본문 바로가기
[학술저널]

  • 학술저널
  • Top 0.1%

황금비, 피보나치 수열, 프랙털 이론을 중심으로

김민석(국민대학교) 김개천(국민대학교)

UCI(KEPA) : I410-ECN-0101-2015-610-001292172

초록

This study intended arousal of other viewpoints that deal with and understand spaces and shapes, by describing the concept of ‘dimensions’ into visual patterns.
Above all, the core concept of spatial dimensions was defined as ‘expandability’. Then, first, the ‘golden ratio’, ‘Fibonacci sequence’, and ‘fractal theory’ were defined as elements of each dimension by stage.
Second, a ‘unit cell’ of one dimension as ‘minimum unit particles’ was set. Next, Fibonacci sequence was set as an extended concept into two dimensions. Expansion into three dimensions was applied to the concept of ‘self-similarity repetition’ of ‘Fractal’. In ‘fractal dimension’, the concept of ‘regularity of irregularity’ was set as a core attribute. Plus, Platonic solids were applied as a background concept of the setting of the ‘unit cell’ from the viewpoint of ‘minimum unit particles’.
Third, while ‘characteristic patterns’ which are shown in the courses of ‘expansion’ of each dimension were embodied for the visual expression forms of dimensions, expansion forms of dimensions are based on the premise of volume, directional nature, and concept of axes.
Expressed shapes of each dimension are shown into visually diverse patterns and unexpected formative aspects, along with the expression of relative blank spaces originated from dualism.
On the basis of these results, the ‘unit cell’ that is set as a concept of theoretical factor can be defined as a minimum factor of a basic algorism caused by other purpose. In here, by applying diverse pattern types, the fact that meaning spaces, shapes, and dimensions can be extracted was suggested.

목차

Abstract
1. 서론
2. 공간 차원의 시각적 표현 요소
3. 공간 차원의 단계별 시각화
4. 적용 사례와 분석
5. 결론
참고문헌

참고문헌(0)

리뷰(0)

도움이 되었어요.0

도움이 안되었어요.0

첫 리뷰를 남겨주세요.
DBpia에서 서비스 중인 논문에 한하여 피인용 수가 반영됩니다.
인용된 논문이 DBpia에서 서비스 중이라면, 아래 [참고문헌 신청]을 통해서 등록해보세요.
Insert title here