Universal initial state preparation for first quantized quantum simulations (2510.07278v1)

Abstract: Preparing symmetry-adapted initial states is a principal bottleneck in first-quantized quantum simulation. We present a universal approach that efficiently maps any polynomial-size superposition of occupation-number configurations to the first-quantized representation on a digital quantum computer. The method exploits the Jordan--Schwinger Lie algebra homomorphism, which identifies number-conserving second-quantized operators with their first-quantized action and induces an equivariant bijection between Fock occupations and $\mathfrak{su}(d)$ weight states within the Schur--Weyl decomposition. Operationally, we prepare an encoded superposition of Schur labels via a block-encoded linear combination of unitaries and then apply the inverse quantum Schur transform. The algorithm runs in time $\text{poly}(L, N, d, \log \epsilon^{-1})$ for $L$ configurations of $N$ particles over $d$ modes to accuracy $\epsilon$, and applies universally to fermions, bosons, and Green's paraparticles in arbitrary single-particle bases. Resource estimates indicate practicality within leading first-quantized pipelines; statistics-aware or faster quantum Schur transforms promise further reductions.