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Reformulation of q-middle convolution adds composition additivity

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Research area:MathematicsAlgebra and Number TheoryLinear equation

What the study found

The authors reformulated q-convolution and q-middle convolution, which are operations used in the study of q-difference equations. They also introduced q-analogues of addition linked to gauge transformation, and found that the reformulation gives additivity for the composition of two q-middle convolutions.

Why the authors say this matters

The study suggests that the reformulation is useful because it gives additivity when two q-middle convolutions are composed. The authors also present the work as relevant for obtaining solutions to third-order linear q-difference equations using q-middle convolution and q-analogues of addition.

What the researchers tested

The researchers reformulated the q-convolution and q-middle convolution introduced by Sakai and Yamaguchi. They introduced q-analogues of the addition related to gauge transformation, studied Jackson integrals associated with the q-convolution, and applied the framework to third-order linear q-difference equations.

What worked and what didn't

They obtained sufficient conditions for the Jackson integrals associated with the q-convolution to converge and satisfy the corresponding q-difference equation. They also presented several third-order linear q-difference equations and solutions using q-middle convolution and the q-analogues of addition. The abstract does not describe any failed cases or negative results.

What to keep in mind

The abstract gives only a brief summary, so details of the proofs, examples, and limitations are not provided here. It also does not state the range of equations or conditions beyond the sufficient conditions mentioned for the Jackson integrals.

Key points

The paper reformulates q-convolution and q-middle convolution.
It introduces q-analogues of addition related to gauge transformation.
The reformulation makes composition of two q-middle convolutions additive.
The authors give sufficient conditions for certain Jackson integrals to converge and satisfy a q-difference equation.
Several third-order linear q-difference equations are presented with solutions from the new framework.

Disclosure

Research title:: Reformulation of q-middle convolution adds composition additivity
Authors:: Yumi Arai, Kouichi Takemura
Institutions:: Ochanomizu University, Ochanomizu University
Publication date:: 2026-04-26
DOI:: 10.3842/sigma.2026.040
OpenAlex record:: View

AI provenance: AI provenance information is not available for this post.