Algebras for monads in the category of subobjects
DOI:
https://doi.org/10.5269/bspm.66527Resumen
For a given object $Y$ in a category ${\mathcal{C}}$, we construct the category of $T$-Algebras (Eilenberg-Moore category) and Kleisli category corresponding to the monad defined on partial order category $Sub_{\mathcal{C}}[Y]$. We obtain sufficient condition for the right adjoint to be monadic for the string of adjunction $f(-) \dashv f^{-1} \dashv f^{\#}$. Finally, given any adjunction the sufficient condition for the comparison functor between the original category and the category of T-Algebras derived from monad to have a left adjoint is obtained.
Referencias
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3. D.Dikranjan and W.Tholen, Categorical structure of closure operators, Kluwer Academic Publishers,1995.
4. N. Goyal and N.S.Noorie, Categorical Characterizations of some results on Induced mappings, Punjab Univ. J. of Math., 51(5)(2019), 15–25.
5. A. Homayoun Nejah, M. Mahmoudi and M. Mehdi Ebrahimi, Partially ordered objects in a topos, Quaestiones Mathematicae, 2020, 1–30.
6. S.Mac Lane, Categories for the working mathematician, Springer Science & Business Media, 2013.
2. S.Awodey, Category Theory, Clarendon press, Oxford, 2006.
3. D.Dikranjan and W.Tholen, Categorical structure of closure operators, Kluwer Academic Publishers,1995.
4. N. Goyal and N.S.Noorie, Categorical Characterizations of some results on Induced mappings, Punjab Univ. J. of Math., 51(5)(2019), 15–25.
5. A. Homayoun Nejah, M. Mahmoudi and M. Mehdi Ebrahimi, Partially ordered objects in a topos, Quaestiones Mathematicae, 2020, 1–30.
6. S.Mac Lane, Categories for the working mathematician, Springer Science & Business Media, 2013.
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Publicado
2025-07-13
Número
Sección
Research Articles
Licencia
When the manuscript is accepted for publication, the authors agree automatically to transfer the copyright to the (SPM).
The journal utilize the Creative Common Attribution (CC-BY 4.0).
Cómo citar
Goyal, N. (2025). Algebras for monads in the category of subobjects. Boletim Da Sociedade Paranaense De Matemática, 43, 1-10. https://doi.org/10.5269/bspm.66527
