R. Ryan Williams; licensed under Creative Commons ...
AbstractIt is shown that the assumption of NP having polynomial-size circuits implies (apart from a ...
We study the consequences of NP having non-uniform polynomial size circuits of various types. We con...
A frontier open problem in circuit complexity is to prove P^{NP} is not in SIZE[n^k] for all k; this...
We study the consequences of NP having non-uniform polynomial size circuits of various types. We con...
As remarked in Cook (“Towards a Complexity Theory of Synchronous Parallel Computation,≓ Univ. of Tor...
AbstractVia competing provers, we show that if a language A is self-reducible and has polynomial-siz...
We explore whether various complexity classes can have linear or more generally n k-sized circuit fa...
htmlabstractWe study the consequences of NP having non-uniform polynomial size circuits of various t...
textabstract We study the consequences of NP having non-uniform polynomial size circuits of various...
AbstractWe show that the class AM∩coAM is low for ZPPNP. As a consequence, it follows that Graph Iso...
We extend previous collapsing results involving the exponential hierar-chy by using recent hardness-...
AbstractIt is shown that the assumption of NP having polynomial-size circuits implies (apart from a ...
AbstractVia competing provers, we show that if a language A is self-reducible and has polynomial-siz...
We extend previous collapsing results involving the exponential hierarchy by using recent hardness-r...
© Lijie Chen, Dylan M. McKay, Cody D. Murray, and R. Ryan Williams; licensed under Creative Commons ...
AbstractIt is shown that the assumption of NP having polynomial-size circuits implies (apart from a ...
We study the consequences of NP having non-uniform polynomial size circuits of various types. We con...
A frontier open problem in circuit complexity is to prove P^{NP} is not in SIZE[n^k] for all k; this...
We study the consequences of NP having non-uniform polynomial size circuits of various types. We con...
As remarked in Cook (“Towards a Complexity Theory of Synchronous Parallel Computation,≓ Univ. of Tor...
AbstractVia competing provers, we show that if a language A is self-reducible and has polynomial-siz...
We explore whether various complexity classes can have linear or more generally n k-sized circuit fa...
htmlabstractWe study the consequences of NP having non-uniform polynomial size circuits of various t...
textabstract We study the consequences of NP having non-uniform polynomial size circuits of various...
AbstractWe show that the class AM∩coAM is low for ZPPNP. As a consequence, it follows that Graph Iso...
We extend previous collapsing results involving the exponential hierar-chy by using recent hardness-...