We present an approach to non-uniform complexity in which single-pass instruction sequences play a key part, and answer various questions that arise from this approach. We introduce several kinds of non-uniform complexity classes. One kind includes a counterpart of the well-known non-uniform complexity class P/poly and another kind includes a counterpart of the well-known non-uniform complexity class NP/poly. Moreover, we introduce a general notion of completeness for the non-uniform complexity classes of the latter kind. We also formulate a counterpart of the well-known complexity theoretic conjecture that NP is not included in P/poly. We think that the presented approach opens up an additional way of investigating issues concerning non-un...
Reductions and completeness notions form the heart of computational complexity theory. Recently non-...
In order to study circuit complexity classes within NC¹ in a uniform setting, we need a uniformity c...
AbstractWe investigate the distribution of nonuniform complexities in uniform complexity classes. We...
We present an approach to non-uniform complexity in which single-pass instruction sequences play a k...
We develop theory concerning non-uniform complexity in a setting in which the notion of single-pass ...
We present an approach to non-uniform complexity in which single-pass instruction sequences play a k...
Abstract. We develop theory concerning non-uniform complexity in a setting in which the notion of si...
grantor: University of TorontoThis thesis studies models and limitations of non-uniform co...
We strengthen the nondeterministic hierarchy theorem for non-deterministic polynomial time to show t...
Non-uniform complexity measures origined in Automata and Formal Languages Theory are characterized i...
Non-uniform complexity measures originated in automata and formal languages theory are characterized...
AbstractThe concept of nonuniform proof systems is introduced. This notion allows a uniform descript...
AbstractWe obtain some results of the form: If certain complexity classes satisfy a non-uniform cond...
AbstractIn order to study circuit complexity classes within NC1 in a uniform setting, we need a unif...
We search for nonuniform analogs of the complexity class N P ¿ coN P. Following mainly the work of K...
Reductions and completeness notions form the heart of computational complexity theory. Recently non-...
In order to study circuit complexity classes within NC¹ in a uniform setting, we need a uniformity c...
AbstractWe investigate the distribution of nonuniform complexities in uniform complexity classes. We...
We present an approach to non-uniform complexity in which single-pass instruction sequences play a k...
We develop theory concerning non-uniform complexity in a setting in which the notion of single-pass ...
We present an approach to non-uniform complexity in which single-pass instruction sequences play a k...
Abstract. We develop theory concerning non-uniform complexity in a setting in which the notion of si...
grantor: University of TorontoThis thesis studies models and limitations of non-uniform co...
We strengthen the nondeterministic hierarchy theorem for non-deterministic polynomial time to show t...
Non-uniform complexity measures origined in Automata and Formal Languages Theory are characterized i...
Non-uniform complexity measures originated in automata and formal languages theory are characterized...
AbstractThe concept of nonuniform proof systems is introduced. This notion allows a uniform descript...
AbstractWe obtain some results of the form: If certain complexity classes satisfy a non-uniform cond...
AbstractIn order to study circuit complexity classes within NC1 in a uniform setting, we need a unif...
We search for nonuniform analogs of the complexity class N P ¿ coN P. Following mainly the work of K...
Reductions and completeness notions form the heart of computational complexity theory. Recently non-...
In order to study circuit complexity classes within NC¹ in a uniform setting, we need a uniformity c...
AbstractWe investigate the distribution of nonuniform complexities in uniform complexity classes. We...