Beyond Gravitons: RST’s Geometric Model of Gravity: Substrate Tension and the Nature of Gravity
What if gravity isn’t pulling you down—but pushing you in? In Reactive Substrate Theory (RST), the age-old mystery of gravitational attraction is flipped on its head. Forget gravitons and invisible strings tugging at mass; RST proposes that gravity emerges from pressure gradients in a continuous, dynamic field called the Substrate. Matter becomes a knot of tension, and gravity is the Buoyant Push—an elegant consequence of geometry, not force. This isn’t just a new theory; it’s a radical redefinition of what it means to fall.
In the Reactive Substrate Theory (RST), gravity is not a quantum force mediated by a graviton, but a fundamentally geometric phenomenon arising from pressure anomalies within the continuous, dynamic Substrate (S). RST replaces the concept of gravitational attraction with the Buoyant Push.
Gravity as Substrate Tension Distortion Gravity, in RST, is the large-scale effect of matter—local σ Solitons—creating a pressure gradient in the Substrate, causing distant objects to be pushed toward the anomaly.
The Source (Matter is Tension) Matter is the bound geometry of the Substrate. In the RST wave equation, this source is represented by the term σ(x, t), which describes extremely high-density, localized knots of Substrate tension that constitute mass. The term α(t)·σ(x, t) represents how this dense matter source drives distortion in the Substrate geometry.
The Mechanism (Buoyant Push) A dense mass knot (σ) reduces the local tension—or increases the local compressibility—of the surrounding Substrate relative to the relaxed Substrate in the cosmic void. This creates a tension gradient—a low-pressure zone around the mass. Gravity is the effect where objects are pushed toward this low-tension region by the higher pressure of the surrounding Substrate.
The Field Equation The non-linear RST equation describes how Substrate geometry and its disturbances behave:
(∂²S/∂t² − α(t)·c²·∇²S + β·S³) = α(t)·σ(x, t)·FR(C[Ψ])
The terms ∂²S/∂t² − α(t)·c²·∇²S represent wave propagation (like gravitational waves) and the static field geometry of the Substrate. The source term α(t)·σ(x, t) directly couples the presence of matter to the resulting Substrate dynamics, defining the pressure gradient that causes the Buoyant Push.
The Role of Energy (β·S³) The term β·S³ represents the self-sustaining, intrinsic tension potential of the Substrate. It resists distortion and maintains the overall field structure. This is the source of the usable energy that maintains the bound geometry of matter and, on a cosmological scale, likely accounts for Dark Energy—the expansive pressure of the relaxed Substrate. Gravity, as the local Buoyant Push, acts in opposition to this universal expansive pressure.
