Research Output per year

## Fingerprint Fingerprint is based on mining the text of the experts' scientific documents to create an index of weighted terms, which defines the key subjects of each individual researcher.

- 5 Similar Profiles

Nilpotent Group
Mathematics

Finite Rank
Mathematics

Finitely Generated Group
Mathematics

Finitely Generated
Mathematics

Stable Map
Mathematics

Bilinear Map
Mathematics

Ring
Mathematics

Structure Theorem
Mathematics

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## Research Output 2009 2018

- 3 Citations
- 1 h-Index
- 6 Article

## Elementary equivalence of rings with finitely generated additive groups

Miasnikov, A., Oger, F. & Sohrabi, M., Jun 1 2018, In : Annals of Pure and Applied Logic. 169, 6, p. 514-522 9 p.Stevens Institute of Technology

Research output: Contribution to journal › Article

Finitely Generated

Equivalence

Ring

Finitely Generated Group

Nilpotent Group

## Distortion of embeddings of a torsion-free finitely generated nilpotent group into a unitriangular group

Gul, F., Miasnikov, A. & Sohrabi, M., Sep 1 2017, In : International Journal of Algebra and Computation. 27, 6, p. 633-653 21 p.Stevens Institute of Technology

Research output: Contribution to journal › Article

Finitely Generated Group

Nilpotent Group

Torsion-free

Torsion-free Group

Heisenberg Group

## Magnus embedding and algorithmic properties of groups F/N^{(d)}

Gul, F., Sohrabi, M. & Ushakov, A., Jan 1 2017, In : Transactions of the American Mathematical Society. 369, 9, p. 6189-6206 18 p.Stevens Institute of Technology

Research output: Contribution to journal › Article

Reducibility

Polynomial time

Diagram

Polynomials

Form

## ω-Stability and morley rank of bilinear maps, rings and nilpotent groups

Miasnikov, A. & Sohrabi, M., Jun 1 2017, In : Journal of Symbolic Logic. 82, 2, p. 754-777 24 p.Stevens Institute of Technology

Research output: Contribution to journal › Article

Stable Map

Bilinear Map

Structure Theorem

Nilpotent Group

Algebraic Structure

## Groups elementarily equivalent to a free nilpotent group of finite rank

Miasnikov, A. & Sohrabi, M., Nov 1 2011, In : Annals of Pure and Applied Logic. 162, 11, p. 916-933 18 p.Stevens Institute of Technology

Research output: Contribution to journal › Article

Finite Rank

Nilpotent Group

Free Group

Completion

Arbitrary