On Fractal Features and Fractal Linear Space About Fractal Continuous Functions

Abstract

This paper investigates fractal dimension of linear combination of fractal continuous functions with the same or different fractal dimensions. It has been proved that: (1) BVI all fractal continuous functions with bounded variation is fractal linear space; (2) 1DI all fractal continuous functions with Box dimension one is a fractal linear space; (3) sDI all fractal continuous functions with identical Box dimension s(1<s≤ 2) is surprisingly a non-fractal linear space, even non-fractal linear manifold, beyond our initial expectation, because the Box dimension of linear combination of fractal continuous functions can take any real number in [1,s) if it exists, and some different upper and lower Box dimension if it does not exit. This attracts our interests to probe into fractal characteristics of sDI, and get some suggesting results.