Add to ORKGD. M. Barrington proved the coincidence of the class NC1 of functions computable by the circuits of logarithmic depth with the class of functions computable by branching programs of constant width and polynomial length (BWBP). In this paper, the structure of branching programs suggested by the Barrington method is defined more exactly. Namely, it is proved that we can compute all functions from NC1 and only them by the k-OBDDs of polynomial size and width 5. This can be reformulated as poly(n)-OBDD5 = NC1. © MAIK Nauka 2008
© 2015, Pleiades Publishing, Ltd. In this paper was explored well known model k-OBDD. There are prov...
AbstractNondeterministic branching programs introduced by Meinel (1986) proved to be an interesting ...
AbstractWe consider the size of the representation of Boolean functions by several classes of binary...
D. M. Barrington proved the coincidence of the class NC1 of functions computable by the circuits of ...
. Andreev et al. [3] gave constructions of Boolean functions (computable by polynomial-size circuit...
AbstractBranching programs are considered as a nonuniform model of computation in complexity theory ...
In [3] we exhibited a simple boolean functions f n in n variables such that: 1) f n can be computed ...
. It is known that if a Boolean function f in n variables has a DNF and a CNF of size N then f also...
AbstractWe show that any language recognized by an NC1 circuit (fan-in 2, depth O(log n)) can be rec...
A celebrated result of Barrington (1985) proved that polynomial size, width-5 branching programs (BP...
Nečiporuk [Nec̆66] gave a method based on counting subfunctions to lower bound the formula size ove...
AbstractWe use algebraic techniques to obtain superlinear lower bounds on the size of bounded-width ...
We survey some upper and lower bounds established recently on the sizes of randomized branching prog...
© Springer-Verlag Berlin Heidelberg 1997. In [3] we exhibited a simple boolean functions fn in n var...
Combinational complexity and depth are the most important complexity measures for Boolean functions....
© 2015, Pleiades Publishing, Ltd. In this paper was explored well known model k-OBDD. There are prov...
AbstractNondeterministic branching programs introduced by Meinel (1986) proved to be an interesting ...
AbstractWe consider the size of the representation of Boolean functions by several classes of binary...
D. M. Barrington proved the coincidence of the class NC1 of functions computable by the circuits of ...
. Andreev et al. [3] gave constructions of Boolean functions (computable by polynomial-size circuit...
AbstractBranching programs are considered as a nonuniform model of computation in complexity theory ...
In [3] we exhibited a simple boolean functions f n in n variables such that: 1) f n can be computed ...
. It is known that if a Boolean function f in n variables has a DNF and a CNF of size N then f also...
AbstractWe show that any language recognized by an NC1 circuit (fan-in 2, depth O(log n)) can be rec...
A celebrated result of Barrington (1985) proved that polynomial size, width-5 branching programs (BP...
Nečiporuk [Nec̆66] gave a method based on counting subfunctions to lower bound the formula size ove...
AbstractWe use algebraic techniques to obtain superlinear lower bounds on the size of bounded-width ...
We survey some upper and lower bounds established recently on the sizes of randomized branching prog...
© Springer-Verlag Berlin Heidelberg 1997. In [3] we exhibited a simple boolean functions fn in n var...
Combinational complexity and depth are the most important complexity measures for Boolean functions....
© 2015, Pleiades Publishing, Ltd. In this paper was explored well known model k-OBDD. There are prov...
AbstractNondeterministic branching programs introduced by Meinel (1986) proved to be an interesting ...
AbstractWe consider the size of the representation of Boolean functions by several classes of binary...