In this study we establish connections between asymptotic functions and properties of solutions to important problems in wireless networks. We start by introducing a class of self-mappings (called asymptotic mappings) constructed with asymptotic functions, and we show that spectral properties of these mappings explain the behavior of solutions to some maxmin utility optimization problems. For example, in a common family of max-min utility power control problems, we prove that the optimal utility as a function of the power available to transmitters is approximately linear in the low power regime. However, as we move away from this regime, there exists a transition point, easily computed from the spectral radius of an asymptotic mapping, from which gains in utility become increasingly marginal. From these results we derive analogous properties of the transmit energy efficiency. In this study we also generalize and unify existing approaches for feasibility analysis in wireless networks. Feasibility problems often reduce to determining the existence of the fixed point of a standard interference mapping, and we show that the spectral radius of an asymptotic mapping provides a necessary and sufficient condition for the existence of such a fixed point. We further present a result that determines whether the fixed point satisfies a constraint given in terms of a monotone norm.
翻译:在这项研究中,我们建立了无线网络重要问题的无线功能和解决办法的特性之间的联系。我们首先引入了使用无线功能的自图(所谓的无线绘图),我们展示了这些绘图的光谱特性可以解释解决某种最大效用优化问题的方法。例如,在一个拥有最大功率控制问题的共同大家庭中,我们证明发报机的功用功能的功能在低功率制度中大致是线性的。然而,随着我们脱离这一制度,存在一个过渡点,很容易从无线绘图的光谱半径中计算出来,其功用收益越来越微不足道。我们从这些结果中得出能效传输的类似特性。在这项研究中,我们还推广和统一了无线网络可行性分析的现有办法。可行性问题往往会降低到确定标准干扰绘图的固定点的存在,而我们则表明,一个无线绘图的光谱半径为存在这样一个固定点提供了必要和充分的条件。我们进一步确定一个固定限制点是否为固定标准。