Representability of matrices over commutative rings as sums of two potent matrices
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Publication:6641626
DOI10.1134/s0037446624060016MaRDI QIDQ6641626
Publication date: 21 November 2024
Published in: Siberian Mathematical Journal (Search for Journal in Brave)
Cites Work
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- When is every matrix over a ring the sum of two tripotents?
- Nil-clean and strongly nil-clean rings.
- On expressing matrices over \(\mathbb{Z}_2\) as the sum of an idempotent and a nilpotent
- Matrices over finite fields as sums of periodic and nilpotent elements
- Rings over which matrices are sums of idempotent and \(q \)-potent matrices
- On some matrix analogs of the little Fermat theorem
- Nil-clean matrix rings
- When is every matrix over a division ring a sum of an idempotent and a nilpotent?
- Rings in which Every Element is a Sum of Two Tripotents
- Rings in which every element is the sum of two idempotents
- Matrices over Zhou nil-clean rings
- Rings in which elements are sums of nilpotents, idempotents and tripotents
- Matrices over a commutative ring as sums of three idempotents or three involutions
- On rings with xn − x nilpotent
- Rings, matrices over which are representable as the sum of two potent matrices
- Rings and finite fields whose elements are sums or differences of tripotents and potents
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