Quantum Intentionality and Determination of Realities in the Space-Time Through Path Integrals and Their Integral Transforms Quantum Intentionality and Determination of Realities in the Space-Time Through Path 2 Integrals and Their Integral Transforms

In the universe three fundamental realities exist inside our perception, which share 8 messages and quantum processes: the physical, energy and mental reality. These realities 9 happen at all times and they are around us like part of our existence spending one to other 10 one across organised transformations which realise a linking field energy-matter across the 11 concept of conscience of a field on the interpretation of the matter and space to create a 12 reality non-temporal that only depends on the nature of the field, for example, the 13 gravitational field is a reality in the space time that generates a curved space for the 14 presence of masses. At macroscopic level and according to the Einsteinian models the time 15 is a flexible band that acts in form parallel to the space. Nevertheless, studying the field at 16 microscopic level dominated by particles that produce gravity, the time is an intrinsic part of 17 the space (there is no distinction between one and other), since the particles contain a rotation 18 concept (called spin) that is intrinsic to the same particles that produce gravity from quantum 19 level [1].Then the gravitational field between such particles is an always present reality and 20 therefore non-temporal. The time at quantum level is the distance between cause and effect, 21 but the effect (gravitational spin) is contained in the proper particle that is their cause on 22 having been interrelated with other particles and vice versa the effect contains the cause 23 since the particle changed their direction [1]. 24


7
In the universe three fundamental realities exist inside our perception, which share 8 messages and quantum processes: the physical, energy and mental reality. These realities 9 happen at all times and they are around us like part of our existence spending one to other 10 one across organised transformations which realise a linking field -energy-matter across the 11 concept of conscience of a field on the interpretation of the matter and space to create a 12 reality non-temporal that only depends on the nature of the field, for example, the 13 gravitational field is a reality in the space -time that generates a curved space for the 14 presence of masses. At macroscopic level and according to the Einsteinian models the time 15 is a flexible band that acts in form parallel to the space. Nevertheless, studying the field at 16 microscopic level dominated by particles that produce gravity, the time is an intrinsic part of 17 the space (there is no distinction between one and other), since the particles contain a rotation 18 concept (called spin) that is intrinsic to the same particles that produce gravity from quantum 19 level [1].Then the gravitational field between such particles is an always present reality and 20 therefore non-temporal. The time at quantum level is the distance between cause and effect, 21 but the effect (gravitational spin) is contained in the proper particle that is their cause on 22 having been interrelated with other particles and vice versa the effect contains the cause 23 since the particle changed their direction [1]. 24 Then the action of any field that is wished transforms their surrounding reality which must 25 spill through the component particles of the space -time, their nature and to transmit it in 26 organised form, which is legal, because the field is invariant under movements of the proper 27 space, and in every particle there sublies a part of the field through their spinor. 28 Three fundamental realities perceived by our anthropometric development of the universe; 1 field -energy-matter between three different but indistinguishable realities are realised at 2 macroscopic level: one is the material reality which is determined by their atomic linkage 3 between material particles (atoms constituted by protons, neutrons and electrons), an energy 4 reality, called also quantum reality, since the information in this reality area exchanges the 5 matter happen through sub-particles (bosons, fermions, gluons, etc) and finally a virtual reality 6 that sublies like fundamental field and that is an origin of the changes of spin of the sub-7 particles and their support doing that they transform these into others and that they 8 transform everything around him (Higgs field). The integration of these three realities will be 9 called by us a hyper-reality by us. The hyper-reality contains to the quantum reality and to the 10 reality perceived by our senses (material reality). 11 Consider R d It, like the space -time where happens the transitions of energy states into 12 space -time, and let u, v, elements of this space, the integral of all the continuous possible 13 paths to particle x(s), that transit from energy state in u, to an energy state in v, in R d It, is 14 where h, is the constant of Max Planck, and the action , is the one realised by their 16 Lagrangian L. 17 Since we have mentioned, the action of a field is realised being a cause and effect, for which 18 it must be a cause and effect in each of the component particles, "waking up" the particle 19 conscience to particle being transmitted this way without any exception. This action must 20 infiltrate to the field itself that it sublies in the space and that it is shaped by the proper 21 particles that compose it creating a certain co-action that is major than their algebraic sum 22 [2].The configuration space Cn, m = { t ( ) t / } [3], is the model created by the 23 due action to each corresponding trajectory to the different splits it. Is clear here we must 24 have in mind all the paths in the space-time M, that contribute to interference amplitude in 25 this space, remaining the path of major statistical weight. The intention takes implicitly a 26 space Cn, m. Any transformation that wants to realise of a space, has as constant the same 27 energy that comes from the permanent field of the matter and which is determined by the 28 quantum field of the particles x(s), constituents of the space and matter. If we want to define 29 a conscience in the above mentioned field, that is to say, an action that involves an intention 30 is necessary to establish it inside the argument of the action. Likewise, if x(s) , and (x(s)), 31 there is their action due to a field of particles X, and there is spilled an intention defined by 32 (1) the length and breadth of the space M, such that satisfies the property of synergy [2], for 33 all the possible trajectories that they fill , we have that 34 where the energy factor E + E , represents the energy needed by the always present force to 5 realise the action and Oc, is the conscience operator which defines the value or record of the 6 field X (direction), on every particle of the space ( ), which along their set of trajectories , 7 realizes the action of permanent field Oc, it being fulfilled that 8 where the operator Oc, invests an energy quasi-infinite, encapsulated in a microscopic 10 region of the space (quantum space M), and with applications and influence in an unlimited 11 space of the sub-particles (boson space). Likewise a photon of certain class (x), will be 12 generated by the quantum field (if it manages to change its field spin) and will be moved for 13 the intention on a trajectory , by the path integral 14 Interesting applications of the formula (3) to nano-sciences will happen at the end of the 16 present chapter. Also it will be demonstrated that (3) is a quantum integral transform of 17 bundles or distortions of energy in the space -time if it involves a special kernel. The bundle 18 stops existing if there is applied certain intention (path integral transform). The operator Oc, 19 involves a connection of the tangent bundle of the space of trajectories ( ). 20 The operator Oc, include a connection of the tangent bundle of the space of trajectories ( ). 21 The integral (5) will determine on certain hypotheses the interdependence between the 22 material, quantum and virtual realities in M. 23 Def. 2. 1 (intentional action of the X). Let X, be a field acting on the particles x1(s), x2(s), , M, 24 and let , be their action on the above mentioned particles under an operator who 25 recognizes the "target" in M, (conscience operator). We say that , is an conscientious 26 intentional action (or simply intention) of the field X, if and only if: 27 a.
, is the determination of the field X, to realise or execute, (their force F(x)), 28 b. , recognizes well their target, it is known what the field X wants to do (their 29 direction she follows a configuration patron) 30 Consider a particle system p1, p2, in a space -time M R 4 . Let x(t) ( ) R 3 It, be a 1 trajectory which predetermines a position x R 3 , for all time t It. A field X, that infiltrates its 2 action to the whole space of points predetermined by all the trajectories x1(t), x2(t), x3(t), 3 , ( ), is the field that predetermines the points i(xi(t)), which are fields whose 4 determination is given by the action of the field X, and evaluated in the position of every 5 particle. Every point have a defined force by the action , of X, along the geodesic t, and 6 determined direction by their tangent bundle given for Tx 1 ( ( )), that is the cotangent space 7 T*( ( )) [4], which give the images of the states under Lagrangian, that is to say, the field 8 provides of direction to every point i, because their tangent bundle has a subjacent spinor 9 bundle S [5], where the field X, comes given as x 1 , on 10 every particle pi = xi(t) (i = 1, 2, ). Then to direct an intention is the map or connection: 11 which produces one to us ith-state of field energy i [6], where the action , of the field X, 15 infiltrates and transmits from particle to particle in the whole space ( ), using a 16 configuration given by their Lagrangian L (conscience operator), along all the trajectories of 17 ( ). Then of a sum of trajectories DF(x(t)), one has the sum d( (x)), on all the possible field 18 configurations Cn, m. Extending these intentions to whole space ( ) M, on all the elections 19 of possible paths whose statistical weight corresponds to the determined one by the 20 intention of the field, and realising the integration in paths for an infinity of particles -fields 21 in T ( ), it is had that 22 is is the amplitude of their propagator and in the second integral of 24 (8), we have expressed the Feynman integral using the form of volume ( (x)), of the space 25 of all the paths that add in T ( ), to obtain the real path of the particle (where we have chosen 26 quantized trajectories, that is to say, d( (x))). Remember that the sum of all these paths is the 27 interference amplitude between paths that is established under an action whose Lagrangian 28 is ( (x))= (x)d (x), where, if M , is a complex with M, the space-time, and C(M), is a 29 complex or configuration space on M, (interfered paths in the experiment given by multiple split 30 [7]), endowed with a pairing 31 where *(M), is some dual complex ("forms on configuration spaces"), i.e. such that "Stokes 1 theorem" holds: 2 , , d C (10) 3 then the integrals given by (8) can be written (to m-border points and n-inner points (see 4 figure 1a))) as: 5 integrating only energy state elements of the field. 10 The design of some possible spintronic devices that show the functioning of this process of 11 transformation in the space M, will be included in this chapter. 12  particles: the bundle of lines L, and the ordinary space R 3 . c) Way in as a quantum field X, which acts on a space -time 16 to change its reality, that is to say, to spill their intention. 1 We consider M R 3 It, the space-time of certain particles x(s), in movement, and let L, be an 2 operator that explains certain law of movement that governs the movement of the set of 3 particles in M, in such a way that the energy conservation law is applied for the total action 4 of each one of their particles. The movement of all the particles of the space M, is given 5 geometrically for their tangent vector bundle TM. Then the action due to L, on M, is defined 6 like [8]: 7 :

Conscience operators and configuration spaces
, If we want to calculate the action defined in (7) and (8), along a given path = x(s), we have 15 that the action is 16 That is, Oc(v)w, is the derivative of L, along the fiber in direction w. In the case of v = x'(s), and q = 25 x(s), q M, L(q, v) = E -V = ½<v, v> -V(q), we see that Oc(v)w = <v, w>, so we recover the usual 26 map s b : TM T*M, (with b Euclidean in R 3 ) associated with the bilinear form < , >. Is here where 27 the spin structure subjacent appears in the momentum of the particle x(s). 28 As we can see, T*M, carries a canonical symplectic form, which we call . Using Oc, we 1 obtain a closed two-form L, on TM, by setting 2 Likewise, the variation of the action from the operator Oc = d ( ) = L( , )d , is translated 7 in the differential 8 where h(s): TM, and is such that M o h = and h(x1) = h(x2) = 0, to extreme points of 10 x(s1) = p y x(s2) = q. The total differential (21) is the symplectic form L, that constructs the 11 application of the field intention expanding 2n-coordinates in (20). The space x 1 ( ( )), is the 12 space of differentiable vector fields on ( ), and ( ), is the manifold of trajectories (space-13 time of curves) that satisfies the variation principle given by the Lagrange equation that 14 expresses the force F(x(s) j ), (j = 1, 2, , n) generated by a field that generates one 15 "conscience" of order given by their Lagrangian (to see the figure 2).   that generates an order conscience. b) A force F(x(s) j ), is spilled, generated by a field that generates a "conscience" of 21 order given by their Lagrangian. For it, there is not to forget the principle of conservation energy re-interpreted in the  How does it influence the above mentioned intention in the space -time? what is the 1 handling of the force F j (x(s))? What is the quantum mechanism that makes possible the 2 transformation of a body or space dictated by this intention? 3 It is necessary to have two aspects clear: the influence grade on the space, and a property 4 that the field itself "wakes up" in the space or body to be transformed though the quantum 5 information (x), their particles. Consider the integral (8) and their Green function for n, 6 states (xj) (j = 1, 2, . n): functional where we are using an external force F j (x(s)), given by the intention 10 This operator is the operator of execution exe ( ), which establishes in general form (5) that 12 has been studied and applied in other developed research (see [2, 10, 11] as an example). 13 Then the influence realised on the space ( ) M, that there bears the functional one (23) 14 that involves the force of the intention given by the field (observe that the second addend of 15 the argument of exp, is the action which is realised from the exterior on the space ( )) can 16 go according to the functional derivative: 17 where these derivatives express impulses (force) of every particle placed in the positions x1, 22 , xn. In case of receiving the influence of the field X, these impulses will be directed by the 23 derivative of their Lagrangian density L (0) , that is a consequence of the differential (21), 1 (whereas, by the application of their conscience operator Oc) know 2 But the equation (26) is the quantum wave equation (bearer of the information (configuration 4 and momentum of the intention)) due to Oc, to the time s. Then the generating functional 5 takes the form (23), considering the property of the operator Oc, given through the operator The intention infiltrated by the conscience given for Oc, establishes that the differential of the 10 action d ( )h, given by (21) (using the energy (amplitude) that their propagator contributes 11 DF) can be visualised inside the configuration space through their boarder points ("targets" 12 of the intention of the field X, and that happen in To extract the intrinsic properties of integrals over configurating spaces, we will follow the 19 proof of the formality theorem [13], and record the relevant facts in our homological-20 physical interpretation: admissible graphs are "cobordisms" ( ) [m], when Un is thought 21 as a state-sum model [14]. The graphs are also interpreted as "extensions" ', when 22 considering the associated Hopf algebra structure. The implementations of these tools were Let Cn,m, be the configuration space of n, interior points and m, boundary points in the 6 manifold M, with boundary M (that is to say. [13], upper half-plane H). Its elements will be 7 thought as (geometric) "representations of cobordisms" (enabling degrees of freedom with 8 constraints). Then the action in (28) takes the form 9 where the sum is over the edges of , e is the one-edge graph, and / e, is the quotient 22 (forget about the signs for now). 23 We can give a major generalisation of this graphical homological version of the differential 24 establishing the graduated derivation that comes from considering H = T(g), the tensor 25 algebra with reduced co-product 26 Points of phase space are called states of the particle system acting in the cotangent space of 1 M. Thus, to give the state of a system, one must specify their configuration and momentum. 2 a) b) c) 3  the configuration space which describes the sequence of configurations through which the 10 particles system passes to different strata of co-dimension one (see figure 2). Every strata 11 correspond to a phase space of m, particles that are moved by curve and directed from 12 their energy states d (x), by , to n, particles (x). 13 This defines our intentional conscience. Then are true the following properties: 14 vi On the one hand, H Oc( (s)) ( [6]. But the operator Oc, is the defined as 24 Integrating both members on unlimited space H , (applying the principle of Stokes 1 integration given by (10)) we have that integral identity is valid for whole space. Then is 2 verifying ii. The property iii., is directly consequence of (19), (20) and (21), considering the Stokes 3 theorem given in (10), therefore Oc(x(s)), is such that L = (Oc)* , considering = d . Then 4 which is a integral of type (10). Indeed, 6 The derivative in the last integral from (33) is the total differential given by (21) from where 8 we have the derivative formula in the context of the unlimited space H. 9 The property iv., require demonstrate two implication where both implications are 10 reciprocates. If Oc(x(s')) = (s -s'), then all intention on trajectory defined , its had that 11 which is equivalent to 2 before property (simple conaequence of the property iv) [6]. 9 The identity in vi., happens in the phase space created by the cotangent space due to the 10 image of the differential (21). Therefore, both members of integral identity will have to 11 coincide in the intention given by Oc. Indeed, consider the integral 12 The graded commutative R-algebra H 0 , is provided with the even graded derivations (called 1 total derivatives) 2 )) , (( la n a n a n aa where we observe that L, is the 2-form given by L, in the formula (20) with n = 2, 7 and = 1 2. 8 Now we consider the dual part of the space (H, ( )), that is to say, the space (H*, L), be 9 We consider quantize this Lagrangian system in the framework of perturbative Euclidean 10 QFT. We suppose that L, is a Lagrangian of Euclidean fields on ( ) R n .  What happens towards the interior of every particle? what is the field intention mechanism 11 inside every particle? 12 To answer these questions we have to internalise the actions of field X, on the particles of manifold which is assumed to be C N . If the space is a complete intersection, the constraints 24 4 Having chosen M 2n , is to consider the two components of any point in the space C N , (that we are considering isomorfo to the ambient space of any quantum particle x(s), in the space-time) to have the two components that characterise any quantum particle x(s), that is their spin (direction) and their energy state (density of energy or "living force of the particle"). L, is the corresponding Lagrangian submanifold of the symplectic structure given by (M2n, ). where A, (N -k -q) , is a set of N -k -q, forms defined such that (N -k) , is non-vanishing on the 9 constraints W a (Zi) = 0, and TA, [a1 aN -k], is a numerical tensor which is antisymmetric in the 10 indices a1 aq. The construction of A, (N -k -q) , depends upon the precise form of the algebraic 11 manifold (variety of the equations W a (Zi) = 0). In some cases a general form can be given, but 12 in general it is not easy to find it and we did not find a general procedure for that 13 computation. 14 To construct a global form on the space S, one can use a modification of the Griffiths  can get the holomorphic top form (11) , by introducing 5, independent parameters , and by 29 using the formula (46). 30 The latter is independent from the choice of parameters , (however, some care has to be 1 devoted to the choice of the contour of integration and of the integrand: in the minimal 2 formalism, the presence of delta function ( ), might introduce some singularities which 3 prevent from proving the independence from , as was pointed out in [18], [19]). Using (k) 4 (k) , one can compute the correlation functions by integrating globally defined functions. 5 When the space is Calabi-Yau, it also exists a globally-defined nowhere vanishing 6 holomorphic form hol (k 0) , such that hol (k 0) hol (k 0) , is proportional to (k) (k) . The ratio of 7 the two top forms is a globally defined function on the CY-space. In the case of the 8 holomorphic measure hol (k 0) , the integration of holomorphic functions is related to the 9 definition of a contour S, in the complex space 10 where O(Zi, pA), are the vertex operators of the theory localized at the points pA, of the 12 Riemann surface and O0(Zi, pA), is the zero-mode component of the vertex operators. Newly 13 our conscience operator come given by the form (k, 0) . 14 Example 2. All Calabi-Yau manifolds are spin. In hypothetical quantum process (from point 15 of view QFT), to obtain a Calabi-Yau manifold is necessary add (or sum) strings in all 16 directions. In the inverse imaginary process, all these strings define a direction or spin. The 17 strings themselves are Lagrangian submanifolds whose Lagrangian action is a path integral. 18 In mathematics, an isotropic manifold is a manifold in which the geometry doesn't depend 19 on directions. A simple example is the surface of a sphere. This directional independence 20 grants us freedom to generate a quantum dimension process, since it does not import what 21 direction falls ill through a string, the space is the same way affected and it presents the 22 same aspect in any direction that is observed creating this way their isotropy.

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The importance of this isotropy property in our spin manifold, helps us to establish that the 30 transformations applied to the space that are directed to use (awakening) their nano-31 structure do it through an organized transformation that introduces the time as isotropic 32 variable, creating a momentary timelessness in the space where the above mentioned 1 transformation is created. Then the intentionality like a organized transformation is a co-2 action compose by field that act to realise the transformation of space and the field of the 3 proper space that is transformed. Then the symplectic structure subjacent in M, receives 4 sense. Recherche Nucléaire) establish that a similar mechanism although with substantial 26 differences (known also like Schwinger mechanism) can explain the formation of a 27 singularity such as the fundamental singularity (big-bang). This one establishes that the 28 gravitational field turns into virtual pairs of particle-antiparticle of an environment of 29 quantum gap in authentic pair's particle-antiparticle. Schwarzschild of the singularity in the Universe (this distance being equivalent to the 4 Planck length). This is the point where the classic gravitational description of the object is 5 not valid, being probably very important the quantum effects of the gravity. But there exists 6 another mechanism or thermodynamic limit that is fundamental in the theory of the 7 quantum dispersion and of the formation of quantum singularities.

Input
(1)   having then that the singularity (s), that is object of quantum transformation to along of 16 the time, is that product obtained by the integral transform 17 Then a corrective action is the inverse transform that transform the energy load function in 1 energy useful to the process of re-establishment on the quantum space (remember that it is 2 necessary to release the bundle of energy captive). How this inverse transformation realise? 3 4 Figure 6. a). This is the graph that shows the formation of singularities of quantum type by the energy load  where the first integral is equal to cero, because there is no singularity before s, (the 2 evolution happens after the time t s (see (49)). But this evolution is anomalous, since to all t 3 < s, includes a captive energy not assimilated to t = s (this because it does not have a conscience 4 operator at this moment (part of (28) defined by O 0 c)). Then 5  Plot3D(exp(-1/2(x^2 + y^2))(cos(4x) + sin(2x) + 3sin(1/3y) + cos(5y)ln(2x))), through the space-time 11 4.0 program. Observe that is present a kernel of transformation for normal distribution given by exp(-1/2(x 2 + y 2 )) that 12 will appear in the transform that defines the singularity when a particle is not appropriately assimilate. The normal 13 distribution kernel is the statistical weight that establishes the appearance of an abnormal evolution created by the 14 existence of the singularity. That is to say, the singularity is detected by the anomalous effects that are glimpsed in the 15 flux of the operator Oc, and that are observed in the surface bundle. where dim ( ), is the Neumann dimension corresponding to the Weyl camera of the roots j, 20 [26 27 used in the rotation process to eliminate the deviation [11], created by the 21 singularity. 22 Proof. Consider an arbitrary irreducible diagram with nodes with w-parts (parts of diagrams 23 with nodes of weight w(t, s)). Suppose that this points "nodes" with weight w, determines 24 the singularity given by (50). In fact, by the theory of Van Hove on the singularities in the 25 thermodynamic limit [23], each transition matrix of energy states has a correspondence with 1 the product of Hermitian matrices of the corresponding evolution operators that to this case 2 on a node en t = s, are given by (s') = e is'h0 e is'h where we have used the lemma 1, to the 3 arising of the quantum impurity in the space-time M (quantum singularity) in the image space 4 of the conscience operator TM*, located in R 3 It, in the point or node ( G [12, 23] (w-5 diagram)) t = s, corresponding of root space . Then considering a irreducible diagram 6 containing a w(t, s)-part, their contribution will be contained in r -R-space (which is the E + 7 E -space (see figure 2)) [23] by the function (t s): where the states j, are established in the density matrix n(0), that to a vertex of G, (w -18 diagram), arrange, those perturbations B (see figure 3), that they gave origin to the 19 singularity, with the corresponding arrange of those positive perturbations A, that will 20 realises the corrective action to transform the singularity signal (s), of an adequate thought 21 given by x(t). Due to that, the information given by the product An(0)B, must be changed 22 when lim i ( , ) ( ) ts wts ns , then a w-diagram must be change for diagram [27]. But this 23 live in the quantum field of the space-time TM*, that is to say, in the corresponding zone of 24 the executive operator I. Then in the material space-time (Einstein universe), the 25 displacement of energy needs inside this transformation the application of an invariant 26 given in the quantum space that guarantee that the new particle (boson) obtained let that 27 correct. This is given by number dim ( ), since it depends on the roots system to the 28 representation of the corresponding action group [27], that recover the recognition action. 29 By the integral (4), the transformation due to the new conscience operator created in TM*-30 zone obtained on whole the space-time is, 31 that is the result wanted. 33 connection and field) defined as: 14

Re-composition and determination of the realities
where , is the connection of virtual field X, with the quantum field Y, and , is the field 16 whose action is always present to create perceptions in the quantum zone connected with 17 (2-form) [ This double fibration conformed the interrelation between M, and N.
x(t) M, give 20 beginning to a complex submanifold (that represents the spaces where are the quantum 21 hologram) that includes all these quantum images given by quantum holograms, why? 22 Because this complex submanifolds, considering the causal structure given in the space-time 23 by the light cones (see figure 6 a)) [26], of all trajectories that follow a particle in the space-24 time [29], they can write using (57) as: 25 . But, what is there of our quantum universe with regard 2 to our real universe (included the material part given by the atoms)? 3 The answer is the same, we have an universe of ten dimensions and M = N M, where the 4 quantum representation of the object x(s), is the quantum space-time M = R 3 It, (which is 5 the Einstein cosmogonist perception) then the cosmo-vision of the virtual particles is C 2 Qx, 6 [21], then the execution operator I, that proceeds to connect virtual particles through the 7 paths which have path integrals on double fibration, establishing the material-quantum-8 virtual connection required to a total reality: 9 (59) 10 where C, is the material part connected with the quantum zone of the space-time (space 11 taken by atoms) M. The corresponding path integral that connects virtual particles in the 12 whole fibration is the integral of line type (5) defining feedback connection: 13 11 I Qc ( ( ( ))) ( ( ( ( ( )))) , Now, the cure that is realized to nano-metric scale must be executed with a synergic action 27 of constant field 33 , equal to effect in each atom of our body to unison of real conscience of 28 cure (duality mind-body [11]). Of this way, the conscience of B, is the obtained synergy by the 29 atoms in this sense and that will come reflected in the reconstitution of the vital field X. 30 Then under this reinterpretation, the sickness is only an effect of the fragmentation of this 1 real conscience of cure of B, that is deduced by disconnections and disparity of atoms [11]. The 2 integral medicine helps to recover the continuity of this conscience through of the electronic 3 memory of health of the proper body [11,22] (see the figure 6 c)). 4 where the virtual particles are not detected in a virtual energy sea. This allows to surmise that 10 the radiation that takes place from the virtual field to the quantum field of M, is composed 11 by photons type bosons (that is to say it obeys this Bose-Einstein statistics), since the quantum 12 field interacts with the material particles that contains the material field of the mind which is 13 anchored in the brain C, like material organ. 14 Theorem (F. Bulnes).

Quantology and neurosciences
[21] The total Lagrangian of mental field comes given by the superior 15 action whose total conscience is 16   9 Considering some applications of quantum electrodynamics in the design of flaying vehicles 10 self-supported and their magnetic levitation, we find the magnetic conscience operator is 11 defined for the transmitting of the diamagnetic property every particle of the ship structure. 12 This vehicle is controlled by one microchip that is programmed by conscience operators 13 algebra of electromagnetic type that leads to the flow of Eddy currents, the iso-rotations and 14

Electromagnetic vehicle with levitation magnetic conscience
suspension of the special geometrical characteristics vehicle, generating also on the vehicle 15 structure certain "magnetic conscience" that provokes all movements like succeeding the 16 sidereal objects in the universe [26,34]. This magnetic conscience is generating by the proper 17 particles of the ship structure transmitted for the interaction of superconductor inside the 18 reactor with the magnetic field generated by the rotating rings under the ship. By so doing, 19 the Eddy's currents in the "skin effect" around the structure of the ship are given by the 20 actions 1 Figure 9. a). The green color represents the state of quantum particles in transition to obtain the anti-gravity states 2 through the interaction of the E H-fields used on the structure of the vehicle. The blue flux represents Eddy's 3 currents that interact with the lines of magnetic field to produce an diamagnetic effect in the top part of the vehicle.

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The red central ring is the magnetic field that generates the twistor surface (this computational simulation is In the forms language, the conscience operator comes given by the map L : TM TM*, with 2 rule of correspondence given by (19). The quantum conscience shape a continuous flux of 3 energy with an intention, involving a smooth map (defined in the example 1). Then the 4 conscience operator is related with the action , and the trajectories t, through of the 5 following diagram: 6 Oc( ) -Conscience Operator in the singularity . This is a kernel of the quantum inverse 8 transfom of path integrals to eliminate singularities. Their direct transform use the kernel 9 Oc(x(t)). 10 O0(Zi, pA) -Vertex operator of the theory given by the equations W a (Zi) = 0, localized at the 11 points pA, of the Riemann surface S. 12 O(xx') -Is the functional operator O(xxj) = ( x+ m 2i ) n (xxj). This operator involves 13 to electronic propagator in a pulse impulse. 14 OQCD -Quantum chromodynamics conscience operator. Their Lagrangian density using the 15 quantum chromodynamics is LEM = n (ihc nD n mnc 2 n n) G G , Where D, is the 16 QCD gauge covariant derivative (in Feynman notation D ), n = 1, 2, 6 counts the quark 17 types, and is the gluon field strength tensor. 18 OEM -Conscience operator defined through of the Lagrangian to quantum electromagnetic 19 field (these like gauge fields). Their Lagrangian density is LEM = 20 ihc D mc 2 (1/4 0)F F where F , is the electromagnetic tensor, D, is the gauge 21 covariant derivative, and D, is Feynman notation for D . 22 Ototal -Total quantum conscience operator. This is the composition of operators OEM 23 followed OQCD. 24 Oc -Action that involves a conscience operator Oc. 25 (k, 0) -Differential form to complex hypersurfaces of dimension k. This form is analogous to 26 the form L, and involves the conscience operator (Oc)*. 27 x -Fibers of the topological space Qx, called sky conformed by the light rays through x 28 (bosons) that it comes of the virtual field. This is a conscience operator when realises the 29 reality transformation by the double fibration. 30 M -Action that have codimension strata nk. This action is due to the differential d ( )h. 1 int M -Action that have codimension strata k. This action is due by ( ).