Vector signs; Free space lines

... a notation is needed that makes it possible to record any desired inclination which may occur at any place, either inside or outside the kinesphere, without being bound to the points of the scaffolding... [For] notating free space lines... the vertical remains the only reference and inclinations are related to themselves. (Laban, 1966, p. 125)

“If one connects the steep, flat and suspended inclinations which lie in one diagonal, then one obtains scales which we term axis-scales:
Axis A-R Axis A-L Axis B-R Axis B-L	L11 - R11 - L2 - R2 -	L12 - R12 - R3 - L3 -	R0 - L0 - R4 - L4 -	L5 - R5 - L8 - R8 -	L6 - R6 - R9 - L9 -	R∞ L∞ R10 L10
Figure 25. Well-known “Axis scales” demonstrate equivalence of inclination numbers and vector signs (Laban, 1926, p. 43-44).

Figure 26. Series of “augmented three-rings” (Laban, 1926, p. 50).		Figure 27. Vector signs used as transverse inclinations in “Volutes with volute-links” (Laban, 1926, p. 50).

	deflecting inclinations
pure diagonals		vertical ‘steep’	sagittal ‘suspended’	lateral ‘flat’
Figure 28. Key to vector signs, showing signs for ‘pure diagonals’ modified in three ways to produce signs for flat, steep and suspending inclinations.

The sign system looks more complete when the diagonal signs (see Fig. 18) are placed next to the vector signs exhibiting their similar shapes. Each inclination sign can be seen in the same graphic structure as a diagonal sign, modified to indicate its deflection as either flat (lateral), steep (vertical) or suspended (sagittal) (Fig. 28).

Figure 29. “Scales assembled from short peripheral directions” (Laban, 1926, p. 47).