Spectral Methods and Condition-Number Analysis in Functional Analysis of Telecom Network Reliability in Uganda,

E; m; m; a; N; a; m; u; g; y; e; n; y; i; ,; K; e; r; b; y; O; j; a; m; a; ,; G; e; r; a; l; d; i; n; e; N; a; b; i; r; y; e; ,; J; a; c; k; s; o; n; O; k; e; l; l; o

doi:10.5281/zenodo.18730101

Abstract

The study focuses on functional analysis within the telecommunications sector in Uganda, specifically examining network reliability over a period. A mathematical model was developed using linear algebra techniques. The assumptions include the linearity of the system and the boundedness of parameters for stability analysis. The spectral method revealed a distinct eigenvalue pattern indicating potential failure points in the network, with proportions up to 20% under certain conditions. Spectral methods provide valuable insights into identifying critical components affecting telecom network reliability. Condition-number analysis quantifies system sensitivity effectively. Further research should explore data-driven applications and incorporate real-world variability for a more comprehensive model. Telecom Network Reliability, Functional Analysis, Spectral Methods, Condition-Number Analysis The analytical core is $\hat{y}<em>t=\mathcal{F}(x</em>t;\theta)$ with $\hat{\theta}=argmin_{\theta}L(\theta)$, and convergence is established under standard smoothness conditions.