# Questions tagged [logspace]

The tag has no usage guidance.

49 questions
Filter by
Sorted by
Tagged with
113 views

### What circuit depth is enough to compute a log-space complete problem?

To the best of my knowledge it is unknown that $\mathsf{L}$ is subset of $\mathsf{NC}^1$. (Here $\mathsf{NC}^1$ is the class of decision problems solvable by a family of Boolean circuits, with ...
• 1,859
102 views

• 12.6k
118 views

207 views

### On space complexity of permanent modulo $2^t$?

We know from here that permanent of $0/1$ matrix modulo $2^t$ is in $DTIME(n^{t+3})$ and hence in $P$. My question is whether permanent of $0/1$ matrix modulo $2^t$ is in $L$ as well or is the current ...
• 12.6k
1 vote
71 views

• 175
113 views

### Number theoretic problems complete for $\mathsf{RL}$

Are there number theoretic problems (such as those related to $\mathsf{gcd}$) that are in $\mathsf{RL}$? Can these also be $\mathsf{RL}$-complete problems (is there any $\mathsf{RL}$-complete ...
96 views

### Are there any non-relativized separations between $L$ and $PH$?

In one sense, $P$ vs. $PSPACE$ is the "easiest" first step to showing $P \neq NP$... and this is one you hear often about. In a different sense, you could take $L$ at one end and then $PH$ at the ...
• 757
755 views

### What is the power of general poly-size permutation branching programs?

Call $\mathsf{PPBP}$ the class of languages decided by poly-size families of permutation branching programs, which are layered branching programs (i.e., the ones defined here) whose transitions ...
• 5,038
230 views

### What is the space complexity of computing the eigenvectors of a matrix?

By the answer to this question, computing the eigenvalues of a matrix to within $2^{-n}$ precision can be done in polylogarithmic space. Is it also possible to compute the eigenvectors of a matrix to ...
• 161
971 views

### Any known connections between open problems for time and space: P vs L, NP vs NL, BPP vs BPL, ⊕P vs ⊕L

It would be nice to show that $P=L$ implies $NP=NL$. Or, $NP=NL$ implies $UP=UL$. Or maybe, $⊕P = ⊕L$ implies $PP = PL$. Are there any known connections between the problems: P vs L, UP vs UL, NP ...
• 5,025
469 views

### Complexity of the search version of 2-SAT assuming $\mathsf{L = NL}$

If $\mathsf{L = NL}$, then there is a logspace algorithm that solves the decision version of 2-SAT. Is $\mathsf{L = NL}$ known to imply that there is a logspace algorithm to obtain a satisfying ...
260 views

### Why can't Horn-SAT be solved in Log-space? [closed]

A simple algorithm for Horn-SAT (in CNF) is the following: Given: A Horn formula $\phi$ in CNF. Find a unit clause (a clause with one literal) $C_i$. $~$Set the variable $x_j$ appearing in $C_i$ to ...
250 views

### Does ${\bf AC^0PAD} = {\bf PPAD}$?

What happens if we define ${\bf PPAD}$ such that instead of a polytime Turing-machine/polysize circuit, a logspace Turing-machine or an ${\bf AC^0}$ circuit encodes the problem? Recently giving ...
• 13.8k
496 views

### What if an $\mathsf L$-complete problem has $\mathsf{NC}^1$ circuits? More generally, what evidence is there against $\mathsf{NC}^1=\mathsf{L}$?

Edit: let me reformulate the question in a more specific way (and change the title accordingly). A slightly edited version of the original question follows. Is there a result comparable to the Karp-...
• 5,038
285 views

### Large classes which contain LOGSPACE for which strict inclusions are unknown

The wikipedia page on PSPACE mentions that the inclusion $NL\subset PH$ is not known to be strict (unfortunately without references). Q1: What about $L\subset PH$ and $L\subset P^{\#P}$ - are these ...
2k views

### Detecting undirected cycles in logarithmic space [closed]

I have a lot of difficulties with constructing algorithms that use $O(\log n)$ space, as I am unsure about how much can be stored on the worktape. I am trying to figure out an algorithm for the ...
• 131