3 - Descriptive and ancillary methods, and sampling problems

Summary

Introduction

The contents of this chapter constitute a tool-kit for use in the subsequent chapters on data analysis. §3.2 deals with some basic mathematical methods for vectors and matrices; §3.3 and §3.4 are concerned with methods of data display, and qualitative (or descriptive) features of spherical data sets. In particular, the basic method we have adopted for displaying vectorial data, which may cover both hemispheres, is explained in §3.3.1. §3.5 describes some standard statistical methods for deciding whether a given random sample of observations is adequately fitted by some specified probability distribution, and whether two independent samples have been drawn from the same (unspecified) distribution; §3.6 describes the use of simulation as an aid in complicated analyses; §3.7 describes jackknife procedures and permutation tests; and §3.8 is a brief discourse on problems of data collection.

The mathematical results presented in §3.2 are purely for reference purposes, and no derivations are given; most, if not all, of the results are available in standard texts.

Mathematical methods for unit vectors and axes in three dimensions

Mean direction, resultant length and centre of mass

Consider a collection of points P₁, …,P_n on the surface of the unit sphere centred at O, with P_i corresponding to a unit vector with polar coordinates (θ_i, φ_i) and direction cosines x_i, = sin θ_i, cos φ_i, y_i = sin θ_i, sin φ_i, z_i, = cos θ_i, i = 1,…, n.