Connectivity in Lattices and Mosaics.

Abstract

This paper is concerned with connectivity in regular lattices and random mosaics, and makes two major contributions. First, it presents a solution to the hitherto unsolved problems of predicting the expected numbers of connected components in square and hexagonal lattices, using a one dimensional growth approach that can also be used for some other lattices. Second, it investigates the relationship between connectivity in regular lattices and random mosaics. Experimental results are presented for both the cases. (Author)

Open PDF

Document Details

Document Type
Technical Report
Publication Date
Feb 01, 1978
Accession Number
ADA053903

Entities

People

  • Narendra Ahuja

Organizations

  • University of Maryland

Tags

Communities of Interest

  • Materials and Manufacturing Processes

DTIC Thesaurus Topics

  • Abstracts
  • Air Force
  • Cell Structure
  • Cells
  • Computer Science
  • Computers
  • Errors
  • Geometry
  • Intensity
  • Maryland
  • Observation
  • Probability
  • Probability Distributions
  • Scientific Research
  • Thickness
  • Universities

Fields of Study

  • Mathematics

Readers

  • Computer Networking
  • Mathematical Modeling and Probability Theory.
  • Theoretical Analysis.