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Julia Lieb

Orcid: 0000-0003-4211-1596

According to our database¹, Julia Lieb authored at least 32 papers between 2014 and 2026.

Collaborative distances:

Dijkstra number² of five.
Erdős number³ of four.

Timeline

Legend:

Book In proceedings Article PhD thesis Dataset Other

Links

Online presence:

on orcid.org

On csauthors.net:

Bibliography

2026

Design of MDP Convolutional Codes and Maximally Recoverable Codes Through the Lens of Matrix Completion.

[DOI]

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CoRR, April, 2026

Optimal Multidimensional Convolutional Codes.

[DOI]

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CoRR, March, 2026

Pseudo-MDP Convolutional Codes for Burst Erasure Correction.

[DOI]

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,

CoRR, March, 2026

Construction and Decoding of Convolutional Codes with optimal Column Distances.

[DOI]

,

Michael Schaller

CoRR, January, 2026

2025

Information-set decoding for convolutional codes.

[DOI]

,

,

Abhinaba Mazumder

,

Michael Schaller

Des. Codes Cryptogr., September, 2025

A new method for erasure decoding of convolutional codes.

[DOI]

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Des. Codes Cryptogr., August, 2025

Construction of LDPC convolutional codes with large girth from Latin squares.

[DOI]

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CoRR, July, 2025

Easy repair via codes with simplex locality.

[DOI]

Margreta Kuijper

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CoRR, April, 2025

A Matrix Completion Approach for the Construction of MDP Convolutional Codes.

[DOI]

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Proceedings of the IEEE Information Theory Workshop, 2025

2024

Self-Dual Convolutional Codes.

[DOI]

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,

Joachim Rosenthal

IEEE Trans. Inf. Theory, February, 2024

Criteria for the construction of MDS convolutional codes with good column distances.

[DOI]

,

,

,

Joachim Rosenthal

Adv. Math. Commun., 2024

An Improved Viterbi Algorithm for a Class of Optimal Binary Convolutional Codes.

[DOI]

,

,

Michael Schaller

Proceedings of the IEEE International Symposium on Information Theory, 2024

2023

A decoding algorithm for 2D convolutional codes over the erasure channel.

[DOI]

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Adv. Math. Commun., 2023

Convolutional codes over finite chain rings, MDP codes and their characterization.

[DOI]

Gianira N. Alfarano

,

,

,

Joachim Rosenthal

Adv. Math. Commun., 2023

Binary convolutional codes with optimal column distances.

[DOI]

,

,

Joachim Rosenthal

Proceedings of the IEEE International Symposium on Information Theory, 2023

2022

A Number Theoretic Approach to Cycles in LDPC Codes.

[DOI]

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CoRR, 2022

2021

Erasure decoding of convolutional codes using first-order representations.

[DOI]

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Joachim Rosenthal

Math. Control. Signals Syst., 2021

List decoding of convolutional codes over integer residue rings.

[DOI]

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,

Finite Fields Their Appl., 2021

Construction of LDPC convolutional codes via difference triangle sets.

[DOI]

Gianira N. Alfarano

,

,

Joachim Rosenthal

Des. Codes Cryptogr., 2021

2020

Complete j-MDP Convolutional Codes.

[DOI]

Paulo José Fernandes Almeida

,

IEEE Trans. Inf. Theory, 2020

A simplified criterion for MDP convolutional codes.

[DOI]

Gianira N. Alfarano

,

CoRR, 2020

Convolutional Codes.

[DOI]

,

,

Joachim Rosenthal

CoRR, 2020

Construction of Rate (n - 1 )/n Non-Binary LDPC Convolutional Codes via Difference Triangle Sets.

[DOI]

Gianira Nicoletta Alfarano

,

,

Joachim Rosenthal

Proceedings of the IEEE International Symposium on Information Theory, 2020

2019

Necessary field size and probability for MDP and complete MDP convolutional codes.

[DOI]

Des. Codes Cryptogr., 2019

Constructions of (2, 1, 2) complete j-MDP convolutional codes.

[DOI]

Paulo José Fernandes Almeida

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CoRR, 2019

Robust low-delay Streaming PIR using convolutional codes.

[DOI]

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,

CoRR, 2019

Constructions of MDS convolutional codes using superregular matrices.

[DOI]

,

CoRR, 2019

2017

The probability of primeness for specially structured polynomial matrices over finite fields with applications to linear systems and convolutional codes.

[DOI]

Math. Control. Signals Syst., 2017

Complete MDP convolutional codes.

[DOI]

CoRR, 2017

2016

The Probability of Reachability for a Parallel Connected Linear System over a Finite Field, Calculated by a Formula for the Number of Mutually Left Coprime Polynomial Matrices.

[DOI]

CoRR, 2016

Probability estimates for reachability of linear systems defined over finite fields.

[DOI]

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,

Adv. Math. Commun., 2016

2014

Reachability of Random Linear Systems over Finite Fields.

[DOI]

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,

Proceedings of the Coding Theory and Applications, 4th International Castle Meeting, 2014

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