Authors

Peter Anderson

Abstract

This article may be accessed on the publisher's website (additional fees may apply) at: http://www.imaging.org/store/epub.cfm?abstrid=2450 We present a novel class of dispersed-dot masks for digital halftoning. These masks are based on simple algebraic rules using a Fibonacci-like number sequence (also known as linear pixel shuffling (Anderson, 1993)), which permits masks of an unlimited variety of sizes and number of discrete gray levels to be easily constructed. The masks tile the plane, but not necessarily ina rectangular manner. They produce seamless halftoned images.

Publication Date

1994

Comments

Note: imported from RIT’s Digital Media Library running on DSpace to RIT Scholar Works in February 2014.

Document Type

Article

Department, Program, or Center

Chester F. Carlson Center for Imaging Science (COS)

Campus

RIT – Main Campus

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