# Some Fixed-Point Results on N_b-Cone Metric Spaces

### Jerolina Fernandez

#### 2023

#### Abstract

In mathematical analysis, diverse generalizations of metric spaces like 2-Metric, D-metric, G-metric, S-metric, b-metric, Cone metric, and N-cone metric spaces have been studied. Malviya et al. (2012) introduced N-cone metric spaces, a generalization of cone and S-metric spaces, exploring their properties in fixed-point theory. This paper extends and revises results from Wang et al. (1984) in this novel context. Theorems and corollaries demonstrate the uniqueness and existence of fixed points under specified conditions. These findings enrich the understanding of generalized metric spaces and their applications in mathematical analysis.

Download#### Paper Citation

#### in Harvard Style

Fernandez J. (2023). **Some Fixed-Point Results on N_b-Cone Metric Spaces**. In *Proceedings of the 1st International Conference on Artificial Intelligence for Internet of Things: Accelerating Innovation in Industry and Consumer Electronics - Volume 1: AI4IoT*; ISBN 978-989-758-661-3, SciTePress, pages 178-181. DOI: 10.5220/0012609000003739

#### in Bibtex Style

@conference{ai4iot23,

author={Jerolina Fernandez},

title={Some Fixed-Point Results on N_b-Cone Metric Spaces},

booktitle={Proceedings of the 1st International Conference on Artificial Intelligence for Internet of Things: Accelerating Innovation in Industry and Consumer Electronics - Volume 1: AI4IoT},

year={2023},

pages={178-181},

publisher={SciTePress},

organization={INSTICC},

doi={10.5220/0012609000003739},

isbn={978-989-758-661-3},

}

#### in EndNote Style

TY - CONF

JO - Proceedings of the 1st International Conference on Artificial Intelligence for Internet of Things: Accelerating Innovation in Industry and Consumer Electronics - Volume 1: AI4IoT

TI - Some Fixed-Point Results on N_b-Cone Metric Spaces

SN - 978-989-758-661-3

AU - Fernandez J.

PY - 2023

SP - 178

EP - 181

DO - 10.5220/0012609000003739

PB - SciTePress