$\phi^n$ trajectory bootstrap

TL;DR

This paper introduces a novel bootstrap method for quantum oscillators based on analytic continuation of expectation values, demonstrating high accuracy and broad applicability to Hermitian and non-Hermitian systems.

Contribution

The paper develops and applies a new $oldsymbol{ ext{phi}^n}$ trajectory bootstrap approach for solving quantum oscillator models, including non-Hermitian and fractional power potentials.

Findings

Accurate solutions for anharmonic oscillators with various potentials.

Verification of non-integer $n$ results with wave function methods.

Applicability to $oldsymbol{ ext{PT}}$-symmetric and non-Hermitian theories.

Abstract

We perform an extensive bootstrap study of Hermitian and non-Hermitian theories based on the novel analytic continuation of $\langle\phi^n\rangle$ or $\langle(i\phi)^n\rangle$ in $n$. We first use the quantum harmonic oscillator to illustrate various aspects of the $\phi^n$ trajectory bootstrap method, such as the large $n$ expansion, matching conditions, exact quantization condition, and high energy asymptotic behavior. Then we derive highly accurate solutions for the anharmonic oscillators with the parity invariant potential $V(\phi)=\phi^2+\phi^{m}$ and the $\mathcal{PT}$ invariant potential $V(\phi)=-(i\phi)^{m}$ for a large range of integral $m$, showing the high efficiency and general applicability of this new bootstrap approach. For the Hermitian quartic and non-Hermitian cubic oscillators, we further verify that the non-integer $n$ results for $\langle\phi^n\rangle$ or $\langle(i\phi)^n\rangle$ are consistent with those from the wave function approach. In the $\mathcal{PT}$ invariant case, the existence of $\langle(i\phi)^n\rangle$ with non-integer $n$ allows us to bootstrap the non-Hermitian theories with non-integer powers, such as fractional and irrational $m$.