Maciocia, Antony

Bayer, Arend

Manuell, Graham Richard

other

2020-04-02T11:34:09Z

2020-04-02T11:34:09Z

2020-06-25

Spectrum constructions appear throughout mathematics as a way of constructing topological spaces from algebraic data. Given a localic semiring R (the pointfree analogue of a topological semiring), we define a spectrum of R which generalises the Stone spectrum of a distributive lattice, the Zariski spectrum of a commutative ring, the Gelfand spectrum of a commutative unital C*-algebra and the Hofmann–Lawson spectrum of a continuous frame. We then provide an explicit construction of this spectrum under conditions on R which are satisfied by our main examples. Our results are constructively valid and hence admit interpretation in any elementary topos with natural number object. For this reason the spectrum we construct should actually be a locale instead of a topological space. A simple modification to our construction gives rise to a quantic spectrum in the form of a commutative quantale. Such a quantale contains 'differential' information in addition to the purely topological information of the localic spectrum. In the case of a discrete ring, our construction produces the quantale of ideals. This prompts us to study the quantale of ideals in more detail. We discuss some results from abstract ideal theory in the setting of quantales and provide a tentative definition for what it might mean for a quantale to be nonsingular by analogy to commutative ring theory.

https://hdl.handle.net/1842/36934

http://dx.doi.org/10.7488/era/235

en

The University of Edinburgh

semiring

topological space

Spectrum constructions

Zariski spectrum

Gelfand spectrum

Hofmann–Lawson spectrum

Stone spectrum

commutative ring theory

Quantalic spectra of semirings

Thesis or Dissertation

Doctoral

PhD Doctor of Philosophy