Skip to content
Carmelics
TopicsThinkersChangesContributorsLoading account…

    Carmelics

    A reasoning platform. Break down any belief into clear reasons, explore both sides, and weigh the evidence honestly.

    Navigate

    • Topics
    • Search
    • Recent Changes
    • Contribute
    • How It Works
    • Glossary
    • Thinkers
    • Contributors
    • About
    • Statistics
    • Terms
    • Privacy

    Database

    Statements
    —
    Perspectives
    —
    Topics
    —

    Press ? for keyboard shortcuts

    LoyalLoyalJusticeJustice
    Made withinDC&Austin
    Statements
    321,452
    Perspectives
    108,905
    Topics
    42
    PSPACE equals NPSPACE, meaning nondeterminism provides no... — Carmelics
    Home/Modality & Possibility
    HistoryEditSee Inverse

    Part of a larger discussion

    Supports→Nondeterminism is computationally less powerful relative to space than it appears to be relative to time

    PSPACE equals NPSPACE, meaning nondeterminism provides no asymptotic advantage for space-bounded computation

    Modality & PossibilityTruth & Knowledge
    ?Rate how convincing each reason is below to see the overall strength.

    No one has weighed in yet. Be the first to share reasons for or against this statement.

    Sign in or register to share your perspective on this statement.

    Topics

    Modality & PossibilityTruth & Knowledge

    Related

    Nondeterminism is computationally less powerful relative to space than it appear...Whether P equals NP remains open, meaning nondeterminism may provide an exponent...

    Similar

    Next step

    Based on where you are in your exploration

    Browse more in Modality & Possibility
    Related propositions within the same area of thought.
    PSPACE equals NPSPACE, meaning non-determinism yields no additional po...91%Whether P equals NP remains open, meaning nondeterminism may provide a...87%Whether P equals NP remains unresolved, leaving open whether non-deter...84%PSPACE equals NPSPACE (non-determinism does not add power for polynomi...83%

    Source

    AI-extracted
    SEP: computational-complexity
    View source passageHide passage
    Similarly, parts i) and ii) respectively implies that \(\textbf{P} \subsetneq \textbf{EXP}\) and \(\textbf{NP} \subsetneq \textbf{NEXP}\). And it similarly follows from part iii) that \(\textbf{L} \subsetneq \textbf{PSPACE}\). Note that since every deterministic Turing machine is, by definition, a non-deterministic machine, we clearly have \(\textbf{P} \subseteq \textbf{NP}\) and \(\textbf{PSPACE} \subseteq \textbf{NPSPACE}\). 2 Suppose that \(f(n)\) is both time and space constructible. Then

    Details

    Type
    premise
    Perspectives
    0 (0 for, 0 against)
    Edits
    1 edit

    Open for perspectives

    This idea is waiting for its first supporting or challenging perspective.

    Share the first perspective