The latest work with number theoretical aspects of M^{8}H duality
(see this) was related to the question whether it allows and in fact implies Fourier analysis in number theoretical universal manner at the level of H= M^{4}× CP_{2}.
The problem is that at the level of M^{8} analogous to momentum space polynomials define the spacetime surfaces and number theoretically periodic functions are not a natural or even possible basis. At the level of H the spacetime surfaces can be regarded orbits of 3surfaces representing particles and are dynamical so that Fourier analysis is natural.
That this is the case, is suggested by the fact that M^{8}H duality maps normal spaces of spacetime surface to points of CP_{2}. Normal space is essentially the velocity space for surface deformations normal to the surface, which define the dynamical degrees of freedom by general coordinate invariance. Therefore dynamics enters to the picture. It turns out that the conjecture finds support.
Consider now the topic of this posting. Number theoretic vision about TGD is forced by the need to to describe the correlates of cognition. It is not totally surprising that these considerations lead to new insights related to the notion of cognitive measurement involving a cascade of measurements in the group algebra of Galois group as a possible model for analysis as a cognitive process (see this, this and this).
 The dimension n of the extension of rationals as the degree of the polynomial P=P_{n1}∘ P_{n2}∘ ... is the product of degrees of degrees n_{i}: n=∏_{i}n_{i} and one has a hierarchy of Galois groups G_{i} associated with P_{ni}∘.... G_{i+1} is a normal subgroup of G_{i} so that the coset space H_{i}=G_{i}/G_{i+1} is a group of order n_{i}. The groups H_{i} are simple and do not have this kind of decomposition: simple finite groups appearing as building bricks of finite groups are classified. Simple groups are primes for finite groups.
 The wave function in group algebra L(G) of Galois group G of P has a representation as an entangled state in the product of simple group algebras L(H_{i}). Since the Galois groups act on the spacetime surfaces in M^{8} they do so also in H. One obtains wave functions in the space of spacetime surfaces. G has decomposition to a product (not Cartesian in general) of simple groups. In the same manner, L(G) has a representation of entangled states assignable to L(H_{i}) (see this and this).
This picture leads to a model of cognitive processes as cascades of "small state function reductions" (SSFRs) analogous to "weak" measurements.
 Cognitive measurement would reduce the entanglement between L(H_{1}) and L(H_{2}), the between L(H_{2}) and L(H_{3}) and so on. The outcome would be an unentangled product of wave functions in L(H_{i}) in the product L(H_{1})× L(H_{2})× .... This cascade of cognitive measurements has an interpretation as a quantum correlate for analysis as factorization of a Galois group to its prime factors defined by simple Galois groups. Similar interpretation applies in M^{4} degrees of freedom.
 This decomposition could correspond to a replacement of P with a product ∏_{i} P_{i} of polynomials with degrees n= n_{1}n_{2}..., which is irreducible and defines a union of separate surfaces without any correlations. This process is very much analogous to analysis.
 The analysis cannot occur for simple Galois groups associated with extensions having no decomposition to simpler extensions. They could be regarded as correlates for irreducible primal ideas. In Eastern philosophies the notion of state empty of thoughts could correspond to these cognitive states in which SSFRs cannot occur.
 An analogous process should make sense also in the gravitational sector and would mean the splitting of K=n_{A} appearing as a factor n_{gr}=Kp to prime factors so that the sizes of CDs involved with the resulting structure would be reduced. Note that ep(1/K) is the root of e defining the trascdental infiniteD extension rationals which has finite dimension Kp for padic number field Q_{p}. This process would reduce to a simultaneous measurement cascade in hyperbolic and trigonometric Abelian extensions. The IR cutoffs having interpretation as coherence lengths would decrease in the process as expected. Nature would be performing ordinary prime factorization in the gravitational degrees of freedom.
This cognitive process would also have a geometric description.
 For the algebraic EQs, the geometric description would be as a decay of nsheeted 4surface with respect to M^{4} to a union of n_{i}sheeted 4surfaces by SSFRs. This would take place for flux tubes mediating all kinds of interactions.
In gravitational degrees of freedom, that is for trascendental EQs, the states with n_{gr}=Kp having bundles of Kp flux tubes would deca to flux tubes bundles of n_{gr,i}=K_{i}p, where K_{i} is a prime dividing K. The quantity log(K) would be conserved in the process and is analogous to the corresponding conserved quantity in arithmetic quantum field theories and relates to the notion of infinite prime inspired by TGD \citeallbvisionc.
 This picture leads to ask whether one could speak of cognitive analogs of particle reactions representing interactions of "thought bubbles" i.e. spacetime surfaces as correlates of cognition. The incoming and outgoing states would correspond to a Cartesian product of simple subgroups: G=∏^{×}_{i} H_{i}. In this composition the order of factors does not matter and the situation is analogous to a many particle system without interactions. The noncommutativity in general case leads to ask whether quantum groups might provide a natural description of the situation.
See the chapter Breakthrough in understanding of M^{8}H duality or the article Is M^{8}H duality consistent with Fourier analysis at the level of M^{4}× CP_{2}?.
