کد مقاله کد نشریه سال انتشار مقاله انگلیسی نسخه تمام متن
5500380 1533984 2016 19 صفحه PDF دانلود رایگان
عنوان انگلیسی مقاله ISI
Principal component analysis of persistent homology rank functions with case studies of spatial point patterns, sphere packing and colloids
ترجمه فارسی عنوان
تجزیه و تحلیل مولفه اصلی از توابع رتبه هماهنگی مداوم با مطالعات موردی از الگوهای نقطه فضایی، بسته بندی کره و کلوئید
موضوعات مرتبط
مهندسی و علوم پایه ریاضیات ریاضیات کاربردی
چکیده انگلیسی
Persistent homology, while ostensibly measuring changes in topology, captures multiscale geometrical information. It is a natural tool for the analysis of point patterns. In this paper we explore the statistical power of the persistent homology rank functions. For a point pattern X we construct a filtration of spaces by taking the union of balls of radius a centred on points in X, Xa=∪x∈XB(x,a). The rank function βk(X):{(a,b)∈R2:a≤b}→R is then defined by βk(X)(a,b)=rank(ι∗:Hk(Xa)→Hk(Xb)) where ι∗ is the induced map on homology from the inclusion map on spaces. We consider the rank functions as lying in a Hilbert space and show that under reasonable conditions the rank functions from multiple simulations or experiments will lie in an affine subspace. This enables us to perform functional principal component analysis which we apply to experimental data from colloids at different effective temperatures and to sphere packings with different volume fractions. We also investigate the potential of rank functions in providing a test of complete spatial randomness of 2D point patterns using the distances to an empirically computed mean rank function of binomial point patterns in the unit square.
ناشر
Database: Elsevier - ScienceDirect (ساینس دایرکت)
Journal: Physica D: Nonlinear Phenomena - Volume 334, 1 November 2016, Pages 99-117
نویسندگان
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