## Time in coherent matter

The Cordus theory proposes that TIME arises from the de Broglie frequency of individual particules. Here’s how. Each time a particule energises, it becomes available to interact with other particules.  The interaction may be via one of the electro-magneto-gravitational forces, or the synchronous (strong) interaction. The interaction occurs via the transmission and receipt of discrete forces. When the particule de-energises, then the interaction no longer applies. The energisation is at the the frequency given by E=h.f. Each time the particule energises it is effectively in existence and able to interact with other matter around it. Consequently the particule only experiences TIME, e.g. the opportunity to move or decay, when in its energised state and emitting and receiving discrete forces. So time flows for for the particule at its frequency.

This also means that anything that CHANGES the frequency of the particule, will change how time flows for the particule. Typical effects that can do this are external, e.g. the particule moves into a stronger gravitational field or moves with relativistic velocity. In these situations it encounters external discrete forces (fabric) faster, and this retards its own emission of discrete forces and hence also slows its frequency, so time flows slower. Hence gravitational and relativistic time dilation can readily be explained. So it is perfectly natural that your feet age slightly slower than your head, since the atoms in the foot are exposed to a sightly greater gravitational field than those in the head (when standing up). The reason this does not rip us apart is that the matter in between is in a discoherent state, and can move to accommodate the strain.

Coherent matter includes condensed matter (e.g. Bose-Einstein condensates, BECs), superfluids, and superconductors (electron superfluid). The theory explains these as arising from synchronicity of  emission of discrete forces by neighbouring particules. Hence this theory refers to the SYNCHRONOUS interaction, which explains the strong force. In coherence, the multiple particules are in complementary geometric locations and frequency states.  In other words, the particules, which have two ends, share the location of their reactive ends with those of other particules and thus form paired or network structures.

At suitably small scales all matter becomes INTERNALLY coherent. A typical case is the atomic NUCLEUS, and the theory shows how the nuclides may be explained as a chain of protons and neutrons bonded together synchronously. Hence also NUCLEAR POLYMER. Even the individual proton is internally coherent. However, even though particules and nuclei are internally coherent, this does not mean that large assemblies thereof are coherent. An internally coherent particule can exist with an EXTERNAL environment that is discoherent.  Thus matter at our macroscopic level of existence is DISCOHERENT: the metallurgical grains within the steel bar are not synchronised together in their frequency, and the organelles within the biological cell are not locked into frequency and position relative to other structures. Coherence is associated with spatial fixation, whereas discoherent bodies are free to move relative to their environment.

So what does this imply for the operation of TIME IN COHERENT MATTER? Note first that time is determined by frequency in this theory. Note also that in a coherent assembly of matter (‘coherent body’), all the particules are synchronised in frequency.

Thus for a coherent body, e.g. superfluid, the theory predicts that the whole body has one synchronised time frequency (all the particules beat together). Events are therefore synchronised within the coherent body. This is evident in the way these bodies emit synchronised radiation, as partly explains the laser. The theory also predicts that that time (frequency) of a coherent body  does not depend on the number of particules in the assembly. As more matter is added, so it synchronises with the existing coherent body. Also, the theory predicts that the phase (‘spin’) of the particules will also be complementary.

Thus we predict that time will behave strangely in coherent bodies. These specific time-characteristics may be testable and falsifiable.

Dirk Pons

14 October 2014