On a Computability-Theoretic Approach to Boolean-Valued Models

Standard

On a Computability-Theoretic Approach to Boolean-Valued Models. / Bazhenov, Nikolay; Mustafa, Manat.

Lecture Notes in Computer Science. Том 16084 Springer Singapore, 2026. стр. 79-92 7 (Lecture Notes in Computer Science; Том 16084 LNCS).

Результаты исследований: Публикации в книгах, отчётах, сборниках, трудах конференций › статья в сборнике материалов конференции › научная › Рецензирование

Harvard

Bazhenov, N & Mustafa, M 2026, On a Computability-Theoretic Approach to Boolean-Valued Models. в Lecture Notes in Computer Science. Том. 16084, 7, Lecture Notes in Computer Science, Том. 16084 LNCS, Springer Singapore, стр. 79-92, 19th Annual Conference, Jinan, Китай, 19.09.2025. https://doi.org/10.1007/978-981-95-4839-2_7

APA

Bazhenov, N., & Mustafa, M. (2026). On a Computability-Theoretic Approach to Boolean-Valued Models. в Lecture Notes in Computer Science (Том 16084, стр. 79-92). [7] (Lecture Notes in Computer Science; Том 16084 LNCS). Springer Singapore. https://doi.org/10.1007/978-981-95-4839-2_7

Vancouver

Bazhenov N, Mustafa M. On a Computability-Theoretic Approach to Boolean-Valued Models. в Lecture Notes in Computer Science. Том 16084. Springer Singapore. 2026. стр. 79-92. 7. (Lecture Notes in Computer Science). doi: 10.1007/978-981-95-4839-2_7

Author

Bazhenov, Nikolay ; Mustafa, Manat. / On a Computability-Theoretic Approach to Boolean-Valued Models. Lecture Notes in Computer Science. Том 16084 Springer Singapore, 2026. стр. 79-92 (Lecture Notes in Computer Science).

BibTeX

@inproceedings{3a9ba375f54943beb7fc92942f8d3e28,

title = "On a Computability-Theoretic Approach to Boolean-Valued Models",

abstract = "The paper outlines a possible computability-theoretic approach to the theory of Boolean-valued models. We introduce the notion of a decidable Boolean-valued model А. This notion is a natural extension of the classical definition of a decidable structure. Intuitively speaking, in order to formally define А, one needs to (algorithmically) work only with countably many truth values taken from a computable Boolean algebra. This convention allows us to view such А through the lens of computable structure theory.We show that the introduced approach provides a rich class of computable structures. We prove that any possible computable dimension can be realized by an appropriately constructed, decidable Boolean-valued model А. Consequently, there exists a model А having computable dimension 2 (that is, А possesses precisely two computable presentations, up to computable isomorphisms). In contrast, it is known that dimension 2 can be realized neither by a classical decidable structure nor by a computable Boolean algebra.",

author = "Nikolay Bazhenov and Manat Mustafa",

note = "Bazhenov, N., Mustafa, M. (2026). On a Computability-Theoretic Approach to Boolean-Valued Models. In: Li, M., Xia, M., Zhang, P. (eds) Theory and Applications of Models of Computation. TAMC 2025. Lecture Notes in Computer Science, vol 16084. Springer, Singapore. https://doi.org/10.1007/978-981-95-4839-2_7 The work was supported by Nazarbayev University Faculty Development Competitive Research Grants 201223FD8823. The authors are grateful to the anonymous referees for their helpful comments.; 19th Annual Conference, TAMC 2025 ; Conference date: 19-09-2025 Through 21-09-2025",

year = "2026",

month = jan,

day = "2",

doi = "10.1007/978-981-95-4839-2_7",

language = "English",

isbn = "978-981-95-4838-5",

volume = "16084",

series = "Lecture Notes in Computer Science",

publisher = "Springer Singapore",

pages = "79--92",

booktitle = "Lecture Notes in Computer Science",

address = "Singapore",

}

RIS

TY - GEN

T1 - On a Computability-Theoretic Approach to Boolean-Valued Models

AU - Bazhenov, Nikolay

AU - Mustafa, Manat

N1 - Conference code: 19

PY - 2026/1/2

Y1 - 2026/1/2

N2 - The paper outlines a possible computability-theoretic approach to the theory of Boolean-valued models. We introduce the notion of a decidable Boolean-valued model А. This notion is a natural extension of the classical definition of a decidable structure. Intuitively speaking, in order to formally define А, one needs to (algorithmically) work only with countably many truth values taken from a computable Boolean algebra. This convention allows us to view such А through the lens of computable structure theory.We show that the introduced approach provides a rich class of computable structures. We prove that any possible computable dimension can be realized by an appropriately constructed, decidable Boolean-valued model А. Consequently, there exists a model А having computable dimension 2 (that is, А possesses precisely two computable presentations, up to computable isomorphisms). In contrast, it is known that dimension 2 can be realized neither by a classical decidable structure nor by a computable Boolean algebra.

AB - The paper outlines a possible computability-theoretic approach to the theory of Boolean-valued models. We introduce the notion of a decidable Boolean-valued model А. This notion is a natural extension of the classical definition of a decidable structure. Intuitively speaking, in order to formally define А, one needs to (algorithmically) work only with countably many truth values taken from a computable Boolean algebra. This convention allows us to view such А through the lens of computable structure theory.We show that the introduced approach provides a rich class of computable structures. We prove that any possible computable dimension can be realized by an appropriately constructed, decidable Boolean-valued model А. Consequently, there exists a model А having computable dimension 2 (that is, А possesses precisely two computable presentations, up to computable isomorphisms). In contrast, it is known that dimension 2 can be realized neither by a classical decidable structure nor by a computable Boolean algebra.

UR - https://www.scopus.com/pages/publications/105028304106

UR - https://www.mendeley.com/catalogue/f4ac9c7a-0eb6-3eb6-9b86-bdd50c776331/

U2 - 10.1007/978-981-95-4839-2_7

DO - 10.1007/978-981-95-4839-2_7

M3 - Conference contribution

SN - 978-981-95-4838-5

VL - 16084

T3 - Lecture Notes in Computer Science

SP - 79

EP - 92

BT - Lecture Notes in Computer Science

PB - Springer Singapore

T2 - 19th Annual Conference

Y2 - 19 September 2025 through 21 September 2025

ER -

ID: 74289860