Al Larson (1991) - Basic Physical Mechanisms: Development of a physical theory of cycles begins with an examination of the solar systems construction. It is composed of ten very important chunks of rock that orbit a ball of burning gas, the sun. The nine planets and our moon are the big rocks. For eons, these rocks have proceeded relentlessly on their courses, carefully balancing the forces they exert on each other and on the sun, and vice versa.
"Fully 76% of the Venus events coincided with highs and lows,
as did 84% of the Mercury events."
To date, two mechanisms have been proposed that could explain the effects of this system on earthly events. Theodor Landscheidt has presented many correlations between the solar system's center of mass and the outburst of solar flares. His theory states that, as the planets rotate, they shift the center of mass of the combined planet/sun system around. Al times, this center of mass actually moves outside the surface of the sun. As it passes the sun's surface, a chaotic boundary condition exists, resulting in outbursts of large solar fares [...] As the planets orbit the sun, they exert tidal forces on the sun's gases, much as the moon raises tides on the earth [...] Jupiter, Mercury, Venus, Earth, Mars, and Saturn are the most influential, in that order. These gas swirls cause a number of solar effects, including sunspots, coronal holes, and solar flares. All these effects combine to vary the amount of radiation that leaves the sun. This solar radiation is carried toward the earth in two ways:
- as direct radiation, such as sunshine and radio-waves, and
- as particles carried by the solar wind. This flow of charged particles forms a torrent of energy that blasts spaceship earth, creating n bow wave and a wake, just as a boat going upstream would do.
This bow wave forms a magnetopause between the Earth and the Sun, and interacts with the earth’s magnetic field, both shaping it and adding energy to it. At the north and south poles, the charged particles follow the magnetic lines of force, and enter our atmosphere in what is called a Polar Cap Absorption Event. This leads to the auroral oval, producing our Northern and Southern Lights.
The bow wave also creates an envelope about the earth, called the magnetosphere. As the solar wind flows past the earth, the magnetosphere forms a teardrop-shaped envelope of trapped particles that ends in what is called the magnetotail. It is inside this envelope that the moon orbits.
As the solar radiation varies, so does the earth's magnetic field, atmospheric ionization, and temperature. Scientists have tracked down a host of relationships between these events and a variety of earthly phenomena such as climate, weather, crime rates, plant growth rates, frequency of thunderstorms, blood PH levels, psychiatric emergencies, etc. My own work has related these events to market action as well. I believe a third mechanism that involves the moon also is at work .
A Theory of Lunar Chaos: I believe I have discovered another lunar cycle, which I call the “lunar chaos cycle.” My theory is that, as the moon rides high and low and moves closer and further from the earth, it crosses the boundary between the ionized particles trapped in the moon's wake and the fast-flowing solar wind. The figure at left shows boundary crossings at two full-moon positions (1 and 2) and two new-moon positions (3 and 4). Such boundary crossings would lead to sharp disturbances in the earth's magnetic eld, which would affect those of us who live within it. A further perturbation can be theorized, as well- the perturbation of the nearby planets, Mercury and Venus. When the moon's balanced on the edge of the magnetopause, a chaotic balance point exists. Either interior planet can tug the moon into the solar wind, tipping the balance just as Lorenz's Butterfly Effect tips the balance in weather patterns.
A Simple Mathematical Model: To test this theory, I created a simple mathematical model. This model computes the degree of exact alignment of a planet (either Mercury or Venus) with the Earth and Moon, and when the Moon is above or below 3° inclination. This yields a lunar chaos input function for each planet [see chart above].