AI Chat AI Image Generator AI Video AI Music Generator

Graded Algebraic Theories

02/17/2020

∙

by Satoshi Kura, et al.

∙

∙

We provide graded extensions of algebraic theories and Lawvere theories that correspond to graded monads. We prove that graded algebraic theories, graded Lawvere theories, and finitary graded monads are equivalent via equivalence of categories, which extends the equivalence for monads. We also give sums and tensor products of graded algebraic theories to combine computational effects as an example of importing techniques based on algebraic theories to graded monads.

page 1

page 2

page 3

page 4

research

∙ 04/13/2018

Morita equivalences between algebraic dependent type theories

We define a notion of equivalence between algebraic dependent type theor...

0 Valery Isaev, et al. ∙

research

∙ 06/30/2020

Algebraic models of simple type theories: a polynomial approach

We develop algebraic models of simple type theories, laying out a framew...

0 Nathanael Arkor, et al. ∙

research

∙ 12/14/2022

Category-Graded Algebraic Theories and Effect Handlers

We provide an effect system CatEff based on a category-graded extension ...

0 Takahiro Sanada, et al. ∙

research

∙ 12/22/2022

Sum and Tensor of Quantitative Effects

Inspired by the seminal work of Hyland, Plotkin, and Power on the combin...

0 Giorgio Bacci, et al. ∙

research

∙ 01/05/2020

A Diagrammatic Calculus for Algebraic Effects

We introduce a new, diagrammatic notation for representing the result of...

0 Ugo Dal Lago, et al. ∙

research

∙ 07/16/2018

What is algebraic about algebraic effects and handlers?

This note recapitulates and expands the contents of a tutorial on the ma...

0 Andrej Bauer, et al. ∙

research

∙ 05/16/2021

First-Order Reasoning and Efficient Semi-Algebraic Proofs

Semi-algebraic proof systems such as sum-of-squares (SoS) have attracted...

0 Fedor Part, et al. ∙