Convex Continuation of a Boolean Function and Its Applications

IF 0.58 Q3 Engineering
D. N. Barotov
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引用次数: 0

Abstract

A convex continuation of an arbitrary Boolean function to the set \( [0,1]^n \) is constructed. Moreover, it is proved that for any Boolean function \( f(x_1,x_2,\dots ,x_n) \) that has no neighboring points on the set \( \mathrm{supp} f \), the constructed function \( f_C(x_1,x_2, \dots ,x_n) \) is the only totally maximally convex continuation to \( [0,1]^n \). Based on this, in particular, it is constructively stated that the problem of solving an arbitrary system of Boolean equations can be reduced to the problem of minimizing a function any local minimum of which in the desired region is a global minimum, and thus for this problem the problem of local minima is completely resolved.

布尔函数的凸续及其应用
Abstract A convex continuation of an arbitrary Boolean function to the set\( [0,1]^n \) is constructed.此外,还证明了对于任意布尔函数(f(x_1,x_2,\dots ,x_n) \)在集合(\mathrm{supp} f \)上没有邻接点,所构造的函数(f_C(x_1,x_2,\dots ,x_n) \)是到集合([0,1]^n \)的唯一完全最大凸延续。在此基础上,可以构造性地指出,求解任意布尔方程组的问题可以简化为最小化一个函数的问题,这个函数在所需区域的任何局部最小值都是全局最小值,因此对于这个问题来说,局部最小值的问题是完全可以解决的。
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来源期刊
Journal of Applied and Industrial Mathematics
Journal of Applied and Industrial Mathematics Engineering-Industrial and Manufacturing Engineering
CiteScore
1.00
自引率
0.00%
发文量
16
期刊介绍: Journal of Applied and Industrial Mathematics  is a journal that publishes original and review articles containing theoretical results and those of interest for applications in various branches of industry. The journal topics include the qualitative theory of differential equations in application to mechanics, physics, chemistry, biology, technical and natural processes; mathematical modeling in mechanics, physics, engineering, chemistry, biology, ecology, medicine, etc.; control theory; discrete optimization; discrete structures and extremum problems; combinatorics; control and reliability of discrete circuits; mathematical programming; mathematical models and methods for making optimal decisions; models of theory of scheduling, location and replacement of equipment; modeling the control processes; development and analysis of algorithms; synthesis and complexity of control systems; automata theory; graph theory; game theory and its applications; coding theory; scheduling theory; and theory of circuits.
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