Lorentz Violation in Torsional Antenna

A torsional-antenna and a log-periodic antenna are used as a source and an analyzer, respectively, to investigate the possible anomalies of an electro-magnetic field. An unexpected isotropic signal has been detected using those torsion angles, which correspond to a breakdown of the Local Lorentz Invariance, which was found in the past. This coincidence is interpreted as the recovery of a lost symmetry by torqueing the antenna, thus putting in evidence that this Lorentz violation is of angular nature. Introducing a new physical dimension—not only a mathematical dimension as a way to rearrange some equations—is here proposed as a general rule to recover the lost symmetry.


Introduction
In recent years, a patent was accepted (Patent 2014) concerning a bipolar antenna having two loops torqued by a fixed angle. This antenna has a very large band of emission and a good efficiency in transmission. They are higher than in the not torqued case, thus making it particularly suitable in radio communications by satellite in asynchronous orbits.
In order to investigate the effects of the torsion angle, a systematic study was performed (Paci 2018). In particular, the reflected signal of a transmission antenna as a function of the torque angle was investigated, the not torqued case corresponding to a so-called "crossloop antenna".
In the following, we present and discuss the results obtained when a log-periodic antenna is used to study the emission of this torqued antenna. These measurements have been performed in an anechoic edge, in order to reduce the external noise.
Examples of antennas based on torsion around an axis are the Helica Filar boards (QHF) (Kilgus 1975), suitable for receiving the transmissions of the NOAA sat polar satellites and WX sat on the frequency of 137 MHz. These antennas were designed at NASA and are used in any area where a good sensitivity and an appropriate directionality are pursued. They consist of square loops twisted in a spiraling shape to form an apparent torsion angle of 180°; the presence of a balun and their stiffness make them different from the one we are considering and not so simple to put in evidence the effects of twisting the two loops. More recently, the influence of surface twists on the characteristics of an antenna, to be placed on the nacelle of military helicopters, was studied (Kilgore et al. 2016;Karthikeya et al. 2016).
The torsional-antenna we studied is a quadrupole, made of two concentric circular dipoles arranged on orthogonal planes. The variable torsion angle is measured with respect to this condition, in which the dipoles are on orthogonal planes. In the torqued case, we studied, the envelope is an ellipsoid of rotation. On the contrary, in the twisted case the envelope is a cylinder (or a cone), this case corresponding to helical (conical) antennas which is not matter of our study.
In this experiment, the working hypothesis was that, if any anomalous behaviour was observed, it could be put in correlation with the anomalous behaviour observed in the case of electromagnetic interaction when a resistance/capacitance circuit inside a static magnetic field was studied, at different directions , 2000, 2004Bartocci et al. 2001).
In that case, an unexpected voltage was observed both in the horizontal plane and in the vertical plane perpendicular to the North direction of the terrestrial magnetic field. The magnetic North direction was chosen as conventional reference direction and later on used in all the experiments and measurements which tested the Lorentz violation (Cardone and Mignani 2007;Cardone et al. 2015Cardone et al. , 2017Cardone 2015Cardone , 2016. The wider Lorentz violation occurred in the vertical plane at 5π/4 rad Mignani 1999, 2000;Bartocci et al. 2001) (reported in the following Fig. 4).

The Antenna
The investigated antenna is made of two vertical loops, mutually perpendicular, having almost circular shape. In fact, each loop is made of two semi-circular branches with 16 cm radius. Each semi-circular branch is kept at 15 mm apart from the central vertical axis by using two PVC cubes, one on the top and one in the bottom part. The two branches of each loop are made of harmonic steel, see Table 1, having circular section with 0.5 mm radius, and are closed on the top through a horizontal conducting connection of 30 mm which crosses the PVC upper cube. These two perpendicular connections are at a distance of 2 mm each other, thus avoiding the contact between the two loops. As a consequence, each loop is 100 cm long and 32 cm high. The bottom of each loop is connected to a channel of a network analyzer (Keysight Technologies N9928A) without any phase shift. About this last issue, we shall deal with in the discussion of the results.
The torqued configurations were obtained by keeping fix the lower part and rotating the upper PVC cube. The torsion angle of the upper part will be indicated as the torque angle α.
The configuration corresponding to torque angle α = 180° is visible in Fig. 1.

Data Collection
The two loops of the antenna were separately power supplied by using the two output ports of an HP 8510 Vector Network Analyzer, with no phase shift, a power of 1 mW each on an impedance of 50Ω and a frequency of 240 MHz. Two sets of measurements were performed on 2017 March 23rd: one with antenna axis vertical (Fig. 2) and one with the axis horizontal (Fig. 3). The time is reported in the Figs. 2 and 3.
At a distance of 220 cm, a log-periodic antenna (Paci 2018) was placed as a receiver of the emitted signal. This log-antenna was kept fixed, while the emitting torsional-antenna could rotate on a table around a vertical axis crossing the center of the antenna (rotation angle ω), thus keeping the α torque-angle fixed. The total range of the rotation angle ω was 360° clockwise, with 180 steps of 2°. At each ω step, intensity was measured during 1 s. This way, the relative rotation of the log periodic antenna was anticlockwise.  -20] dB. Eight values of torque angle α are considered: 0 rad a π/4 rad b π/2 rad c 3π/4 rad d π rad e 6π/5 rad f 5π/4 rad g and 3π/2 rad h Particular attention was paid to the orientation of the apparatus with respect to the North of the Earth magnetic field: to this aim, a cartesian coordinate system was chosen Eight values of torque angle α are considered: 0 rad a π/4 rad b π/2 rad c 3π/4 rad d π rad e 6π/5 rad f, 5π/4 rad g and 3π/2 rad h having the z axis vertical and the y axis in the direction of the magnetic North (± 2°). The choice of such a coordinate system is devoid of any physical meaning. It is a purely conventional system, as we are going to discuss later on. With this choice, a loop was in the xz plane and one in yz plane when α = 0 and ω = 0 and axis of the antenna was vertical in the vertical configuration, see Fig. 2.
In the horizontal position, antenna axis was along the y direction. The α = 0 and ω = 0 configuration corresponded to loops in the xy and zy planes (see Fig. 3: horizontal configuration).

Results and Discussion
The Fig. 2 reports the polar diagrams of the intensity registered as a function of angle ω when the antenna was in vertical configuration, the Fig. 3 refers to horizontal configuration.
The most evident effect of torqueing antenna is that the intensity distribution is almost isotropic at torqueing angles α larger than π rad in the horizonal configuration, see Fig. 3 polar diagrams f, g, h.
Before performing the experiment, one should have expected the most isotropic distribution at large torqueing angles in the vertical configuration, not in the horizontal. In fact, in the former case, if one considers the antenna as an assemble of many dipoles, their directional distribution is more homogeneous at high torqueing angles, thus creating an  In order to check this point, a three-dimensional model of the antenna was created by using a numerical model (Healey and Mehta 2006), which has been implemented in MAT-LAB software. The final simulation of the electro-magnetic signal, as expected by applying standard software based on well-known classical Maxwell equations, was performed by ANSYS HFSS software. Figure 4 reports the polar diagrams obtained by simulation at a = 0° and a = 225° in the horizontal and vertical configurations.
No such effect of isotropy at high torqueing angles in the horizontal configuration was obtained (anyway no isotropic distribution has been obtained at all).
From these considerations one can deduce that the registered isotropy is not a direct consequence of the geometry, at least of the geometry we are acquainted to in a flat minkoskyan spacetime.
A possible explanation for this behaviour was looked for by considering the reported behavior of a static conductor inside a static magnetic field , 2000, 2004Bartocci et al. 2001).
In that case, by considering a similar conventional cartesian coordinate system with y axis along the terrestrial magnetic North and z perpendicular to the local earth surface, 1 the following effects were observed: • In the yz-plane: inside the experimental error, no voltage was detected at different directions of the conductor, as it is expected. • In the xy-plane: inside the experimental error, no voltage was detected at different directions of the conductor, as it is expected, apart from an unexpected voltage at π/4 (but not at 0 nor at π rad) from the North. It was observed during the measurements from 9 to 9:59 am of the 8th of June 1998 but not between 0:00 and 0:46 pm of the same day. • In the xz-plane, a wide variation of the voltage as a function of α angle from the vertical direction was detected, as depicted in Fig. 5. The instrumental zero corresponded to (1.5 ± 1.0) × 10 -5 V. Thus, only the measurement at α = 5π/4 is out of zero range, the error in each measurement being ± 1.0 × 10 -5 V.
However, as the zero error is systematic (not statistical), whatever its value is, many results are different from zero. Moreover, the results are not randomly distributed, but correspond to a continuous variation with angle, as shown by the continuous line in Fig. 5. The central value of the so obtained peak is about 6π/5, after applying correlation tests and interpolating procedure by standard polynomial regression , 2000, 2004, 2007Bartocci et al. 2001).
In particular, if the central value 1.5 × 10 -5 V is assumed as zero value, a wide region (at α larger than π rad) corresponds to the occurrence of a voltage which must not exist, according to known behaviour of the electromagnetic interaction, i.e. without Local Lorentz Invariance (LLI) violation.
The results reported in Fig. 5 were obtained between 8:30 am and 9:30 am of the 9th of June 1998. A following measurement between 12:18 and 13:05 pm of the same day did not confirm this occurrence of an anomalous voltage. These results have been confirmed Mignani 2004, 2007) in the next test runs performed in the years 1999-2000: in the same period of the year and with the same geometry, a violation of the LLI of a similar amount occurred in the morning but not in the afternoon.
Both the results in the xz-plane and in the xy-plane show a dependence on the time of the experiment. Due to this fact, a dependence on a direction different than the North magnetic field was suggested. In particular, some cosmological direction, which could be related to some anomaly of the microwave background radiation and its cold spot preferred direction was proposed .
At any rate, these results correspond to a breakdown of the LLI, as different results are obtained in different directions and in different times.
This anomaly occurs in directions corresponding to those torsion angles of the antenna for which the detected signal is isotropic: angles greater than π with respect to the vertical in a plane perpendicular to the North direction. In this angular range, a breakdown of the LLI occurred in the case of the conductor inside the static magnetic field.
In the case of the conductor in static magnetic field, this breakdown was attributed to metric parameters that are energy dependent according to energy thresholds, characteristic of each interaction (Bartocci et al. 2001;Mignani 1999, 2004 ).
Thus, outside each threshold, the space-time is not flat for all interactions at all energy values. A not-isotropic and not-symmetric space-time corresponds to a breakdown of LLI and, as a consequence, to a breakdown of the same Maxwell equations for electromagnetism.
Thus, in the case of the conductor, a deformation of space-time was detected , 2000, 2004, 2007Bartocci et al. 2001).
In the case of the antenna, given that a deformation exists, the torsion of the antenna counteracts this deformation and makes the energy signal isotropic.
We remark that symmetry in the polar diagrams at low values of the torque angle α is not expected by simulation and is not found experimentally. Maybe some people familiar with antennas are used to find a 180° symmetry. This result usually is obtained by modifying the intensity in the two loops to produce it. However, this is not the case in our experiments: this symmetry is not expected and does not occur.
In other words, the symmetric polar diagrams of Fig. 3 have been obtained without using the so-called "time's balancing" or rather without using any phase shift in separate supply for each loop.
In this strongly asymmetric case too, isotropic diagrams were obtained at high torque angles although they are not expected according to simulation.
The followed procedure to recover the symmetry is a step ahead with respect to the already followed methods. In fact, when the three-dimensional (3D) translation symmetry of the Galileo relativity was broken (by the existence of the Lorentz force), a new symmetry was found by adding the time as a fourth dimension and the 4D Minkowsky space-time was introduced. From the 3D symmetry of the Euclidean-Cartesian space (x, y and z spatial directions, whereas t is the Newtonian absolute time) a 4D symmetry of the pseudo-Euclidean Minkowsky space-time (x, y, z, t) was obtained.
In our case, the violation of 4D Lorentz symmetry was recovered by adding a new variable, the energy, which-in turn-is related to the angle of Lorentz violation. Thus, a 5D space-time-energy (x, y, z, t, E) is obtained (Cardone and Mignani 2007).
From the methodological point of view, the two steps are different. In fact, the transition from 3 to 4D is a mathematical way rearranging some equations to obtain in 4D the symmetry which is lost in 3D.
In our case, on the contrary, the isotropy was obtained experimentally, thus underlying a transition from 4 to 5D which has to be studied in detail from the mathematical point of view. Some indications on this transition can be found in ref.s 8-10.

Conclusions
A previous experiment of a static conductor, inside a static magnetic field, pointed out the evidence that violation of the LLI invariance occurred in some directions, defined by using the convention of a plane perpendicular to the north direction of the local magnetic field of the Earth.
The torsion angle α of the antenna exactly follows the same convention of the orientation angle α of the conductor inside the static magnetic field in the coil test for the Lorentz violation, as we can see in Fig. 6a, c.
The symmetric distribution of energy in the polar diagrams exactly follows the Lorentz violation as it matches the same range of angle α, as we can see in Fig. 6b, d.
As a matter of fact, in the present experiment the lost isotropy is recovered by using as source of electromagnetic field a torsional-antenna torqued by the same convention (i.e. using a plane perpendicular to the north direction of the local magnetic field of the Earth), as clearly shown in Fig. 6.
Once more we recall that the use of such a cartesian reference frame with y-axis along the North direction of the Earth magnetic field is a pure convention without any physical meaning. We stress again that this conventional reference frame has been used in all experiments testing LLI violation, either for electromagnetic phenomena or nuclear ones (Cardone and Mignani 2007;Cardone et al. 2015Cardone et al. , 2017Cardone 2015Cardone , 2016.
Recovering the lost symmetry by using a torsional-antenna is a clear indication that the breaking of LLI is mainly of angular nature.
Therefore, the method of introducing a new physical dimension is proposed as a general rule to recover the lost symmetry. It was already used in the past by introducing the time as a fourth dimension. This rule is used here by introducing the energy as fifth dimension Cardone et al. 1999a,b,c). We stress that in the present case the recovery is studied experimentally while it was introduced theoretically in the past.

Remarks
We noticed that the use of the energy as fifth physical coordinate allows to recover the symmetry and to solve the Lorentz violation, but the use of the fifth coordinate energy sets three problems we must face and deal with.
First, we have to deal with the energy in a separate way for each interaction, taking well in account that we measure the energy only by electromagnetic interaction , 2004, 2007.
Therefore, this first problem can be summarized by the question on how the energy measures the energy Cardone et al. 1999a, b, c).
Second: which form does it assume the fifth metric parameter corresponding to the coordinate energy? This problem is also evidently connected to the question on how the energy measures energy.
Third, energy is a dynamical variable: we must examine whether the role of dynamical variable is to be extended to the other four coordinates, the three spatial ones and the time. . 6 a Sketch of the torsional antenna in horizontal configuration, b 8 polar diagrams of radiation on meridian plane with respect to the horizontal torque axe, c Sketch of the magnetic coil test for LLI violation, d Voltage detected in a static conductor inside a static magnetic field as a function of α angle formed with respect to the vertical, in a plane perpendicular to the magnetic North direction This problem is also evidently connected to a geometrical representation of the interactions by metric parameters depending on the energy, intended as phenomenological variable, and pave the way to consider all the coordinates as dynamical variables.
At last, we remark that the energy has a double role in the framework of such a fivedimension metric: it is a coordinate and a phenomenological variable, on which the metric coefficients depend.
In the framework of this double role, the question on "how the energy measures the energy" finds a solution in the metric coefficient of the coordinate energy.
Therefore, we set the Ansatz that this fifth coefficient of the metric for each interaction plays the role of the gauge for the energy, and this could set a new standard to the so-called gauge field theories.

Perspectives
Among the experiments we can suggest as a step forward following the previous conclusions, the above reported measurements can be replicated in the southern hemisphere, when Earth is in the same astronomic position (i.e. between March and May).
This way, any asymmetry of the Lorentz violation can be investigated. In fact, this violation and its asymmetry were suggested to occur at a cosmological scale too (Cardone et al. 2017;Cardone 2016).
Besides, we tested the time-space asymmetry from the point of view of the space by using this torqued antenna. In order to test the asymmetry from the point of view of the time, we suggest to investigate the effects of a phase shifts between the two loops by using sinusoidal wave separate supply. Both the vertical and the horizontal configurations should be considered by using the same power supply of 240 MHz, 1 mW.