A path-integral representation of the free one-flavour staggered-fermion determinant

Metadata

Title: A path-integral representation of the free one-flavour staggered-fermion determinant
Category: general
UUID: bf11d4812187441ea9e47811da2d0805

Source URL: https://www.maths.tcd.ie/report_series/abstracts/tcdm0417.html
Parent URL: https://www.maths.tcd.ie/research/papers/
Crawl Time: 2026-03-23T14:17:26+00:00

# A path-integral representation of the free one-flavour 
staggered-fermion determinant

**Source**: https://www.maths.tcd.ie/report_series/abstracts/tcdm0417.html
**Parent**: https://www.maths.tcd.ie/research/papers/

**A path-integral representation of the free one-flavour
staggered-fermion determinant**

Lattice fermion actions are constructed with path integrals which are
equivalent to the free one-flavour staggered fermion determinant. The
Dirac operators used are local and have an identical spectrum of states
to the staggered theory. Operators obeying a generalised Ginsparg-Wilson
relation are developed.