Inflation from a Weyl-flat null origin

Abstract

We show that a Weyl-flat null origin of inflation need not be in tension with present observations. For canonical single-field inflation, any background with ε(N) ε∞∈(0,1) as N∞ is asymptotically power-law, inherits the same Weyl-flat null past boundary, and reconstructs an exponential tail in field space. This identifies the origin as an asymptotic universality class rather than a rigid exact solution. We study a minimal deformation, ε(N)=ε∞+(1-ε∞)(N0N+N0)p with p>1, which preserves the asymptotic geometry, yields a smooth exit, and produces realistic finite-N phenomenology. Solving the scalar and tensor mode equations directly in e-fold time, we find a viable corridor with ns in the Planck-preferred range and r10-3-10-2, including reheating-compatible benchmarks. The result is a calculable single-field framework in which a Penrose-compatible Weyl-flat inflationary origin survives as a realistic and testable possibility.