The segment of the isometric lines is shown in Fig. 3, where (V_{S}) is the excitation source, (V_{1}) and (I_{1}) are the starting point of voltage and current, dz is the space step.
The isometric lines were used throughout all the screens as an animated piece of content and I personally feel that they hold up as a piece of data design but also as an iconic visual element for the film.
Open image in new window Fig. 5 Mean square displacement of the proton during diffusion calculated in bulk BaZrO _3) under fully relaxed, isometric tensile strain, and compressive strain conditions at 1300 K (black, red, and blue lines, respectively).
A metric space (M, d) is said to be of hyperbolic type if it is a metric space that contains a family L of metric segments (isometric images of real line bounded segments) such that (a) each two points x, y in M are endpoints of exactly one member seg[x, y] of L, and (b) if p, x, y ∈ M and m ∈ seg[x, y] satisfies d x, m) = αd x, y) for α ∈ [0, 1], then d p, m) ≤ (1 - α d p, x) + αd p, y).
Assume that for any x and y in X, there exists a unique metric segment [ x, y ], which is an isometric copy of the real line interval [ 0, d ( x, y ) ].
In this case the set [ x, y ] : = { W ( x, y, λ ) : λ ∈ [ 0, 1 ] }. is called the metric segment joining x and y (condition (iii) ensures that [ x, y ] is an isometric image of the real line interval [ 0, ρ ( x, y ) ] ).
Suppose that there exists a family Ϝ of metric segments such that any two points x, y in X are endpoints of a unique metric segment [ x, y ] ∈ Ϝ ( [ x, y ] is an isometric image of the real line interval [ 0, d ( x, y ) ] ).
Let us assume that there exists a family ℱ of metric segments such that any two points x, y in M are endpoints of a unique metric segment [ x, y ] ∈ F ( [ x, y ] is an isometric image of the real line interval [ 0, d ( x, y ) ] ).
Suppose that there exist a family (mathcal{F}) of metric segments such that any two points x, y in X are endpoints of a unique metric segment ([x,y] inmathcal{F}) (([x,y]) is an isometric image of the real line interval ([0,d x,y)])).
Suppose that there exists a family ℱ of metric segments such that any two points x, y in X are endpoints of a unique metric segment ([x,y] in{mathcal{F}}) (([x,y]) is an isometric image of the real line interval ([0,d x,y)])).
