The Lonely Runner conjecture finds its mathematical description in winding the runner's linear paths into the complete cycle, c-cycle, on the unit track circle. All runners, to finish the competition, must complete the c-cyclesimultaneously. Any collection BT mR_{cn}ET of the BT cnET integer speeds runners and maximum speed BT v_{cn} =nET is a subset of the enveloping collection BT mR_{n}={ 1,2,3,cdots,n}ET of the BT n,;n>cn,ETrunners with the maximum speed BT n.ET[0.50mm]The time period BT 1_{ct}=1/nET of the fastest runner, f-runner BT n,ET defines the set of BT nET right half open time f-segments of the measure BT 1_{ct},ET which cover the c-cycle time domain of the measure BT 1.ETThe winding mapping of the linear paths BT X(t)ET associates with the c-cycle Graph BT G,ET the union of the BT nET individual graphs BT g=(t,X(t)),ET reduced to the domain of the c-cycle. The time domain segmentation partitions the Graph BT GET into BT nET Subgraphs BT G_{i},ET each one on the one of the BT nET f-segments. The final Subgraph bundle sinks into the point BT (1,1).ETAt the end of the first f-segment, all the runners arranged into f-constellation at the BT nET fixed, stationary points on the unit circle in the sequence of the increasing speeds. However, at the final f-segment, the runners, on the way to the starting point, are arranged at the decreasing speed order at the same stationary points.The speed order inversion inverts the slope order of the graphs on the final Subgraph bundle.Finally, the infimum graph BT g_{n-1}ET of the Subgraph bundle of the BT n-1ET runner's mutual separation graphs, the graph of thelargest slope connects the points BT (0,n-1)1_{cl}ET and BT (1,1)1_{cl}.ETConsequently, the Lonely Runner conjecture is true on the set BT mR_{n},ET and must be true on any of its subset BT mR_{cn},ET