Geospatial Research Laboratory, US Army Corps of Engineers - Engineer Research and Development Center, 7701 Telegraph Road, Alexandria, VA, 22315, USA.
Department of Mathematics, University of Nebraska-Lincoln, 203 Avery Hall, Lincoln, NE68588-0130, USA.
J Math Biol. 2021 Apr 13;82(6):50. doi: 10.1007/s00285-021-01600-7.
Ecologists have recently used integral projection models (IPMs) to study fish and other animals which continue to grow throughout their lives. Such animals cannot shrink, since they have bony skeletons; a mathematical consequence of this is that the kernel of the integral projection operator T is unbounded, and the operator is not compact. To our knowledge, all theoretical work done on IPMs has assumed the operator is compact, and in particular has a bounded kernel. A priori, it is unclear whether these IPMs have an asymptotic growth rate [Formula: see text], or a stable-stage distribution [Formula: see text]. In the case of a compact operator, these quantities are its spectral radius and the associated eigenvector, respectively. Under biologically reasonable assumptions, we prove that the non-compact operators in these IPMs share some important traits with their compact counterparts: the operator T has a unique positive eigenvector [Formula: see text] corresponding to its spectral radius [Formula: see text], this [Formula: see text] is strictly greater than the supremum of the modulus of all other spectral values, and for any nonnegative initial population [Formula: see text], there is a [Formula: see text] such that [Formula: see text].
生态学家最近使用整体投影模型 (IPM) 来研究鱼类和其他在其整个生命周期中持续生长的动物。由于这些动物有骨骼,因此它们不能缩小;这一数学结果是积分投影算子 T 的核是无界的,并且该算子不是紧的。据我们所知,所有关于 IPM 的理论工作都假设算子是紧的,特别是它具有有界的核。从先验的角度来看,这些 IPM 是否具有渐近增长率 [Formula: see text] 或稳定阶段分布 [Formula: see text] 尚不清楚。在紧凑算子的情况下,这些量分别是它的谱半径和相关的特征向量。在合理的生物学假设下,我们证明了这些 IPM 中的非紧算子与它们的紧算子有一些共同的重要特征:算子 T 具有唯一的正特征向量 [Formula: see text] 对应于它的谱半径 [Formula: see text],这个 [Formula: see text] 严格大于所有其他谱值的模的上确界,并且对于任何非负初始种群 [Formula: see text],都有一个 [Formula: see text] 使得 [Formula: see text]。