Boolean complexity classes vs. their arithmetic analogs
نویسندگان
چکیده
This paper provides logspace and small circuit depth analogs of the result of Valiant and Vazirani, which is a randomized (or nonuniform) reduction from NP to its arithmetic analog ⊕P . We show a similar randomized reduction between the Boolean classes NL and semiunbounded fan-in Boolean circuits and their arithmetic counterparts. These reductions are based on the Isolation Lemma of Mulmuley, Vazirani and Vazirani. Combinatorially our results can be viewed as simple (logspace) transformations of existential quantifiers into counting quantifiers in graphs and shallow circuits.
منابع مشابه
Model-Theoretic Characterizations of Boolean and Arithmetic Circuit Classes of Small Depth
In this paper we give a characterization of both Boolean and arithmetic circuit classes of logarithmic depth in the vein of descriptive complexity theory, i.e., the Boolean classes NC1, SAC1 and AC1 as well as their arithmetic counterparts #NC1, #SAC1 and #AC1. We build on Immerman’s characterization of constant-depth polynomial-size circuits by formulae of first-order logic, i.e., AC0 = FO, an...
متن کاملArithmetic Circuits and Counting Complexity Classes
• Innovative work by Kabanets and Impagliazzo [KI03] shows that, in some cases, providing lower bounds on arithmetic circuit size can yield consequences about Boolean complexity classes. For instance, one of the most important problems in BPP that is not known to be in P is Arithmetic Circuit Identity Testing (ACIT), the problem of determining if two arithmetic circuits compute the same functio...
متن کاملComplexity Classes and Completeness in Algebraic Geometry
We study the computational complexity of sequences of projective varieties. We define analogues of the complexity classes P and NP for these and prove the NP-completeness of a sequence called the universal circuit resultant. This is the first family of compact spaces shown to be NP-complete in a geometric setting. Valiant's theory of algebraic/arithmetic complexity classes is an algebraic analo...
متن کاملApproximate counting in bounded arithmetic
We develop approximate counting of sets definable by Boolean circuits in bounded arithmetic using the dual weak pigeonhole principle (dWPHP(PV )), as a generalization of results from [15]. We discuss applications to formalization of randomized complexity classes (such as BPP , APP , MA, AM ) in PV1 + dWPHP(PV ).
متن کاملArithmetic Versions of Constant Depth Circuit Complexity Classes
The boolean circuit complexity classes AC ⊆ AC[m] ⊆ TC ⊆ NC have been studied intensely. Other than NC, they are defined by constant-depth circuits of polynomial size and unbounded fan-in over some set of allowed gates. One reason for interest in these classes is that they contain the boundary marking the limits of current lower bound technology: such technology exists for AC and some of the cl...
متن کاملذخیره در منابع من
با ذخیره ی این منبع در منابع من، دسترسی به آن را برای استفاده های بعدی آسان تر کنید
عنوان ژورنال:
- Random Struct. Algorithms
دوره 9 شماره
صفحات -
تاریخ انتشار 1995