This record contains a preprint manuscript submitted to the Journal of Statistical Physics. The paper introduces projective entropy-deletion landscapes (PEDL), directional entropy-response functions on projective space obtained by rank-one compression and renormalization of a density matrix. The manuscript develops finite-dimensional PEDL calculus, including a Cauchy secular equation for compressed spectra, an exact entropy formula, Morse-Hessian coefficients at eigendirections, first-variation formulas, and a contour identity for Cauchy-root transport. The high-dimensional application studies rank-one spiked covariance models below the BBP transition. The relevant object is the spike-direction spectral measure in the sample eigenbasis, whose Stieltjes transform is the diagonal resolvent entry. Using standard anisotropic local laws, the manuscript derives a compactly subcritical tilted Marchenko–Pastur limit and the associated effective-rank-normalized entropy-deletion coefficient. Numerical simulations validate the tilted spectral-measure prediction, the normalized PEDL coefficient, and the interpretation that below BBP the spike direction leaves a distributed tilted bulk footprint rather than a persistent outlier-coordinate signal. This preprint is provided for scholarly access and citation. The manuscript is under journal review and may be updated in later versions.
Tallavarjula et al. (Tue,) studied this question.
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