no. chaos theory describes the courses and estimates of the result from a certain moment (beginning) of the phenomenon and under certain conditions by which the chaos is defined (eg conditions of its origin, its manifestations and the possibility of their repetition, occurrence). it is precisely due to this sensitivity of the occurrence of individual non-repeatable phenomena that the theory is described as chaos. on this basis, systems that show mathematical chaos are considered to be intricately in a sense - but not always. in general, then, chaos cannot be considered an order, even if it sometimes appears (it is expressed by the sensitivity of chaos - the less sensitive the chaos, the less orderly [observed phenomena are less often repeated]). (tuxedo)