Abstract. Polynomial-time many-one reductions provide the standard notion of completeness for complexity classes. However, as first explicated by Berman and Hartmanis in their work on the isomorphism conjecture, all natural complete problems are actually complete under reductions with stronger properties. We study the length-increasing property and show under various computational hardness assumptions that all PSPACE-complete problems are complete via length-increasing reductions that are computable with a small amount of nonuniform advice. If there is a problem in PSPACE that requires exponential time, then polynomial size advice suffices to give li-reductions to all PSPACEcomplete sets. Under the stronger assumption that linear space requ...
Propositional proof complexity is a field in theoretical computer science that analyses the resource...
AbstractTotal NP search problems (TFNP problems) typically have their totality guaranteed by some co...
Recently Gla{\ss}er et al. have shown that for many classes $C$ including PSPACE and NP it holds tha...
AbstractUnder the assumption that NP does not have p-measure 0, we investigate reductions to NP-comp...
Reductions and completeness notions form the heart of computational complexity theory. Recently non-...
This paper presents the following results on sets that are complete for $NP$. begin{enumerate} item...
AbstractMeyer and Paterson (1979) investigated ⩽Pm-reducibility of PSPACE-complete sets to sparse se...
We constructively prove the existence of almost complete problems under logspace many-one reduction ...
AbstractThis paper investigates the distribution and nonuniform complexity of problems that are comp...
AbstractThis paper investigates the distribution and nonuniform complexity of problems that are comp...
In 1978, Hartmanis conjectured that there exist no sparse complete sets for P under logspace many-on...
This paper investigates the distribution and nonuniform complexity of problems that are com plete or...
AbstractLog space reducibility allows a meaningful study of complexity and completeness for the clas...
Propositional proof complexity is a field in theoretical computer science that analyses the resource...
Propositional proof complexity is a field in theoretical computer science that analyses the resource...
Propositional proof complexity is a field in theoretical computer science that analyses the resource...
AbstractTotal NP search problems (TFNP problems) typically have their totality guaranteed by some co...
Recently Gla{\ss}er et al. have shown that for many classes $C$ including PSPACE and NP it holds tha...
AbstractUnder the assumption that NP does not have p-measure 0, we investigate reductions to NP-comp...
Reductions and completeness notions form the heart of computational complexity theory. Recently non-...
This paper presents the following results on sets that are complete for $NP$. begin{enumerate} item...
AbstractMeyer and Paterson (1979) investigated ⩽Pm-reducibility of PSPACE-complete sets to sparse se...
We constructively prove the existence of almost complete problems under logspace many-one reduction ...
AbstractThis paper investigates the distribution and nonuniform complexity of problems that are comp...
AbstractThis paper investigates the distribution and nonuniform complexity of problems that are comp...
In 1978, Hartmanis conjectured that there exist no sparse complete sets for P under logspace many-on...
This paper investigates the distribution and nonuniform complexity of problems that are com plete or...
AbstractLog space reducibility allows a meaningful study of complexity and completeness for the clas...
Propositional proof complexity is a field in theoretical computer science that analyses the resource...
Propositional proof complexity is a field in theoretical computer science that analyses the resource...
Propositional proof complexity is a field in theoretical computer science that analyses the resource...
AbstractTotal NP search problems (TFNP problems) typically have their totality guaranteed by some co...
Recently Gla{\ss}er et al. have shown that for many classes $C$ including PSPACE and NP it holds tha...
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