Hypergeometric Functions of Nilpotent Operators: Functional Collapse and Structural Depth at Exceptional Points

TL;DR

This paper investigates hypergeometric functions of nilpotent operators, revealing a functional collapse phenomenon that simplifies the structure at exceptional points in non-Hermitian quantum systems.

Contribution

It introduces a nilpotent depth criterion and applies it to analyze how functions affect Jordan structures at exceptional points, providing explicit bounds and examples.

Findings

Hypergeometric functions of nilpotent operators reduce to finite polynomials.

The nilpotent depth is bounded by a formula involving the contact order.

Time evolution operators preserve Jordan depth at exceptional points.

Abstract

We study hypergeometric functions of nilpotent operators in finite-dimensional settings, motivated by the algebraic structure of exceptional points in non-Hermitian quantum mechanics. Our starting point is the following exact result: if N is a nilpotent operator of index m+1 in an associative algebra over C, then every generalized hypergeometric function pFq evaluated at N reduces to a finite polynomial in N of degree at most m, without any analytic convergence requirement. This "functional collapse" is distinct from the classical parameter-termination mechanism and arises purely from the nilpotent structure of the argument. The main result is a "nilpotent depth criterion" (Theorem 2): if the first non-constant coefficient of a formal series F appears in degree r >= 1, then the nilpotent part F(N) - F(0)I has nilpotency index bounded above by ceil((m+1)/r). We apply this criterion to Hamiltonians at exceptional points, where H = lambda I + N with N^{m+1} = 0. Theorem 3 establishes that a function F analytic at lambda reduces the Jordan depth of the exceptional point from m+1 to at most ceil((m+1)/r), where r is the contact order of F at lambda. As consequences: the time evolution operator e^{tH} preserves the full Jordan depth for all t != 0; a function with a zero of order m+1 at lambda annihilates the entire Jordan structure; and the order of the pole of the modified resolvent is reduced from m+1 to at most m+1-r. Results are illustrated with explicit 3x3 Jordan block computations for 1F1, 2F1, and the time evolution operator, confirming sharpness of the bounds.